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2. Addenda to the book “Critical points at infinity in some variational problems” and to the paper “The scalar-curvature problem on the standard three-dimensional sphere”.
- Author
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Bahri, Abbes
- Subjects
- *
SCALAR field theory , *PROBLEM solving , *MATHEMATICAL analysis , *DIFFERENTIAL equations , *NUMERICAL analysis - Published
- 2016
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3. "Differential Equations of Mathematical Physics and Related Problems of Mechanics"—Editorial 2021–2023.
- Author
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Matevossian, Hovik A.
- Subjects
DIFFERENTIAL equations ,HYPERBOLIC differential equations ,LINEAR differential equations ,LAPLACE'S equation ,BOUNDARY value problems ,INVERSE problems ,MATHEMATICAL physics ,DIFFERENTIAL operators - Abstract
This document is an editorial for a special issue of the journal Mathematics titled "Differential Equations of Mathematical Physics and Related Problems of Mechanics." The special issue covers a range of topics related to differential equations in mathematical physics and mechanics, including wave equations, spectral theory, scattering, and inverse problems. The editorial provides a summary of the published papers in the special issue, highlighting their contributions to the field. The document emphasizes the importance of the special issue in covering both applied and fundamental aspects of mathematics, physics, and their applications in various fields. The author expresses gratitude to the authors, reviewers, assistants, associate editors, and editors for their contributions to the special issue. The report does not provide specific details about the content of the papers or the nature of the special issue. [Extracted from the article]
- Published
- 2024
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4. Editorial for the Special Issue "Analytical and Computational Methods in Differential Equations, Special Functions, Transmutations and Integral Transforms".
- Author
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Sitnik, Sergei
- Subjects
DIFFERENTIAL equations ,INTEGRAL transforms ,FRACTIONAL calculus ,INVERSE problems ,APPLIED mathematics ,HYPERGEOMETRIC functions ,HYPERGEOMETRIC series ,SPECIAL functions - Published
- 2023
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5. Numerical and Experimental Determination of Selected Performance Indicators of the Liquid Flat-Plate Solar Collector under Outdoor Conditions.
- Author
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Zima, Wiesław, Mika, Łukasz, and Sztekler, Karol
- Subjects
SOFTWARE verification ,SOLAR collectors ,DIFFERENTIAL equations ,SUPPLY & demand ,ANALYTICAL solutions - Abstract
The paper proposes applying an in-house mathematical model of a liquid flat-plate solar collector to calculate the collector time constant. The described model, proposed for the first time in an earlier study, is a one-dimensional distributed parameter model enabling simulations of the collector operation under arbitrarily variable boundary conditions. The model is based on the solution of energy balance equations for all collector components. The formulated differential equations are solved iteratively using an implicit difference scheme. To obtain a stable numerical solution, it is necessary to use appropriate steps of time and spatial division. These were found by comparing the results obtained from the model with the results of the analytical solution available in the literature for the transient state, which constitutes the novelty of the present study. The accuracy of the results obtained from the model was verified experimentally by comparing the measured and calculated history of the fluid temperature at the outlet of the collector. The calculation of the collector time constant is proposed in the paper as an example of the model's practical application. The results of the time constant calculation were compared with the values obtained experimentally on the test stand. This is another novelty of the presented research. The analysed collector instantaneous efficiency was then calculated for selected outdoor conditions. The presented mathematical model can also be used to verify the correctness of the collector operation. By comparing, on an ongoing basis, the measured and calculated values of the fluid temperature at the collector outlet, conclusions can be drawn about the process of solar glass fouling or glycol gelling. The simplicity of the model and the low computational demands enable such comparisons in an online mode. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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- View/download PDF
6. Reliability analysis of lifetime systems based on Weibull distribution.
- Author
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Shahriari, Mohammadreza, Shahrasbi, Hooman, and Zaretalab, Arash
- Subjects
STATISTICAL reliability ,WEIBULL distribution ,MARKOV processes ,MATHEMATICAL models ,DIFFERENTIAL equations - Abstract
Reliability analysis is crucial for understanding the performance and failure characteristics of lifetime systems. This paper presents a comprehensive study on the reliability analysis of lifetime systems using the Weibull distribution. The Weibull distribution, known for its flexibility in modeling failure times, provides a versatile framework for capturing diverse failure behaviors. A useful model for redundancy systems is proposed in this paper. The model consists of (n+1) components, where n components serve as spare parts for the main component. The failure rate of the working component is time-dependent, denoted as λ(t), while the failure rates of the non-working components are assumed to be zero. Whenever a component fails, one of the spare parts immediately takes over its role. The failed components in this model are considered non-repairable. To analyze this model, we establish the differential equations that describe the system states. By solving these equations, we calculate important parameters such as system reliability and mean time to failure (MTTF) in real-time scenarios. These parameters provide valuable insights into the performance and behavior of the system under study. By employing the Weibull distribution and the proposed model, this paper contributes to enhancing the understanding of reliability analysis in lifetime systems and enables the estimation of important reliability parameters for practical applications. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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7. Dynamics analysis and optimal control study of uncertain information dissemination model triggered after major emergencies.
- Author
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Bowen Li, Hua Li, Qiubai Sun, Rongjian Lv, Huining Yan, and Md Belal Bin Heyat
- Subjects
INFORMATION dissemination ,SOCIAL media ,HAMILTON'S principle function ,SIMULATION software ,DIFFERENTIAL equations ,ADAPTIVE control systems ,ONLINE social networks - Abstract
In order to effectively prevent and combat online public opinion crises triggered by major emergencies, this paper explores the dissemination mechanism of uncertain information on online social platforms. According to the decisionmaking behavior of netizens after receiving uncertain information, they are divided into eight categories. Considering that there will be a portion of netizens who clarify uncertain information after receiving it, this paper proposes a SEFTFbTbMR model of uncertain information clarification behavior. The propagation dynamics equations of the model are given based on the theory of differential equations, the basic regeneration number R
0 of the model is calculated, and the existence and stability of the equilibrium point of the model are analyzed. The theoretical analysis of the model is validated using numerical simulation software, and sensitivity analysis is performed on the parameters related to R0 . In order to reduce the influence caused by uncertain information, the optimal control strategy of the model is proposed using the Hamiltonian function. It is found that the dissemination of uncertain information among netizens can be suppressed by strengthening the regulation of social platforms, improving netizens' awareness of identifying the authenticity of information, and encouraging netizens to participate in the clarification of uncertain information. The results of this work can provide a theoretical basis for future research on the uncertain information dissemination mechanism triggered by major emergencies. In addition, the results can also provide methodological support for the relevant government departments to reduce the adverse effects caused by uncertain information in the future. [ABSTRACT FROM AUTHOR]- Published
- 2024
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8. Critical remarks on “Existence of the solution to second order differential equation through fixed point results for nonlinear F-contractions involving w0-distance”.
- Author
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Kadelburg, Zoran, Fabiano, Nicola, Savatović, Milica, and Radenović, Stojan
- Subjects
DIFFERENTIAL equations ,FIXED point theory ,FUNCTIONAL analysis - Abstract
Copyright of Military Technical Courier / Vojnotehnicki Glasnik is the property of Military Technical Courier / Vojnotehnicki Glasnik and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)
- Published
- 2023
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9. Bandgap Calculation and Experimental Analysis of Piezoelectric Phononic Crystals Based on Partial Differential Equations.
- Author
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Song, Chunsheng, Han, Yurun, Jiang, Youliang, Xie, Muyan, Jiang, Yang, and Tang, Kangchao
- Subjects
PHONONIC crystals ,ATTENUATION coefficients ,PARTIAL differential equations ,DIFFERENTIAL equations ,SURFACE area - Abstract
Focusing on the bending wave characteristic of plate–shell structures, this paper derives the complex band curve of piezoelectric phononic crystal based on the equilibrium differential equation in the plane stress state using COMSOL PDE 6.2. To ascertain the computational model's accuracy, the computed complex band curve is then cross-validated against real band curves obtained through coupling simulations. Utilizing this model, this paper investigates the impact of structural and electrical parameters on the bandgap range and the attenuation coefficient in the bandgap. Results indicate that the larger surface areas of the piezoelectric sheet correspond to lower center bands in the bandgap, while increased thickness widens the attenuation coefficient range with increased peak values. Furthermore, the influence of inductance on the bandgap conforms to the variation law of the electrical LC resonance frequency, and increased resistance widens the attenuation coefficient range albeit with decreased peak values. The incorporation of negative capacitance significantly expands the low-frequency bandgap range. Visualized through vibration transfer simulations, the vibration-damping ability of the piezoelectric phononic crystal is demonstrated. Experimentally, this paper finds that two propagation modes of bending waves (symmetric and anti-symmetric) result in variable voltage amplitudes, and the average vibration of the system decreases by 4–5 dB within the range of 1710–1990 Hz. The comparison between experimental and model-generated data confirms the accuracy of the attenuation coefficient calculation model. This convergence between experimental and computational results emphasizes the validity and usefulness of the proposed model, and this paper provides theoretical support for the application of piezoelectric phononic crystals in the field of plate–shell vibration reduction. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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10. Multitask learning of a biophysically-detailed neuron model.
- Author
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Verhellen, Jonas, Beshkov, Kosio, Amundsen, Sebastian, Ness, Torbjørn V., and Einevoll, Gaute T.
- Subjects
MEMBRANE potential ,NEURAL circuitry ,ARTIFICIAL neural networks ,DIFFERENTIAL equations ,MAGNETOENCEPHALOGRAPHY ,COMPUTATIONAL neuroscience ,ELECTROENCEPHALOGRAPHY - Abstract
The human brain operates at multiple levels, from molecules to circuits, and understanding these complex processes requires integrated research efforts. Simulating biophysically-detailed neuron models is a computationally expensive but effective method for studying local neural circuits. Recent innovations have shown that artificial neural networks (ANNs) can accurately predict the behavior of these detailed models in terms of spikes, electrical potentials, and optical readouts. While these methods have the potential to accelerate large network simulations by several orders of magnitude compared to conventional differential equation based modelling, they currently only predict voltage outputs for the soma or a select few neuron compartments. Our novel approach, based on enhanced state-of-the-art architectures for multitask learning (MTL), allows for the simultaneous prediction of membrane potentials in each compartment of a neuron model, at a speed of up to two orders of magnitude faster than classical simulation methods. By predicting all membrane potentials together, our approach not only allows for comparison of model output with a wider range of experimental recordings (patch-electrode, voltage-sensitive dye imaging), it also provides the first stepping stone towards predicting local field potentials (LFPs), electroencephalogram (EEG) signals, and magnetoencephalography (MEG) signals from ANN-based simulations. While LFP and EEG are an important downstream application, the main focus of this paper lies in predicting dendritic voltages within each compartment to capture the entire electrophysiology of a biophysically-detailed neuron model. It further presents a challenging benchmark for MTL architectures due to the large amount of data involved, the presence of correlations between neighbouring compartments, and the non-Gaussian distribution of membrane potentials. Author summary: Our research focuses on cutting-edge techniques in computational neuroscience. We specifically make use of simulations of biophysically detailed neuron models. Traditionally these methods are computationally intensive, but recent advancements using artificial neural networks (ANNs) have shown promise in predicting neural behavior with remarkable accuracy. However, existing ANNs fall short in providing comprehensive predictions across all compartments of a neuron model and only provide information on the activity of a limited number of locations along the extent of a neuron. In our study, we introduce a novel approach leveraging state-of-the-art multitask learning architectures. This approach allows us to simultaneously predict membrane potentials in every compartment of a neuron model. By distilling the underlying electrophysiology into an ANN, we significantly outpace conventional simulation methods. By accurately capturing voltage outputs across the neuron's structure, our method invites comparisons with experimental data and paves the way for predicting complex aggregate signals such as local field potentials and EEG signals. Our findings not only advance our understanding of neural dynamics but also present a significant benchmark for future research in computational neuroscience. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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11. Optimal Solutions for a Class of Impulsive Differential Problems with Feedback Controls and Volterra-Type Distributed Delay: A Topological Approach.
- Author
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Rubbioni, Paola
- Subjects
POPULATION dynamics ,BANACH spaces ,DIFFERENTIAL equations - Abstract
In this paper, the existence of optimal solutions for problems governed by differential equations involving feedback controls is established for when the problem must account for a Volterra-type distributed delay and is subject to the action of impulsive external forces. The problem is reformulated within the class of impulsive semilinear integro-differential inclusions in Banach spaces and is studied by using topological methods and multivalued analysis. The paper concludes with an application to a population dynamics model. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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12. Differential Transform Method and Neural Network for Solving Variational Calculus Problems.
- Author
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Brociek, Rafał and Pleszczyński, Mariusz
- Subjects
CALCULUS of variations ,ORDINARY differential equations ,MATHEMATICAL analysis ,DIFFERENTIAL equations ,ANALYTICAL solutions - Abstract
The history of variational calculus dates back to the late 17th century when Johann Bernoulli presented his famous problem concerning the brachistochrone curve. Since then, variational calculus has developed intensively as many problems in physics and engineering are described by equations from this branch of mathematical analysis. This paper presents two non-classical, distinct methods for solving such problems. The first method is based on the differential transform method (DTM), which seeks an analytical solution in the form of a certain functional series. The second method, on the other hand, is based on the physics-informed neural network (PINN), where artificial intelligence in the form of a neural network is used to solve the differential equation. In addition to describing both methods, this paper also presents numerical examples along with a comparison of the obtained results.Comparingthe two methods, DTM produced marginally more accurate results than PINNs. While PINNs exhibited slightly higher errors, their performance remained commendable. The key strengths of neural networks are their adaptability and ease of implementation. Both approaches discussed in the article are effective for addressing the examined problems. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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13. Least Squares Estimation of Multifactor Uncertain Differential Equations with Applications to the Stock Market.
- Author
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Wu, Nanxuan and Liu, Yang
- Subjects
DIFFERENTIAL equations ,DYNAMICAL systems ,LEAST squares ,STOCKS (Finance) ,NOISE - Abstract
Multifactor uncertain differential equations are powerful tools for studying dynamic systems under multi-source noise. A key challenge in this study is how to accurately estimate unknown parameters based on the framework of uncertainty theory in multi-source noise environments. To address this core problem, this paper innovatively proposes a least-squares estimation method. The essence of this method lies in constructing statistical invariants with a symmetric uncertainty distribution based on observational data and determining specific parameters by minimizing the distance between the population distribution and the empirical distribution of the statistical invariant. Additionally, two numerical examples are provided to help readers better understand the practical operation and effectiveness of this method. In addition, we also provide a case study of JD.com's stock prices to illustrate the advantages of the method proposed in this paper, which not only provides a new idea and method for addressing the problem of dynamic system parameter estimation but also provides a new perspective and tool for research and application in related fields. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
14. Theory on Linear L-Fractional Differential Equations and a New Mittag–Leffler-Type Function.
- Author
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Jornet, Marc
- Subjects
DIFFERENTIAL forms ,LINEAR differential equations ,DIFFERENTIAL equations ,DISTRIBUTION (Probability theory) ,LINEAR equations - Abstract
The L-fractional derivative is defined as a certain normalization of the well-known Caputo derivative, so alternative properties hold: smoothness and finite slope at the origin for the solution, velocity units for the vector field, and a differential form associated to the system. We develop a theory of this fractional derivative as follows. We prove a fundamental theorem of calculus. We deal with linear systems of autonomous homogeneous parts, which correspond to Caputo linear equations of non-autonomous homogeneous parts. The associated L-fractional integral operator, which is closely related to the beta function and the beta probability distribution, and the estimates for its norm in the Banach space of continuous functions play a key role in the development. The explicit solution is built by means of Picard's iterations from a Mittag–Leffler-type function that mimics the standard exponential function. In the second part of the paper, we address autonomous linear equations of sequential type. We start with sequential order two and then move to arbitrary order by dealing with a power series. The classical theory of linear ordinary differential equations with constant coefficients is generalized, and we establish an analog of the method of undetermined coefficients. The last part of the paper is concerned with sequential linear equations of analytic coefficients and order two. [ABSTRACT FROM AUTHOR]
- Published
- 2024
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15. Characterization of solitons in a pseudo-quasi-conformally flat and pseudo-W8 flat Lorentzian Kahler space-time manifolds.
- Author
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Chaturvedi, B. B., Kaushik, Kunj Bihari, Bhagat, Prabhawati, and Islam Khan, Mohammad Nazrul
- Subjects
SOLITONS ,GRAVITATIONAL constant ,NONLINEAR equations ,COSMOLOGICAL constant ,ENERGY density - Abstract
The present paper dealt with the study of solitons of Lorentzian Kähler space-time manifolds. In this paper, we have discussed different conditions for solitons to be steady, expanding, or shrinking in terms of isotropic pressure, the cosmological constant, energy density, nonlinear equations, and gravitational constant in pseudo-quasi-conformally flat and pseudo-W
8 flat Lorentzian Kahler space-time manifolds. [ABSTRACT FROM AUTHOR]- Published
- 2024
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16. A Rumor Propagation Model Considering Media Effect and Suspicion Mechanism under Public Emergencies.
- Author
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Yang, Shan, Liu, Shihan, Su, Kaijun, and Chen, Jianhong
- Subjects
RUMOR ,PUBLIC opinion ,SUSPICION ,MASS media influence ,DIFFERENTIAL equations - Abstract
In this paper, we collect the basic information data of online rumors and highly topical public opinions. In the research of the propagation model of online public opinion rumors, we use the improved SCIR model to analyze the characteristics of online rumor propagation under the suspicion mechanism at different propagation stages, based on considering the flow of rumor propagation. We analyze the stability of the evolution of rumor propagation by using the time-delay differential equation under the punishment mechanism. In this paper, the evolution of heterogeneous views with different acceptance and exchange thresholds is studied, using the standard Deffuant model and the improved model under the influence of the media, to analyze the evolution process and characteristics of rumor opinions. Based on the above results, it is found that improving the recovery rate is better than reducing the deception rate, and increasing the eviction rate is better than improving the detection rate. When the time lag τ < 110, it indicates that the spread of rumors tends to be asymptotic and stable, and the punishment mechanism can reduce the propagation time and the maximum proportion of deceived people. The proportion of deceived people increases with the decrease in the exchange threshold, and the range of opinion clusters increases with the decline in acceptance. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
17. New oscillation criteria for first-order differential equations with general delay argument.
- Author
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ATTIA, Emad R. and JADLOVSKÁ, Irena
- Subjects
DIFFERENTIAL equations ,OSCILLATIONS ,ARGUMENT - Abstract
This paper is concerned with the oscillation of solutions to a class of first-order differential equations with variable coefficients and a general delay argument. New oscillation criteria are established, which improve and extend many known results reported in the literature. A couple of illustrative examples are given to show the efficiency of the newly obtained results. In particular, it is shown that our criteria partially fulfill a remaining gap in a recent sharp result by Pituk et al. [31]. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
18. Piecewise implicit coupled system under ABC fractional differential equations with variable order.
- Author
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Redhwan, Saleh S., Maoan Han, Almalahi, Mohammed A., Alyami, Maryam Ahmed, Alsulami, Mona, and Alghamdi, Najla
- Subjects
DIFFERENTIAL equations - Abstract
This research paper presented a novel investigation into an implicit coupled system of fractional variable order, which has not been previously studied in the existing literature. The study focused on establishing and developing sufficient conditions for the existence and uniqueness of solutions, as well as the Ulam-Hyers stability, for the proposed coupled system without using semigroup property. By extending the existing conclusions examined for the Atangana-Baleanu-Caputo (ABC) operator, we contributed to advancing the understanding of variable-order fractional differential equations. The paper provided a solid theoretical foundation for further analysis, numerical simulations, and practical applications. The obtained results have implications for designing and controlling systems modeled using fractional variable order equations and serve as a basis for addressing a wide range of dynamical problems. The transformation techniques, qualitative analysis, and illustrative examples presented in this work highlight its unique contributions and potential to serve as a foundation for future research. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
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19. Invariant Gibbs measures for the three-dimensional wave equation with a Hartree nonlinearity II: Dynamics.
- Author
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Bringmann, Bjoern
- Subjects
GIBBS' equation ,WAVE equation ,NONLINEAR analysis ,MATHEMATICAL analysis ,DIFFERENTIAL equations - Abstract
In this two-paper series, we prove the invariance of the Gibbs measure for a threedimensional wave equation with a Hartree nonlinearity. The novelty lies in the singularity of the Gibbs measure with respect to the Gaussian free field. In this paper, we focus on the dynamical aspects of our main result. The local theory is based on a paracontrolled approach, which combines ingredients from dispersive equations, harmonic analysis, and random matrix theory. The main contribution, however, lies in the global theory. We develop a new globalization argument, which addresses the singularity of the Gibbs measure and its consequences. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
20. SIRS Epidemic Models with Delays, Partial and Temporary Immunity and Vaccination.
- Author
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Chen-Charpentier, Benito
- Subjects
EPIDEMICS ,COMMUNICABLE diseases ,INFLUENZA epidemiology ,MATHEMATICAL models ,DIFFERENTIAL equations - Abstract
The basic reproduction, or reproductive number, is a useful index that indicates whether or not there will be an epidemic. However, it is also very important to determine whether an epidemic will eventually decrease and disappear or persist as an endemic. Different infectious diseases have different behaviors and mathematical models used to simulated them should capture the most important processes; however, the models also involve simplifications. Influenza epidemics are usually short-lived and can be modeled with ordinary differential equations without considering demographics. Delays such as the infection time can change the behavior of the solutions. The same is true if there is permanent or temporary immunity, or complete or partial immunity. Vaccination, isolation and the use of antivirals can also change the outcome. In this paper, we introduce several new models and use them to find the effects of all the above factors paying special attention to whether the model can represent an infectious process that eventually disappears. We determine the equilibrium solutions and establish the stability of the disease-free equilibrium using various methods. We also show that many models of influenza or other epidemics with a short duration do not have solutions with a disappearing epidemic. The main objective of the paper is to introduce different ways of modeling immunity in epidemic models. Several scenarios with different immunities are studied since a person may not be re-infected because he/she has total or partial immunity or because there were no close contacts. We show that some relatively small changes, such as in the vaccination rate, can significantly change the dynamics; for example, the existence and number of the disease-free equilibria. We also illustrate that while introducing delays makes the models more realistic, the dynamics have the same qualitative behavior. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
21. BLOW-UP SOLUTIONS FOR NON-SCALE-INVARIANT NONLINEAR SCHRÖDINGER EQUATION IN ONE DIMENSION.
- Author
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MASARU HAMANO, MASAHIRO IKEDA, and SHUJI MACHIHARA
- Subjects
NONLINEAR Schrodinger equation ,MATHEMATICAL symmetry ,DIFFERENTIABLE dynamical systems ,DIFFERENTIAL invariants ,DIFFERENTIAL equations - Abstract
In this paper, we consider the mass-critical nonlinear Schrödinger equation in one dimension. Ogawa-Tsutsumi [Proc. Amer. Math. Soc. 111 (1991), no. 2, 487-496] proved a blow-up result for negative energy solution by using a scaling argument for initial data. In general, a equation with a linear potential does not have a scale invariant, so the method by Ogawa-Tsutsumi cannot be used directly to that. In this paper, we prove a blow-up result for the equation with the linear potential by modifying the argument of Ogawa-Tsutsumi. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
22. Oscillatory behavior of second-order nonlinear noncanonical neutral differential equations.
- Author
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Grace, Said R., Graef, John R., Li, Tongxing, and Tunç, Ercan
- Subjects
DIFFERENTIAL equations ,FUNCTIONAL differential equations - Abstract
This paper discusses the oscillatory behavior of solutions to a class of second-order nonlinear noncanonical neutral differential equations. Sufficient conditions for all solutions to be oscillatory are given. Examples are provided to illustrate all the main results obtained. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
23. Comment on the papers: Journal of Molecular Liquids 224 (2016) 1341–1347, Journal of Molecular Liquids 222 (2016) 854–862 and Journal of Molecular Liquids 225 (2017) 569–576.
- Author
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Pantokratoras, Asterios
- Subjects
- *
HOMOTOPY theory , *EQUATIONS , *DIFFERENTIAL equations , *MOLECULES , *LIQUIDS - Abstract
The present comment concerns some doubtful results included in the above papers. [ABSTRACT FROM AUTHOR]
- Published
- 2017
- Full Text
- View/download PDF
24. Solution approximation of fractional boundary value problems and convergence analysis using AA-iterative scheme.
- Author
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Abbas, Mujahid, Ciobanescu, Cristian, Asghar, Muhammad Waseem, and Omame, Andrew
- Subjects
BOUNDARY value problems ,DIFFERENTIAL equations ,NONEXPANSIVE mappings ,FRACTIONAL differential equations - Abstract
Addressing the boundary value problems of fractional-order differential equations hold significant importance due to their applications in various fields. The aim of this paper was to approximate solutions for a class of boundary value problems involving Caputo fractional-order differential equations employing the AA-iterative scheme. Moreover, the stability and data dependence results of the iterative scheme were given for a certain class of mappings. Finally, a numerical experiment was illustrated to support the results presented herein. The results presented in this paper extend and unify some well-known comparable results in the existing literature. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
25. Abstract random differential equations with state-dependent delay using measures of noncompactness.
- Author
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Heris, Amel, Bouteffal, Zohra, Salim, Abdelkrim, Benchohra, Mouffak, and Karapınar, Erdal
- Subjects
DIFFERENTIAL equations ,EXISTENCE theorems ,GENERALIZATION ,FIXED point theory ,FRECHET spaces - Abstract
This paper is devoted to the existence of random mild solutions for a general class of second-order abstract random differential equations with state-dependent delay. The technique used is a generalization of the classical Darbo fixed point theorem for Fréchet spaces associated with the concept of measures of noncompactness. An application related to partial random differential equations with state-dependent delay is presented. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
26. Representations of Solutions of Time-Fractional Multi-Order Systems of Differential-Operator Equations.
- Author
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Umarov, Sabir
- Subjects
SYSTEMS theory ,ORDINARY differential equations ,EXISTENCE theorems ,DIFFERENTIAL equations ,EQUATIONS - Abstract
This paper is devoted to the general theory of systems of linear time-fractional differential-operator equations. The representation formulas for solutions of systems of ordinary differential equations with single (commensurate) fractional order is known through the matrix-valued Mittag-Leffler function. Multi-order (incommensurate) systems with rational components can be reduced to single-order systems, and, hence, representation formulas are also known. However, for arbitrary fractional multi-order (not necessarily with rational components) systems of differential equations, the representation formulas are still unknown, even in the case of fractional-order ordinary differential equations. In this paper, we obtain representation formulas for the solutions of arbitrary fractional multi-order systems of differential-operator equations. The existence and uniqueness theorems in appropriate topological vector spaces are also provided. Moreover, we introduce vector-indexed Mittag-Leffler functions and prove some of their properties. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
27. Extended existence results for FDEs with nonlocal conditions.
- Author
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Aljurbua, Saleh Fahad
- Subjects
BOUNDARY value problems ,FRACTIONAL differential equations - Abstract
This paper discusses the existence of solutions for fractional differential equations with nonlocal boundary conditions (NFDEs) under essential assumptions. The boundary conditions incorporate a point 0 ≤ c < d and fixed points at the end of the interval [0, d]. For i = 0, 1, the boundary conditions are as follows: a
i , bi > 0, a0 p(c) = -b0 p(d), a1 p'(c) = -b1 p'(d). Furthermore, the research aims to expand the usability and comprehension of these results to encompass not just NFDEs but also classical fractional differential equations (FDEs) by using the Krasnoselskii fixedpoint theorem and the contraction principle to improve the completeness and usefulness of the results in a wider context of fractional differential equations. We offer examples to demonstrate the results we have achieved. [ABSTRACT FROM AUTHOR]- Published
- 2024
- Full Text
- View/download PDF
28. NUMERICAL SOLUTION OF FOKKER-PLANCK-KOLMOGOROV TIME FRACTIONAL DIFFERENTIAL EQUATIONS USING LEGENDRE WAVELET METHOD ALONG WITH CONVERGENCE AND ERROR ANALYSIS.
- Author
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MOHAMMADI, SHABAN and HEJAZI, S. REZA
- Subjects
NUMERICAL solutions for Markov processes ,FOKKER-Planck equation ,FRACTIONAL differential equations ,WAVELETS (Mathematics) - Abstract
The aim of this paper is to numerically solve the Fokker-Planck-Kolmogorov fractional-time differential equations using the Legendre wavelet. Also, we analyzed the convergence of function approximation using Legendre wavelets. Introduced the absolute value between the exact answer and the approximate answer obtained by the given numerical methods, and analyzed the error of the numerical method. This method has the advantage of being simple to solve. The results revealed that the suggested numerical method is highly accurate and effective. The results for some numerical examples are documented in table and graph form to elaborate on the efficiency and precision of the suggested method. The simulation was carried out using MATLAB software. In this paper and for the first time, the authors presented results on the numerical simulation for classes of time-fractional differential equations. The authors applied the reproducing Legendre wavelet method for the numerical solutions of nonlinear Fokker-Planck-Kolmogorov time-fractional differential equation. The method presented in the present study can be used by programmers, engineers, and other researchers in this field. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
29. Asymptotic long-wave model for a high-contrast two-layered elastic plate.
- Author
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Mikhasev, Gennadi
- Subjects
ELASTIC plates & shells ,ELASTICITY ,DIFFERENTIAL equations ,ELASTIC constants - Abstract
The paper is concerned with the derivation of asymptotically consistent equations governing the long-wave flexural response of a two-layered rectangular plate with high-contrast elastic properties. In the general case, the plate is under dynamic and variable surface, volume, and edge forces. Performing the asymptotic integration of the three-dimensional (3D) elasticity equations in the transverse direction and satisfying boundary conditions on the faces and interface, we derived the sequence of two-dimensional (2D) differential equations with respect to required functions in the first two approximations. The eight independent restraints for the generalized displacements and stress resultants are considered to formulate the 16 independent variants of boundary conditions. One of the main results of the paper is the Timoshenko–Reissner type equation capturing the effect of the softer layer and taking into account the in-plane deformation induced by the edge forces. Comparative calculations of natural frequencies were carried out based on our and alternative models. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
30. Equivalent converter method for analyzing complex DC–DC converting systems.
- Author
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Orel Moshe, Sagi and Berkovich, Yefim
- Subjects
DIRECT current machinery ,DIFFERENTIAL equations ,TRANSIENT analysis ,ELECTRICAL energy ,LAGRANGE equations - Abstract
This paper introduces a new approach for analyzing the dynamics of DC–DC converters. Currently, the primary widely accepted method for examining dynamic processes is the Small Signal Analysis technique. However, when applied to modern complex converters, this method poses additional challenges in formulating and solving systems of differential equations. The method proposed in this paper is based on its application to the analysis of dynamic modes of energy functions—Lagrangians. These functions make it possible to define simple criteria to describe the course of dynamic processes, and in the end define an equivalent (approximating) conventional converter identical to the original one with respect to the course of dynamics. If the magnetic and electrical energies in the Lagrangians of both the converters are equal, the outcome is practically identical transient processes. These findings were confirmed by both theoretical analysis and experimentally modelling the dynamics of the initial converter and an equivalent to it in the Matlab–Simscape program. An additional possibility of using the transfer functions of a conventional boost converter for the theoretical analysis of the converters of much greater orders is also discussed. The authors' experiments confirm the correctness of their theoretical conclusions. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
31. On the Solvability of Iterative Systems of Fractional-Order Differential Equations with Parameterized Integral Boundary Conditions.
- Author
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Krushna, Boddu Muralee Bala and Khuddush, Mahammad
- Subjects
DIFFERENTIAL equations ,BOUNDARY value problems ,FIXED point theory ,FRACTIONAL calculus ,MATHEMATICAL formulas - Abstract
The aim of this paper is to determine the eigenvalue intervals of μk; 1 < k < n for which an iterative systems of a class of fractional-order differential equations with parameterized integral boundary conditions (BCs) has at least one positive solution by means of standard fixed point theorem of cone type. To the best of our knowledge, this will be the first time that we attempt to reach such findings for the topic at hand in the literature. The obtained results in the paper are illustrated with an example for their feasibility. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
32. Numerical methods and their application in dynamics of structures.
- Author
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Vasiljević, Rade R.
- Subjects
LINEAR acceleration ,DIFFERENTIAL equations - Abstract
Copyright of Military Technical Courier / Vojnotehnicki Glasnik is the property of Military Technical Courier / Vojnotehnicki Glasnik and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)
- Published
- 2023
- Full Text
- View/download PDF
33. Hybridized Wrapper Filter Using Deep Neural Network for Intrusion Detection.
- Author
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Venkateswaran, N. and Umadevi, K.
- Subjects
CLOUD computing ,BIG data ,DIFFERENTIAL equations ,INTRUSION detection systems (Computer security) ,DATA extraction - Abstract
Huge data over the cloud computing and big data are processed over the network. The data may be stored, send, altered and communicated over the network between the source and destination. Once data send by source to destination, before reaching the destination data may be attacked by any intruders over the network. The network has numerous routers and devices to connect to internet. Intruders may attack any were in the network and breaks the original data, secrets. Detection of attack in the network became interesting task for many researchers. There are many intrusion detection feature selection algorithm has been suggested which lags on performance and accuracy. In our article we propose new IDS feature selection algorithm with higher accuracy and performance in detecting the intruders. The combination of wrapper filtering method using Pearson correlation with recursion function is used to eliminate the unwanted features. This feature extraction process clearly extracts the attacked data. Then the deep neural network is used for detecting intruders attack over the data in the network. This hybrid machine learning algorithm in feature extraction process helps to find attacked information using recursive function. Performance of proposed method is compared with existing solution. The traditional feature selection in IDS such as differential equation (DE), Gain ratio (GR), symmetrical uncertainty (SU) and artificial bee colony (ABC) has less accuracy than proposed PCRFE. The experimented results are shown that our proposed PCRFE-CDNN gives 99% of accuracy in IDS feature selection process and 98% in sensitivity. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
34. Estimation and Analysis of the Electric Arc Furnace Model Coefficients.
- Author
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Dietz, Markus, Grabowski, Dariusz, Klimas, Maciej, and Starkloff, Hans-Jorg
- Subjects
ARC furnaces ,ELECTRIC arc ,ELECTRIC furnaces ,MONTE Carlo method ,STOCHASTIC processes ,DIFFERENTIAL equations - Abstract
This paper is devoted to electric arc furnace (EAF) modeling using a random differential equation based on the power balance equation. The proposed approach broadens and improves the model through the introduction of stochastic processes in place of existing coefficients. The paper presents a method which enables the estimation of EAF model coefficients with the help of measurement data - voltage and current waveforms recorded during the melting stage of an EAF work cycle. The estimation process is conducted with a Monte Carlo method and genetic algorithm, which is applied iteratively to each of the defined frames of the input signal. The estimated coefficients have been analyzed with respect to their time variability as well as the probability distributions of their values and increments. The results have been extensively visualized. Next, the identification of the stochastic processes representing the model coefficients has been carried out. Based on the previous results and autocorrelation functions, the density functions and parameters of discrete-time stochastic processes were identified. The paper presents solutions validated with statistical tests. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
35. The unknown Baranov. Forty years of polemics over the formal theory of the life of fishes.
- Author
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Sharov, Alexei
- Subjects
FISHERY sciences ,FISH mortality ,DIFFERENTIAL equations ,POPULATION dynamics ,POLEMICS ,BYCATCHES ,FISH populations ,FISHERIES - Abstract
The year 2018 marked the 100th anniversary of the publication of paper "On the question of the biological basis of fisheries" by F.I. Baranov considered a cornerstone paper of modern fishery science. Baranov formalized population dynamics by describing changes in population abundance using differential equations, introducing the concept of instantaneous fishing and natural mortality rates, and developing his catch equation, which is the foundation of most modern age-structured stock assessment models. Baranov was the first to show the effect of fishing on population structure based on theoretical grounds. At the time of its publication, Baranov's paper did not receive much attention in Russia and was completely unknown to scientists in the West. The second publication (On the question of the dynamics of the fishing industry, 1925) received substantial criticism from many and sparked a furious debate between Baranov and his opponents that lasted for several decades. The history and content of those debates, expressed in multiple papers by Baranov, is still largely unknown. I describe the essence of arguments by Baranov and his opponents. The story of these scientific debates reveals how different philosophical concepts and dominant points of view evolved through time. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
36. THE ANALYSIS AND APPLICATION OF A NEW INTEGRAL TRANSFORM W Transform.
- Author
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Ping WANG, Xin-Yu PENG, and Fang WANG
- Subjects
INTEGRAL equations ,DIFFERENTIAL equations - Abstract
The main purpose of this paper is to introduce a new integral transform named the W transform. We have been obtained some important results about the W transform. At the same time, the relation between the W transform and other transforms has been established. In order to prove the efficiency of this transform, we have solved the differential equations and integral equations. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
37. Free Axisymmetric Vibrations of Functionally Graded Material Annular Plates via DTM.
- Author
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Sharma, Sumit Kumar and Ahlawat, Neha
- Subjects
FREE vibration ,TAYLOR'S series ,MODE shapes ,YOUNG'S modulus ,RADIUS (Geometry) ,DIFFERENTIAL equations - Abstract
In this paper, a semi-analytical technique based on Taylor's series method namely DTM has been used to solve the differential equation which governs the motion of three types of annular FGM plates. The differential equation has been obtained using Hamilton principle and classical plate theory. The mechanical properties of the plate (Young's modulus and density) are considered to be graded in thickness direction and vary following the power-law. The behaviour of volume fraction index and radii ratio has been investigated onto first three modes of frequency parameter for all three plates. Moreover, the novelty of this paper is the application of the versatile technique DTM to study the effect of radii ratio and volume fraction index on three different types of annular FGM plates. A comparison has been made between the obtained numerical results and the results are available in the literature. A good agreement of the results verifies the accuracy of the present technique. Three-dimensional mode shapes for all three plates are also presented. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
38. QUALITATIVE ANALYSIS OF NEUTRAL IMPLICIT FRACTIONAL q-DIFFERENCE EQUATIONS WITH DELAY.
- Author
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BENCHAIB, ABDELLATIF, SALIM, ABDELKRIM, ABBAS, SAÏD, and BENCHOHRA, MOUFFAK
- Subjects
CAPUTO fractional derivatives ,QUALITATIVE research ,DIFFERENTIAL equations ,FINITE element method ,BANACH spaces - Abstract
This paper explores the existence and stability of implicit neutral Caputo fractional qdifference equations within four distinct classes, incorporating various delay types such as finite, infinite, and state-dependent delays. To establish the existence of solutions, we utilize the fixed point theorem of Krasnoselskii in Banach spaces. The concluding section provides illustrative examples that highlight the obtained results. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
39. Asymptotic and Oscillatory Analysis of Fourth-Order Nonlinear Differential Equations with p -Laplacian-like Operators and Neutral Delay Arguments.
- Author
-
Alatwi, Mansour, Moaaz, Osama, Albalawi, Wedad, Masood, Fahd, and El-Metwally, Hamdy
- Subjects
NONLINEAR differential equations ,DELAY differential equations ,NONLINEAR analysis ,DIFFERENTIAL equations - Abstract
This paper delves into the asymptotic and oscillatory behavior of all classes of solutions of fourth-order nonlinear neutral delay differential equations in the noncanonical form with damping terms. This research aims to improve the relationships between the solutions of these equations and their corresponding functions and derivatives. By refining these relationships, we unveil new insights into the asymptotic properties governing these solutions. These insights lead to the establishment of improved conditions that ensure the nonexistence of any positive solutions to the studied equation, thus obtaining improved oscillation criteria. In light of the broader context, our findings extend and build upon the existing literature in the field of neutral differential equations. To emphasize the importance of the results and their applicability, this paper concludes with some examples. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
40. Multidimensional Diffusion-Wave-Type Solutions to the Second-Order Evolutionary Equation.
- Author
-
Kazakov, Alexander and Lempert, Anna
- Subjects
EVOLUTION equations ,ORDINARY differential equations ,DIFFERENTIAL equations ,PARTIAL differential equations ,MATHEMATICAL physics ,ANALYTIC functions - Abstract
The paper concerns a nonlinear second-order parabolic evolution equation, one of the well-known objects of mathematical physics, which describes the processes of high-temperature thermal conductivity, nonlinear diffusion, filtration of liquid in a porous medium and some other processes in continuum mechanics. A particular case of it is the well-known porous medium equation. Unlike previous studies, we consider the case of several spatial variables. We construct and study solutions that describe disturbances propagating over a zero background with a finite speed, usually called 'diffusion-wave-type solutions'. Such effects are atypical for parabolic equations and appear since the equation degenerates on manifolds where the desired function vanishes. The paper pays special attention to exact solutions of the required type, which can be expressed as either explicit or implicit formulas, as well as a reduction of the partial differential equation to an ordinary differential equation that cannot be integrated in quadratures. In this connection, Cauchy problems for second-order ordinary differential equations arise, inheriting the singularities of the original formulation. We prove the existence of continuously differentiable solutions for them. A new example, an analog of the classic example by S.V. Kovalevskaya for the considered case, is constructed. We also proved a new existence and uniqueness theorem of heat-wave-type solutions in the class of piece-wise analytic functions, generalizing previous ones. During the proof, we transit to the hodograph plane, which allows us to overcome the analytical difficulties. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
41. Analyzing the Asymptotic Behavior of an Extended SEIR Model with Vaccination for COVID-19.
- Author
-
Papageorgiou, Vasileios E., Vasiliadis, Georgios, and Tsaklidis, George
- Subjects
GLOBAL analysis (Mathematics) ,COVID-19 vaccines ,BASIC reproduction number ,KALMAN filtering ,COVID-19 pandemic ,DIFFERENTIAL equations - Abstract
Several research papers have attempted to describe the dynamics of COVID-19 based on systems of differential equations. These systems have taken into account quarantined or isolated cases, vaccinations, control measures, and demographic parameters, presenting propositions regarding theoretical results that often investigate the asymptotic behavior of the system. In this paper, we discuss issues that concern the theoretical results proposed in the paper "An Extended SEIR Model with Vaccination for Forecasting the COVID-19 Pandemic in Saudi Arabia Using an Ensemble Kalman Filter". We propose detailed explanations regarding the resolution of these issues. Additionally, this paper focuses on extending the local stability analysis of the disease-free equilibrium, as presented in the aforementioned paper, while emphasizing the derivation of theorems that validate the global stability of both epidemic equilibria. Emphasis is placed on the basic reproduction number R 0 , which determines the asymptotic behavior of the system. This index represents the expected number of secondary infections that are generated from an already infected case in a population where almost all individuals are susceptible. The derived propositions can inform health authorities about the long-term behavior of the phenomenon, potentially leading to more precise and efficient public measures. Finally, it is worth noting that the examined paper still presents an interesting epidemiological scheme, and the utilization of the Kalman filtering approach remains one of the state-of-the-art methods for modeling epidemic phenomena. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
42. ELASTIC BUCKLING OF A RECTANGULAR SANDWICH PLATE WITH AN INDIVIDUAL FUNCTIONALLY GRADED CORE.
- Author
-
MAGNUCKI, KRZYSZTOF, MAGNUCKA-BLANDZI, EWA, and SOWIŃSKI, KRZYSZTOF
- Subjects
FUNCTIONALLY gradient materials ,MECHANICAL buckling ,SANDWICH construction (Materials) ,DIFFERENTIAL equations ,FINITE element method - Abstract
This paper is devoted to a thin-walled sandwich plate with an individual functionally graded core. The nonlinear shear deformation theory of a straight normal line is applied. A system of three differential equations of equilibrium of this plate is obtained, based on the principle of stationary potential energy, which is reduced to two differential equations and solved analytically. The critical load of the rectangular sandwich plate is determined. A detailed analytical study is carried out for selected exemplary plates. Moreover, a numerical FEM model of this plate is developed. The results of these calculations are compared with each other. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
43. Practical problems of dynamic similarity criteria in fluid-solid interaction at different fluid-solid relative motions.
- Author
-
Flaga, Andrzej, Kłaput, Renata, and Flaga, Łukasz
- Subjects
FLUID dynamics ,RELATIVE motion ,DIFFERENTIAL equations ,MACH number ,VELOCITY - Abstract
Copyright of Archives of Civil Engineering (Polish Academy of Sciences) is the property of Polish Academy of Sciences and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)
- Published
- 2024
- Full Text
- View/download PDF
44. A System of Coupled Impulsive Neutral Functional Differential Equations: New Existence Results Driven by Fractional Brownian Motion and the Wiener Process.
- Author
-
Moumen, Abdelkader, Ferhat, Mohamed, Benaissa Cherif, Amin, Bouye, Mohamed, and Biomy, Mohamad
- Subjects
WIENER processes ,FUNCTIONAL differential equations ,IMPULSIVE differential equations ,BROWNIAN motion ,FRACTIONAL differential equations ,BANACH spaces ,STOCHASTIC systems - Abstract
Conditions for the existence and uniqueness of mild solutions for a system of semilinear impulsive differential equations with infinite fractional Brownian movements and the Wiener process are established. Our approach is based on a novel application of Burton and Kirk's fixed point theorem in extended Banach spaces. This paper aims to extend current results to a differential-inclusions scenario. The motivation of this paper for impulsive neutral differential equations is to investigate the existence of solutions for impulsive neutral differential equations with fractional Brownian motion and a Wiener process (topics that have not been considered and are the main focus of this paper). [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
45. Lie symmetry analysis, conservation laws and diverse solutions of a new extended (2+1)-dimensional Ito equation.
- Author
-
Ziying Qi and Lianzhong Li
- Subjects
CONSERVATION laws (Mathematics) ,CONSERVATION laws (Physics) ,LINEAR differential equations ,DIFFERENTIAL equations ,ORDINARY differential equations ,NONLINEAR equations - Abstract
In this paper, a new class of extended (2+1)-dimensional Ito equations is investigated for its group invariant solutions. The Lie symmetry method is employed to transform the nonlinear Ito equation into an ordinary differential equation. The general solution of the solvable linear differential equation with different parameters is obtained, and the plot of the solvable linear differential equation is given. A power series solution for the equation is then derived. Furthermore, a conservation law for the equation is constructed by utilizing a new Ibragimov conservation theorem. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
46. Conservation laws and symmetry analysis of a generalized Drinfeld-Sokolov system.
- Author
-
Garrido, Tamara M., de la Rosa, Rafael, Recio, Elena, and Márquez, Almudena P.
- Subjects
CONSERVATION laws (Mathematics) ,CONSERVATION laws (Physics) ,ORDINARY differential equations ,PARTIAL differential equations ,SYMMETRY ,DIFFERENTIAL equations - Abstract
The generalized Drinfeld-Sokolov system is a widely-used model that describes wave phenomena in various contexts. Many properties of this system, such as Hamiltonian formulations and integrability, have been extensively studied and exact solutions have been derived for specific cases. In this paper we applied the direct method of multipliers to obtain all low-order local conservation laws of the system. These conservation laws correspond to physical quantities that remain constant over time, such as energy and momentum, and we provided a physical interpretation for each of them. Additionally, we investigated the Lie point symmetries and first-order symmetries of the system. Through the point symmetries and constructing the optimal systems of one-dimensional subalgebras, we were able to reduce the system of partial differential equations to ordinary differential systems and obtain new solutions for the system. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
47. Performance estimation of parallel Syste under online and offline preventive maintenance.
- Author
-
AYAGI, Hamisu Ismail, Zhong WAN, YUSUF, Ibrahim, and SANUSI, Abdullahi
- Subjects
- *
COST analysis , *DIFFERENTIAL equations , *SUPERVISORS , *DESIGNERS - Abstract
In this paper, the reliability characteristics of a parallel system are investigated. The parallel system under consideration is made up of three active units that run in parallel, with two of them having to be operational in order for the system to work. The main purpose of this study is to quantify/examine the effect of online and offline preventive maintenance. Preventive maintenance is carried out on the systems in two ways: online and offline preventive maintenance. After the first unit of each system fails, online preventive maintenance is performed. Following the failure of the second unit of each system, offline preventive maintenance is performed. Partial and complete failures are the two types of failures that may occur. Both systems can undergo exponential failure and repair. Using supplementary variable technique, Laplace transform, and Copula repair approach, the system of first-order differential equations associated with system effectiveness, which are crucial to this research, is established and resolved. Tables and graphs are used to illustrate the important findings based on assumed numerical values. System designers, programmers, and maintenance supervisors will be able to create and maintain more crucial systems with the assistance of this research paper. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
48. The Exact Density of the Eigenvalues of the Wishart and Matrix-Variate Gamma and Beta Random Variables.
- Author
-
Mathai, A. M. and Provost, Serge B.
- Subjects
SYMMETRIC functions ,BETA distribution ,GAMMA distributions ,DIFFERENTIAL equations ,BETA functions ,GAMMA functions - Abstract
The determination of the distributions of the eigenvalues associated with matrix-variate gamma and beta random variables of either type proves to be a challenging problem. Several of the approaches utilized so far yield unwieldy representations that, for instance, are expressed in terms of multiple integrals, functions of skew symmetric matrices, ratios of determinants, solutions of differential equations, zonal polynomials, and products of incomplete gamma or beta functions. In the present paper, representations of the density functions of the smallest, largest and j th largest eigenvalues of matrix-variate gamma and each type of beta random variables are explicitly provided as finite sums when certain parameters are integers and, as explicit series, in the general situations. In each instance, both the real and complex cases are considered. The derivations initially involve an orthonormal or unitary transformation whereby the wedge products of the differential elements of the eigenvalues can be worked out from those of the original matrix-variate random variables. Some of these results also address the distribution of the eigenvalues of a central Wishart matrix as well as eigenvalue problems arising in connection with the analysis of variance procedure and certain tests of hypotheses in multivariate analysis. Additionally, three numerical examples are provided for illustration purposes. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
49. Potential Functions for Functionally Graded Transversely Isotropic Media Subjected to Thermal Source in Thermoelastodynamics Problems.
- Author
-
Panahi, Siavash and Navayi Neya, Bahram
- Subjects
FUNCTIONALLY gradient materials ,POTENTIAL functions ,EQUATIONS of motion ,DIFFERENTIAL equations ,HEAT equation ,MECHANICAL loads - Abstract
This paper develops a novel set of displacement temperature potential functions to solve the thermoelastodynamic problems in functionally graded transversely isotropic media subjected to thermal source. For this purpose, three-dimensional heat and wave equations are considered to obtain the displacement temperature equations of motion for functionally graded materials. In the present study, a systematic method is used to decouple the elasticity and heat equations. Hence one sixth-order differential equation and two second-order differential equations are obtained. Completeness of the solution is proved using a retarded logarithmic Newtonian potential function for functionally graded transversely isotropic domain. To verify the obtained solution, in a simpler case, potential functions are generated for homogeneous transversely isotropic media that coincide with respective equations. Presented potential functions can be used to solve the problems in various media like infinite and semi-infinite space, beams and columns, plates, shells, etc., with arbitrary boundary conditions and subjected to arbitrary mechanical and thermal loads. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
50. Eighth-Order Numerov-Type Methods Using Varying Step Length.
- Author
-
Alshammari, Obaid, Aoun, Sondess Ben, Kchaou, Mourad, Simos, Theodore E., Tsitouras, Charalampos, and Jerbi, Houssem
- Subjects
INITIAL value problems ,NUMERICAL analysis ,DIFFERENTIAL equations ,INTERPOLATION ,ALGORITHMS - Abstract
This work explores a well-established eighth-algebraic-order numerical method belonging to the explicit Numerov-type family. To enhance its efficiency, we integrated a cost-effective algorithm for adjusting the step size. After each step, the algorithm either maintains the current step length, halves it, or doubles it. Any off-step points required by this technique are calculated using a local interpolation function. Numerical tests involving diverse problems demonstrate the significant efficiency improvements achieved through this approach. The method is particularly effective for solving differential equations with oscillatory behavior, showcasing its ability to maintain high accuracy with fewer function evaluations. This advancement is crucial for applications requiring precise solutions over long intervals, such as in physics and engineering. Additionally, the paper provides a comprehensive MATLAB-R2018a implementation, facilitating ease of use and further research in the field. By addressing both computational efficiency and accuracy, this study contributes a valuable tool for the numerical analysis community. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
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