Showing total 202 results

1. 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

2. 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

3. "Differential Equations of Mathematical Physics and Related Problems of Mechanics"—Editorial 2021–2023.

Author

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

4. 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

5. Kamenev-Type Criteria for Testing the Asymptotic Behavior of Solutions of Third-Order Quasi-Linear Neutral Differential Equations.

Author

Alrashdi, Hail S., Albalawi, Wedad, Muhib, Ali, Moaaz, Osama, and Elabbasy, Elmetwally M.

Subjects

*DIFFERENTIAL equations

Abstract

This paper aims to study the asymptotic properties of nonoscillatory solutions (eventually positive or negative) of a class of third-order canonical neutral differential equations. We use Riccati substitution to reduce the order of the considered equation, and then we use the Philos function class to obtain new criteria of the Kamenev type, which guarantees that all nonoscillatory solutions converge to zero. This approach is characterized by the possibility of applying its conditions to a wider area of equations. This is not the only aspect that distinguishes our results; we also use improved relationships between the solution and the corresponding function, which in turn is reflected in a direct improvement of the criteria. The findings in this article extend and generalize previous findings in the literature and also improve some of these findings. [ABSTRACT FROM AUTHOR]

Published

2024

6. On the Oscillatory Behavior of Solutions of Second-Order Non-Linear Differential Equations with Damping Term.

Author

Mazen, Mohamed, El-Sheikh, Mohamed M. A., Euat Tallah, Samah, and Ismail, Gamal A. F.

Subjects

*NONLINEAR differential equations, *DIFFERENTIAL equations

Abstract

In this paper, we discuss the oscillatory behavior of solutions of two general classes of nonlinear second-order differential equations. New criteria are obtained using Riccati transformations and the integral averaging techniques. The obtained results improve and generalize some recent criteria in the literature. Moreover, a traditional condition is relaxed. Three examples are given to justify the results. [ABSTRACT FROM AUTHOR]

Published

2024

7. 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

8. The Application of the Random Time Transformation Method to Estimate Richards Model for Tree Growth Prediction.

Author

Cornejo, Óscar, Muñoz-Herrera, Sebastián, Baesler, Felipe, and Rebolledo, Rodrigo

Subjects

*TREE growth, *STOCHASTIC differential equations, *DIFFERENTIAL forms, *ORDINARY differential equations, *DIFFERENTIAL equations, *PARAMETER estimation

Abstract

To model dynamic systems in various situations results in an ordinary differential equation of the form d y d t = g (y , t , θ) , where g denotes a function and θ stands for a parameter or vector of unknown parameters that require estimation from observations. In order to consider environmental fluctuations and numerous uncontrollable factors, such as those found in forestry, a stochastic noise process ϵ t may be added to the aforementioned equation. Thus, a stochastic differential equation is obtained: d Y t d t = f (Y t , t , θ) + ϵ t . This paper introduces a method and procedure for parameter estimation in a stochastic differential equation utilising the Richards model, facilitating growth prediction in a forest's tree population. The fundamental concept of the approach involves assuming that a deterministic differential equation controls the development of a forest stand, and that randomness comes into play at the moment of observation. The technique is utilised in conjunction with the logistic model to examine the progression of an agricultural epidemic induced by a virus. As an alternative estimation method, we present the Random Time Transformation (RTT) method. Thus, this paper's primary contribution is the application of the RTT method to estimate the Richards model, which has not been conducted previously. The literature often uses the logistic or Gompertz models due to difficulties in estimating the parameter form of the Richards model. Lastly, we assess the effectiveness of the RTT Method applied to the Chapman–Richards model using both simulated and real-life data. [ABSTRACT FROM AUTHOR]

Published

2023

9. Modeling and Verification of Uncertain Cyber-Physical System Based on Decision Processes †.

Author

Chen, Na, Geng, Shengling, and Li, Yongming

Subjects

*DECISION making, *CYBER physical systems, *UNCERTAIN systems, *EXPLOSIONS, *DIFFERENTIAL equations, *RELIABILITY in engineering, *ROBOTS

Abstract

Currently, there is uncertainty in the modeling techniques of cyber-physical systems (CPS) when faced with the multiple possibilities and distributions of complex system behavior. This uncertainty leads to the system's inability to handle uncertain data correctly, resulting in lower reliability of the system model. Additionally, existing technologies struggle to verify the activity and safety of CPS after modeling, lacking a dynamic verification and analysis approach for uncertain CPS properties.This paper introduces a generalized possibility decision process as a system model. Firstly, the syntax and semantics of generalized possibility temporal logic with decision processes are defined. Uncertain CPS is extended by modeling it based on time-based differential equations and uncertainty hybrid time automaton. After that, model checking is performed on the properties of activity and safety using fuzzy linear time properties. Finally, a cold–hot hybrid constant-temperature system model is used for simulation experiments. By combining theory and experiments, this paper provides a new approach to the verification of uncertain CPS, effectively addressing the state explosion problem. It plays a crucial role in the design of uncertain CPS and offers a key solution for model checking in the presence of uncertainty. [ABSTRACT FROM AUTHOR]

Published

2023

10. Property (A) and Oscillation of Higher-Order Trinomial Differential Equations with Retarded and Advanced Arguments.

Author

Baculikova, Blanka

Subjects

*DELAY differential equations, *OSCILLATIONS, *DIFFERENTIAL equations

Abstract

In this paper, a new effective technique for the investigation of the higher-order trinomial differential equations y (n) (t) + p (t) y (τ (t)) + q (t) y (σ (t)) = 0 is established. We offer new criteria for so-called property (A) and oscillation of the considered equation. Examples are provided to illustrate the importance of our results. [ABSTRACT FROM AUTHOR]

Published

2024

11. Dynamic Analysis of the M/G/1 Stochastic Clearing Queueing Model in a Three-Phase Environment.

Author

Yiming, Nurehemaiti

Subjects

*DIFFERENTIAL equations, *DYNAMICAL systems, *INTEGRO-differential equations

Abstract

In this paper, we consider the M/G/1 stochastic clearing queueing model in a three-phase environment, which is described by integro-partial differential equations (IPDEs). Our first result is semigroup well-posedness for the dynamic system. Utilizing a C 0 —semigroup theory, we prove that the system has a unique positive time-dependent solution (TDS) that satisfies the probability condition. As our second result, we prove that the TDS of the system strongly converges to its steady-state solution (SSS) if the service rates of the servers are constants. For this asymptotic behavior, we analyze the spectrum of the system operator associated with the system. Additionally, the stability of the semigroup generated by the system operator is also discussed. [ABSTRACT FROM AUTHOR]

Published

2024

12. Optimal Corrective Maintenance Policies via an Availability-Cost Hybrid Factor for Software Aging Systems.

Author

Huo, Huixia

Subjects

*SYSTEMS software, *SYSTEMS availability, *DIFFERENTIAL equations

Abstract

Availability is an important index for the evaluation of the performance of software aging systems. Although the corrective maintenance increases the system availability, the associated cost may be very high; therefore, the balancing of availability and cost during the corrective maintenance phase is a critical issue. This paper investigates optimal corrective maintenance policies via an availability-cost hybrid factor for software aging systems. The system is described by a group of coupled differential equations, where the multiplier effect of the repair rate on a system variable is bilinear term. Our aim is to drive an optimal repair rate that ensures a balance between the maximal system availability and the minimal repair cost. In a finite time interval [ 0 , T ] , we rigorously discuss the state space of the system and prove the existence of the optimal repair rate, and then derive the first-order necessary optimality conditions by applying a variational inequality with the adjoint variables. [ABSTRACT FROM AUTHOR]

Published

2024

13. Application of the Improved Cuckoo Algorithm in Differential Equations.

Author

Sun, Yan

Subjects

*DIFFERENTIAL equations, *BOUNDARY value problems, *NUMERICAL solutions to differential equations, *OPTIMIZATION algorithms, *ALGORITHMS, *FOURIER series

Abstract

To address the drawbacks of the slow convergence speed and lack of individual information exchange in the cuckoo search (CS) algorithm, this study proposes an improved cuckoo search algorithm based on a sharing mechanism (ICSABOSM). The enhanced algorithm reinforces information sharing among individuals through the utilization of a sharing mechanism. Additionally, new search strategies are introduced in both the global and local searches of the CS. The results from numerical experiments on four standard test functions indicate that the improved algorithm outperforms the original CS in terms of search capability and performance. Building upon the improved algorithm, this paper introduces a numerical solution approach for differential equations involving the coupling of function approximation and intelligent algorithms. By constructing an approximate function using Fourier series to satisfy the conditions of the given differential equation and boundary conditions with minimal error, the proposed method minimizes errors while satisfying the differential equation and boundary conditions. The problem of solving the differential equation is then transformed into an optimization problem with the coefficients of the approximate function as variables. Furthermore, the improved cuckoo search algorithm is employed to solve this optimization problem. The specific steps of applying the improved algorithm to solve differential equations are illustrated through examples. The research outcomes broaden the application scope of the cuckoo optimization algorithm and provide a new perspective for solving differential equations. [ABSTRACT FROM AUTHOR]

Published

2024

14. Common Best Proximity Point Theorems for Generalized Dominating with Graphs and Applications in Differential Equations.

Author

Atiponrat, Watchareepan, Khemphet, Anchalee, Chaiwino, Wipawinee, Suebcharoen, Teeranush, and Charoensawan, Phakdi

Subjects

*DIFFERENTIAL equations, *BOUNDARY value problems, *METRIC spaces

Abstract

In this paper, we initiate a concept of graph-proximal functions. Furthermore, we give a notion of being generalized Geraghty dominating for a pair of mappings. This permits us to establish the existence of and unique results for a common best proximity point of complete metric space. Additionally, we give a concrete example and corollaries related to the main theorem. In particular, we apply our main results to the case of metric spaces equipped with a reflexive binary relation. Finally, we demonstrate the existence of a solution to boundary value problems of particular second-order differential equations. [ABSTRACT FROM AUTHOR]

Published

2024

15. Numerical Integration of Highly Oscillatory Functions with and without Stationary Points.

Author

Lovetskiy, Konstantin P., Sevastianov, Leonid A., Hnatič, Michal, and Kulyabov, Dmitry S.

Subjects

*NUMERICAL integration, *DIFFERENTIAL equations, *ALGEBRAIC equations, *COLLOCATION methods, *ORDINARY differential equations, *LINEAR equations

Abstract

This paper proposes an original approach to calculating integrals of rapidly oscillating functions, based on Levin's algorithm, which reduces the search for an anti-derivative function to solve an ODE with a complex coefficient. The direct solution of the differential equation is based on the method of integrating factors. The reduction in the original integration problem to a two-stage method for solving ODEs made it possible to overcome the instability that arises in the standard (in the form of solving a system of linear algebraic equations) approach to the solution. And due to the active use of Chebyshev interpolation when using the collocation method on Gauss–Lobatto grids, it is possible to achieve high speed and stability when taking into account a large number of collocation points. The presented spectral method of integrating factors is both flexible and reliable and allows for avoiding the ambiguities that arise when applying the classical method of collocation for the ODE solution (Levin) in the physical space. The new method can serve as a basis for solving ordinary differential equations of the first and second orders when creating high-efficiency software, which is demonstrated by solving several model problems. [ABSTRACT FROM AUTHOR]

Published

2024

16. Necessary and Sufficient Conditions for Solvability of an Inverse Problem for Higher-Order Differential Operators.

Author

Bondarenko, Natalia P.

Subjects

*SPECTRAL theory, *DIFFERENTIAL equations, *DIFFERENTIAL operators, *LINEAR equations, *SELFADJOINT operators, *INVERSE problems, *EIGENVALUES

Abstract

We consider an inverse spectral problem that consists in the recovery of the differential expression coefficients for higher-order operators with separate boundary conditions from the spectral data (eigenvalues and weight numbers). This paper is focused on the principal issue of inverse spectral theory, namely, on the necessary and sufficient conditions for the solvability of the inverse problem. In the framework of the method of the spectral mappings, we consider the linear main equation of the inverse problem and prove the unique solvability of this equation in the self-adjoint case. The main result is obtained for the first-order system of the general form, which can be applied to higher-order differential operators with regular and distribution coefficients. From the theorem on the main equation's solvability, we deduce the necessary and sufficient conditions for the spectral data for a class of arbitrary order differential operators with distribution coefficients. As a corollary of our general results, we obtain the characterization of the spectral data for the fourth-order differential equation in terms of asymptotics and simple structural properties. [ABSTRACT FROM AUTHOR]

Published

2024

17. (I q)–Stability and Uniform Convergence of the Solutions of Singularly Perturbed Boundary Value Problems.

Author

Vrabel, Robert

Subjects

*BOUNDARY value problems, *DIFFERENTIAL equations, *ORDINARY differential equations

Abstract

In this paper, using the notion of ( I q )–stability and the method of a priori estimates, known as the method of lower and upper solutions, the sufficient conditions guaranteeing uniform convergence of solutions to the solution of a reduced problem on the entire interval [ a , b ] have been established for four different types of boundary conditions for a singularly perturbed differential equation ε y ″ = f (x , y , y ′) ,   a ≤ x ≤ b . In the second part of the paper, by employing the Peano phenomenon, we analyzed the structure of the solutions of the reduced problem f (x , y , y ′) = 0 . [ABSTRACT FROM AUTHOR]

Published

2023

18. Positive Periodic Solution for Neutral-Type Integral Differential Equation Arising in Epidemic Model.

Author

Yang, Qing, Wang, Xiaojing, Cheng, Xiwang, Du, Bo, and Zhao, Yuxiao

Subjects

*DIFFERENTIAL equations, *INTEGRAL equations, *EPIDEMICS, *FUNCTIONAL differential equations, *CONTINUATION methods

Abstract

This paper is devoted to investigating a class of neutral-type integral differential equations arising in an epidemic model. By using Mawhin's continuation theorem and the properties of neutral-type operators, we obtain the existence conditions for positive periodic solutions of the considered neutral-type integral differential equation. Compared with previous results, the existence conditions in this paper are less restricted, thus extending the results of the existing literature. Finally, two examples are given to show the effectiveness and merits of the main results of this paper. Our results can be used to obtain the existence of a positive periodic solution to the corresponding non-neutral-type integral differential equation. [ABSTRACT FROM AUTHOR]

Published

2023

19. Synchronization Analysis of Linearly Coupled Systems with Signal-Dependent Noises.

Author

Ren, Yanhao, Luo, Qiang, and Lu, Wenlian

Subjects

*SYNCHRONIZATION, *MULTIAGENT systems, *NOISE, *DIFFERENTIAL equations, *DYNAMICAL systems

Abstract

In this paper, we propose methods for analyzing the synchronization stability of stochastic linearly coupled differential equation systems, with signal-dependent noise perturbation. We consider signal-dependent noise, which is common in many fields, to discuss the stability of the synchronization manifold of multiagent systems and linearly coupled nonlinear dynamical systems under sufficient conditions. Numerical simulations are performed in the paper, and the results show the effectiveness of our theorems. [ABSTRACT FROM AUTHOR]

Published

2023

20. Bifurcating Limit Cycles with a Perturbation of Systems Composed of Piecewise Smooth Differential Equations Consisting of Four Regions.

Author

Zhang, Erli, Yang, Jihua, and Shateyi, Stanford

Subjects

*DIFFERENTIAL equations

Abstract

Systems composed of piecewise smooth differential (PSD) mappings have quantitatively been searched for answers to a substantial issue of limit cycle (LC) bifurcations. In this paper, LC numbers (LCNs) of a PSD system (PSDS) consisting of four regions are dealt with. A Melnikov mapping whose order is one is implicitly obtained by finding its originators when the system is perturbed under any nth degree of real polynomials. Then, the approach employing the Picard–Fuchs mapping is utilized to attain a higher boundary of bifurcation LCNs of systems composed of PSD functions with a global center. The method we used could be implemented to examine the problems related to the LC of other PSDS. [ABSTRACT FROM AUTHOR]

Published

2023

21. A Finite-Dimensional Integrable System Related to the Kadometsev–Petviashvili Equation.

Author

Liu, Wei, Liu, Yafeng, Wei, Junxuan, and Yuan, Shujuan

Subjects

*DIFFERENTIAL equations, *LAGRANGE equations, *EQUATIONS, *EULER-Lagrange equations, *LAX pair

Abstract

In this paper, the Kadometsev–Petviashvili equation and the Bargmann system are obtained from a second-order operator spectral problem L φ = (∂ 2 − v ∂ − λ u) φ = λ φ x . By means of the Euler–Lagrange equations, a suitable Jacobi–Ostrogradsky coordinate system is established. Using Cao's method and the associated Bargmann constraint, the Lax pairs of the differential equations are nonlinearized. Then, a new kind of finite-dimensional Hamilton system is generated. Moreover, involutive representations of the solutions of the Kadometsev–Petviashvili equation are derived. [ABSTRACT FROM AUTHOR]

Published

2023

22. A Mechanistic Model for Long COVID Dynamics.

Author

Derrick, Jacob, Patterson, Ben, Bai, Jie, and Wang, Jin

Subjects

*POST-acute COVID-19 syndrome, *COVID-19, *POPULATION dynamics, *MATHEMATICAL analysis, *DIFFERENTIAL equations, *LOTKA-Volterra equations

Abstract

Long COVID, a long-lasting disorder following an acute infection of COVID-19, represents a significant public health burden at present. In this paper, we propose a new mechanistic model based on differential equations to investigate the population dynamics of long COVID. By connecting long COVID with acute infection at the population level, our modeling framework emphasizes the interplay between COVID-19 transmission, vaccination, and long COVID dynamics. We conducted a detailed mathematical analysis of the model. We also validated the model using numerical simulation with real data from the US state of Tennessee and the UK. [ABSTRACT FROM AUTHOR]

Published

2023

23. Analysis of Within-Host Mathematical Models of Toxoplasmosis That Consider Time Delays.

Author

Sultana, Sharmin, González-Parra, Gilberto, and Arenas, Abraham J.

Subjects

*BASIC reproduction number, *MATHEMATICAL models, *TOXOPLASMOSIS, *MATHEMATICAL analysis, *ORDINARY differential equations, *DIFFERENTIAL equations

Abstract

In this paper, we investigate two within-host mathematical models that are based on differential equations. These mathematical models include healthy cells, tachyzoites, and bradyzoites. The first model is based on ordinary differential equations and the second one includes a discrete time delay. We found the models' steady states and computed the basic reproduction number R 0 . Two equilibrium points exist in both models: the first is the disease-free equilibrium point and the second one is the endemic equilibrium point. We found that the initial quantity of uninfected cells has an impact on the basic reproduction number R 0 . This threshold parameter also depends on the contact rate between tachyzoites and uninfected cells, the contact rate between encysted bradyzoite and the uninfected cells, the conversion rate from tachyzoites to bradyzoites, and the death rate of the bradyzoites- and tachyzoites-infected cells. We investigated the local and global stability of the two equilibrium points for the within-host models that are based on differential equations. We perform numerical simulations to validate our analytical findings. We also demonstrated that the disease-free equilibrium point cannot lose stability regardless of the value of the time delay. The numerical simulations corroborated our analytical results. [ABSTRACT FROM AUTHOR]

Published

2023

24. On the Properties of λ -Prolongations and λ -Symmetries.

Author

Li, Wenjin, Li, Xiuling, and Pang, Yanni

Subjects

*VECTOR fields, *DIFFERENTIAL equations, *INDEPENDENT sets

Abstract

In this paper, (1) We show that if there are not enough symmetries and λ -symmetries, some first integrals can still be obtained. And we give two examples to illustrate this theorem. (2) We prove that when X is a λ -symmetry of differential equation field Γ , by multiplying Γ a function μ defineded on J n − 1 M , the vector fields μ Γ can pass to quotient manifold Q by a group action of λ -symmetry X. (3) If there are some λ -symmetries of equation considered, we show that the vector fields from their linear combination are symmetries of the equation under some conditions. And if we have vector field X defined on J n − 1 M with first-order λ -prolongation Y and first-order standard prolongations Z of X defined on J n M , we prove that g Y cannot be first-order λ -prolonged vector field of vector field g X if g is not a constant function. (4) We provide a complete set of functionally independent (n − 1) order invariants for V (n − 1) which are n − 1 th prolongation of λ -symmetry of V and get an explicit n − 1 order reduced equation of explicit n order ordinary equation considered. (5) Assume there is a set of vector fields X i , i = 1 ,... , n that are in involution, We claim that under some conditions, their λ -prolongations also in involution. [ABSTRACT FROM AUTHOR]

Published

2023

25. Solution of the Goursat Problem for a Fourth-Order Hyperbolic Equation with Singular Coefficients by the Method of Transmutation Operators.

Author

Sitnik, Sergei M. and Karimov, Shakhobiddin T.

Subjects

*DIFFERENTIAL equations, *EQUATIONS, *HYPERBOLIC differential equations, *INTEGRAL operators, *PROBLEM solving

Abstract

In this paper, the method of transmutation operators is used to construct an exact solution of the Goursat problem for a fourth-order hyperbolic equation with a singular Bessel operator. We emphasise that in many other papers and monographs the fractional Erdélyi-Kober operators are used as integral operators, but our approach used them as transmutation operators with additional new properties and important applications. Specifically, it extends its properties and applications to singular differential equations, especially with Bessel-type operators. Using this operator, the problem under consideration is reduced to a similar problem without the Bessel operator. The resulting auxiliary problem is solved by the Riemann method. On this basis, an exact solution of the original problem is constructed and analyzed. [ABSTRACT FROM AUTHOR]

Published

2023

26. Inequalities for Riemann–Liouville-Type Fractional Derivatives of Convex Lyapunov Functions and Applications to Stability Theory.

Author

Agarwal, Ravi P., Hristova, Snezhana, and O'Regan, Donal

Subjects

*LYAPUNOV functions, *STABILITY theory, *SPECIAL functions, *ABSOLUTE value, *DIFFERENTIAL equations, *CONVEX functions, *FRACTIONAL differential equations

Abstract

In recent years, various qualitative investigations of the properties of differential equations with different types of generalizations of Riemann–Liouville fractional derivatives were studied and stability properties were investigated, usually using Lyapunov functions. In the application of Lyapunov functions, we need appropriate inequalities for the fractional derivatives of these functions. In this paper, we consider several Riemann–Liouville types of fractional derivatives and prove inequalities for derivatives of convex Lyapunov functions. In particular, we consider the classical Riemann–Liouville fractional derivative, the Riemann–Liouville fractional derivative with respect to a function, the tempered Riemann–Liouville fractional derivative, and the tempered Riemann–Liouville fractional derivative with respect to a function. We discuss their relations and their basic properties, as well as the connection between them. We prove inequalities for Lyapunov functions from a special class, and this special class of functions is similar to the class of convex functions of many variables. Note that, in the literature, the most common Lyapunov functions are the quadratic ones and the absolute value ones, which are included in the studied class. As a result, special cases of our inequalities include Lyapunov functions given by absolute values, quadratic ones, and exponential ones with the above given four types of fractional derivatives. These results are useful in studying types of stability of the solutions of differential equations with the above-mentioned types of fractional derivatives. To illustrate the application of our inequalities, we define Mittag–Leffler stability in time on an interval excluding the initial time point. Several stability criteria are obtained. [ABSTRACT FROM AUTHOR]

Published

2023

27. Local Solvability and Stability of an Inverse Spectral Problem for Higher-Order Differential Operators.

Author

Bondarenko, Natalia P.

Subjects

*NONLINEAR equations, *DIFFERENTIAL equations, *BANACH spaces, *LINEAR equations

Abstract

In this paper, we, for the first time, prove the local solvability and stability of an inverse spectral problem for higher-order ( n > 3 ) differential operators with distribution coefficients. The inverse problem consists of the recovery of differential equation coefficients from (n − 1) spectra and the corresponding weight numbers. The proof method is constructive. It is based on the reduction of the nonlinear inverse problem to a linear equation in the Banach space of bounded infinite sequences. We prove that, under a small perturbation of the spectral data, the main equation remains uniquely solvable. Furthermore, we estimate the differences of the coefficients in the corresponding functional spaces. [ABSTRACT FROM AUTHOR]

Published

2023

28. Unified Algorithm of Factorization Method for Derivation of Exact Solutions from Schrödinger Equation with Potentials Constructed from a Set of Functions.

Author

Nigmatullin, Raoul R. and Khamzin, Airat A.

Subjects

*SCHRODINGER equation, *SET functions, *FACTORIZATION, *DIFFERENTIAL equations, *ALGORITHMS, *POTENTIAL energy

Abstract

We extend the scope of the unified factorization method to the solution of conditionally and unconditionally exactly solvable models of quantum mechanics, proposed in a previous paper [R.R. Nigmatullin, A.A. Khamzin, D. Baleanu, Results in Physics 41 (2022) 105945]. The possibilities of applying the unified approach in the factorization method are demonstrated by calculating the energy spectrum of a potential constructed in the form of a second-order polynomial in many of the linearly independent functions. We analyze the solutions in detail when the potential is constructed from two linearly independent functions. We show that in the general case, such kinds of potentials are conditionally exactly solvable. To verify the novel approach, we consider several known potentials. We show that the shape of the energy spectrum is invariant to the number of functions from which the potential is formed and is determined by the type of differential equations that the potential-generating functions obey. [ABSTRACT FROM AUTHOR]

Published

2023

29. Fourth-Order Difference Scheme and a Matrix Transform Approach for Solving Fractional PDEs.

Author

Salman, Zahrah I., Tavassoli Kajani, Majid, Mechee, Mohammed Sahib, and Allame, Masoud

Subjects

*IMAGE encryption, *FRACTIONAL differential equations, *PARTIAL differential equations, *DIFFERENTIAL equations, *MATRIX inequalities

Abstract

Proposing a matrix transform method to solve a fractional partial differential equation is the main aim of this paper. The main model can be transferred to a partial-integro differential equation (PIDE) with a weakly singular kernel. The spatial direction is approximated by a fourth-order difference scheme. Also, the temporal derivative is discretized via a second-order numerical procedure. First, the spatial derivatives are approximated by a fourth-order operator to compute the second-order derivatives. This process produces a system of differential equations related to the time variable. Then, the Crank–Nicolson idea is utilized to achieve a full-discrete scheme. The kernel of the integral term is discretized by using the Lagrange polynomials to overcome its singularity. Subsequently, we prove the convergence and stability of the new difference scheme by utilizing the Rayleigh–Ritz theorem. Finally, some numerical examples in one-dimensional and two-dimensional cases are presented to verify the theoretical results. [ABSTRACT FROM AUTHOR]

Published

2023

30. Numerical Solutions of Stochastic Differential Equations with Jumps and Measurable Drifts.

Author

Siddiqui, Maryam, Eddahbi, Mhamed, and Kebiri, Omar

Subjects

*NUMERICAL solutions to stochastic differential equations, *NUMERICAL analysis, *DIFFERENTIAL equations, *STOCHASTIC differential equations

Abstract

This paper deals with numerical analysis of solutions to stochastic differential equations with jumps (SDEJs) with measurable drifts that may have quadratic growth. The main tool used is the Zvonkin space transformation to eliminate the singular part of the drift. More precisely, the idea is to transform the original SDEJs to standard SDEJs without singularity by using a deterministic real-valued function that satisfies a second-order differential equation. The Euler–Maruyama scheme is used to approximate the solution to the equations. It is shown that the rate of convergence is 1 2 . Numerically, two different methods are used to approximate solutions for this class of SDEJs. The first method is the direct approximation of the original equation using the Euler–Maruyama scheme with specific tests for the evaluation of the singular part at simulated values of the solution. The second method consists of taking the inverse of the Euler–Maruyama approximation for Zvonkin's transformed SDEJ, which is free of singular terms. Comparative analysis of the two numerical methods is carried out. Theoretical results are illustrated and proved by means of an example. [ABSTRACT FROM AUTHOR]

Published

2023

31. Ambrosetti–Prodi Alternative for Coupled and Independent Systems of Second-Order Differential Equations.

Author

Minhós, Feliz and Rodrigues, Gracino

Subjects

*DIFFERENTIAL equations, *TOPOLOGICAL degree, *TOPOLOGICAL property

Abstract

This paper deals with two types of systems of second-order differential equations with parameters: coupled systems with the boundary conditions of the Sturm–Liouville type and classical systems with Dirichlet boundary conditions. We discuss an Ambosetti–Prodi alternative for each system. For the first type of system, we present sufficient conditions for the existence and non-existence of its solutions, and for the second type of system, we present sufficient conditions for the existence and non-existence of a multiplicity of its solutions. Our arguments apply the lower and upper solutions method together with the properties of the Leary–Schauder topological degree theory. To the best of our knowledge, the present study is the first time that the Ambrosetti–Prodi alternative has been obtained for such systems with different parameters. [ABSTRACT FROM AUTHOR]

Published

2023

32. Mathematical Modeling of Single and Phase Autowaves in a Ferrocolloid.

Author

Chekanov, Vladimir, Kandaurova, Natalya, and Kovalenko, Anna

Subjects

*MATHEMATICAL models, *MAGNETIC particles, *DIFFERENTIAL equations, *ELECTRIC fields, *LIQUID membranes

Abstract

This paper describes a mathematical model of an autowave process in a cell with a ferrocolloid. The model is a system of differential coupled equations of the second order and differs from the previously presented model in terms of its original boundary conditions. The mathematical modeling of autowaves presented in this work constitutes an innovative approach, since the characteristics of the wave process are not initially included in the model but the model demonstrates a wave motion. A 2D solution of the model, which shows the correctness of the described mechanism of the autowave process, i.e., the recharging of magnetic particles in dense near-electrode layers formed near the electrodes under the influence of an electric field, is obtained. The propagation of single and phase autowaves is demonstrated in a computer experiment. [ABSTRACT FROM AUTHOR]

Published

2023

33. Oscillation Analysis Algorithm for Nonlinear Second-Order Neutral Differential Equations.

Author

Song, Liang, Chen, Shaodong, and Wang, Guoxin

Subjects

*DIFFERENTIAL equations, *ORDINARY differential equations, *NONLINEAR differential equations, *PARTIAL differential equations, *FREQUENCIES of oscillating systems, *INDEPENDENT variables, *FUNCTIONAL differential equations

Abstract

Differential equations are useful mathematical tools for solving complex problems. Differential equations include ordinary and partial differential equations. Nonlinear equations can express the nonlinear relationship between dependent and independent variables. The nonlinear second-order neutral differential equations studied in this paper are a class of quadratic differentiable equations that include delay terms. According to the t-value interval in the differential equation function, a basis is needed for selecting the initial values of the differential equations. The initial value of the differential equation is calculated with the initial value calculation formula, and the existence of the solution of the nonlinear second-order neutral differential equation is determined using the condensation mapping fixed-point theorem. Thus, the oscillation analysis of nonlinear differential equations is realized. The experimental results indicate that the nonlinear neutral differential equation can analyze the oscillation behavior of the circuit in the Colpitts oscillator by constructing a solution equation for the oscillation frequency and optimizing the circuit design. It provides a more accurate control for practical applications. [ABSTRACT FROM AUTHOR]

Published

2023

34. Properties of Multivariate Hermite Polynomials in Correlation with Frobenius–Euler Polynomials.

Author

Zayed, Mohra, Wani, Shahid Ahmad, and Quintana, Yamilet

Subjects

*HERMITE polynomials, *POLYNOMIALS, *MATHEMATICAL physics, *SPECIAL functions, *DIFFERENTIAL equations

Abstract

A comprehensive framework has been developed to apply the monomiality principle from mathematical physics to various mathematical concepts from special functions. This paper presents research on a novel family of multivariate Hermite polynomials associated with Apostol-type Frobenius–Euler polynomials. The study derives the generating expression, operational rule, differential equation, and other defining characteristics for these polynomials. Additionally, the monomiality principle for these polynomials is verified. Moreover, the research establishes series representations, summation formulae, and operational and symmetric identities, as well as recurrence relations satisfied by these polynomials. [ABSTRACT FROM AUTHOR]

Published

2023

35. Neutral Differential Equations of Higher-Order in Canonical Form: Oscillation Criteria.

Author

Alsharidi, Abdulaziz Khalid, Muhib, Ali, and Elagan, Sayed K.

Subjects

*DIFFERENTIAL equations, *OSCILLATIONS

Abstract

This paper aims to study a class of neutral differential equations of higher-order in canonical form. By using the comparison technique, we obtain sufficient conditions to ensure that the studied differential equations are oscillatory. The criteria that we obtained are to improve and extend some of the results in previous literature. In addition, an example is given that shows the applicability of the results we obtained. [ABSTRACT FROM AUTHOR]

Published

2023

36. Deep Neural Network-Based Simulation of Sel'kov Model in Glycolysis: A Comprehensive Analysis.

Author

Ul Rahman, Jamshaid, Danish, Sana, and Lu, Dianchen

Subjects

*SIMULATION methods & models, *GLYCOLYSIS, *DIFFERENTIAL equations

Abstract

The Sel'kov model for glycolysis is a highly effective tool in capturing the complex feedback mechanisms that occur within a biochemical system. However, accurately predicting the behavior of this system is challenging due to its nonlinearity, stiffness, and parameter sensitivity. In this paper, we present a novel deep neural network-based method to simulate the Sel'kov glycolysis model of ADP and F6P, which overcomes the limitations of conventional numerical methods. Our comprehensive results demonstrate that the proposed approach outperforms traditional methods and offers greater reliability for nonlinear dynamics. By adopting this flexible and robust technique, researchers can gain deeper insights into the complex interactions that drive biochemical systems. [ABSTRACT FROM AUTHOR]

Published

2023

37. A Method of Qualitative Analysis for Determining Monotonic Stability Regions of Particular Solutions of Differential Equations of Dynamic Systems.

Author

Lyubimov, Vladislav V.

Subjects

*DIFFERENTIAL equations, *ORDINARY differential equations, *DYNAMICAL systems, *MATHEMATICAL functions, *NONLINEAR differential equations

Abstract

Developing stability analysis methods for modern dynamical system solutions has been a significant challenge in the field. This study aims to formulate a qualitative analysis approach for the monotone stability region of a specific solution to a single differential equation within a dynamical system. The system in question comprises two first-order nonlinear ordinary differential equations of a particular kind. The method proposed hinges on applying elements of combinatorics to the traditional mathematical investigation of a function with a single independent variable. This approach enables the exact determination of the different qualitative scenarios in which the desired solution changes, under the assumption that the function values monotonically diminish from a specified value down to a finite zero. This paper outlines the creation and decomposition of the monotone stability region associated with the solution under consideration. [ABSTRACT FROM AUTHOR]

Published

2023

38. Some Characteristic Properties of Non-Null Curves in Minkowski 3-Space 1 3.

Author

Almoneef, Areej A. and Abdel-Baky, Rashad A.

Subjects

*DIFFERENTIAL equations

Abstract

This paper gives new characteristic properties of non-null spherical and rectifying curves in Minkowski 3-space E 1 3 . In the light of the causal characteristics, we give some representations of rectifying non-null curves. Additionally, we proved that the tangential function of every non-null curve fulfills a third-order differential equation. Then, a number of well-known characteristic properties of rectifying, Lorentzian, and hyperbolic spherical curves are consequences of this differential equation. [ABSTRACT FROM AUTHOR]

Published

2023

39. Further Studies on the Dynamics of a Lotka–Volterra Competitor–Competitor–Mutualist System with Time-Varying Delays.

Author

Cao, Liang, Halik, Azhar, and Muhammadhaji, Ahmadjan

Subjects

*TIME-varying systems, *DIFFERENTIAL inequalities, *DIFFERENTIAL equations, *HAMILTONIAN systems, *FUNCTIONALS, *COMPUTER simulation

Abstract

In this paper, a Lotka–Volterra (L-V) competitor–competitor–mutualist system with time-varying delays is studied. Some dynamical behaviors of the considered system are investigated. Firstly, we obtain the boundedness, permanence and periodic solution of the system using the comparison principle of differential equations and inequality estimation method. Then, the global attractiveness of the system is analyzed by multiple Lyapunov functionals. Meanwhile, the existence and global attractivity of positive periodic solutions is derived. In the third section, in order to validate the practicability and feasibility of the obtained theoretical results, we conducted numerical simulations using MATLAB function ddesd. Finally, the fourth section is where conclusions are drawn. [ABSTRACT FROM AUTHOR]

Published

2023

40. Research on Medical Problems Based on Mathematical Models.

Author

Liu, Yikai, Wu, Ruozheng, and Yang, Aimin

Subjects

*MATHEMATICAL models, *MACHINE learning, *MEDICAL research, *ARTIFICIAL neural networks, *STATISTICAL models

Abstract

Mathematical modeling can help the medical community to more fully understand and explore the physiological and pathological processes within the human body and can provide more accurate and reliable medical predictions and diagnoses. Neural network models, machine learning models, and statistical models, among others, have become important tools. The paper details the applications of mathematical modeling in the medical field: by building differential equations to simulate the patient's cardiovascular system, physicians can gain a deeper understanding of the pathogenesis and treatment of heart disease. With machine learning algorithms, medical images can be better quantified and analyzed, thus improving the precision and accuracy of diagnosis and treatment. In the drug development process, network models can help researchers more quickly screen for potentially active compounds and optimize them for eventual drug launch and application. By mining and analyzing a large number of medical data, more accurate and comprehensive disease risk assessment and prediction results can be obtained, providing the medical community with a more scientific and accurate basis for decision-making. In conclusion, research on medical problems based on mathematical models has become an important part of modern medical research, and great progress has been made in different fields. [ABSTRACT FROM AUTHOR]

Published

2023

41. Boundary Coupling for Consensus of Nonlinear Leaderless Stochastic Multi-Agent Systems Based on PDE-ODEs.

Author

Yang, Chuanhai, Wang, Jin, Miao, Shengfa, Zhao, Bin, Jian, Muwei, and Yang, Chengdong

Subjects

*MULTIAGENT systems, *STOCHASTIC systems, *DIFFERENTIAL equations

Abstract

This paper studies the leaderless consensus of the stochastic multi-agent systems based on partial differential equations–ordinary differential equations (PDE-ODEs). Compared with the traditional state coupling, the most significant difference between this paper is that the space state coupling is designed. Two boundary couplings are investigated in this article, respectively, collocated boundary measurement and distributed boundary measurement. Using the Lyapunov directed method, sufficient conditions for the stochastic multi-agent system to achieve consensus can be obtained. Finally, two simulation examples show the feasibility of the proposed spatial boundary couplings. [ABSTRACT FROM AUTHOR]

Published

2022

42. Novel Bäcklund Transformations for Integrable Equations.

Author

Gordoa, Pilar Ruiz and Pickering, Andrew

Subjects

*PAINLEVE equations, *PARTIAL differential equations, *DIFFERENTIAL equations, *MATRIX inversion, *EQUATIONS, *BACKLUND transformations, *ORDINARY differential equations

Abstract

In this paper, we construct a new matrix partial differential equation having a structure and properties which mirror those of a matrix fourth Painlevé equation recently derived by the current authors. In particular, we show that this matrix equation admits an auto-Bäcklund transformation analogous to that of this matrix fourth Painlevé equation. Such auto-Bäcklund transformations, in appearance similar to those for Painlevé equations, are quite novel, having been little studied in the case of partial differential equations. Our work here shows the importance of the underlying structure of differential equations, whether ordinary or partial, in the derivation of such results. The starting point for the results in this paper is the construction of a new completely integrable equation, namely, an inverse matrix dispersive water wave equation. [ABSTRACT FROM AUTHOR]

Published

2022

43. Almost Sure Stability for Multi-Dimensional Uncertain Differential Equations.

Author

Gao, Rong

Subjects

*DIFFERENTIAL equations, *DYNAMICAL systems

Abstract

Multi-dimensional uncertain differential equation is a tool to model an uncertain multi-dimensional dynamic system. Furthermore, stability has a significant role in the field of differential equations because it can be describe the effect of the initial value on the solution of the differential equation. Hence, the concept of almost sure stability is presented concerning multi-dimensional uncertain differential equation in this paper. Moreover, a stability theorem, that is a condition, is derived to judge whether a multi-dimensional uncertain differential equation is almost surely stable or not. Additionally, the paper takes a counterexample to show that the given condition is not necessary for a multi-dimensional uncertain differential equation being almost surely stable. [ABSTRACT FROM AUTHOR]

Published

2022

44. Solving Nonlinear Second-Order Differential Equations through the Attached Flow Method.

Author

Ionescu, Carmen and Constantinescu, Radu

Subjects

*NONLINEAR differential equations, *DERIVATIVES (Mathematics), *DIFFERENTIAL equations, *DYNAMICAL systems

Abstract

The paper considers a simple and well-known method for reducing the differentiability order of an ordinary differential equation, defining the first derivative as a function that will become the new variable. Practically, we attach to the initial equation a supplementary one, very similar to the flow equation from the dynamical systems. This is why we name it as the "attached flow equation". Despite its apparent simplicity, the approach asks for a closer investigation because the reduced equation in the flow variable could be difficult to integrate. To overcome this difficulty, the paper considers a class of second-order differential equations, proposing a decomposition of the free term in two parts and formulating rules, based on a specific balancing procedure, on how to choose the flow. These are the main novelties of the approach that will be illustrated by solving important equations from the theory of solitons as those arising in the Chafee–Infante, Fisher, or Benjamin–Bona–Mahony models. [ABSTRACT FROM AUTHOR]

Published

2022

45. New Closed-Form Solution for Quadratic Damped and Forced Nonlinear Oscillator with Position-Dependent Mass: Application in Grafted Skin Modeling.

Author

Cveticanin, Livija, Herisanu, Nicolae, Ninkov, Ivona, and Jovanovic, Mladen

Subjects

*NONLINEAR oscillators, *PERIODIC motion, *MOLECULAR force constants, *APPLIED sciences, *DUFFING oscillators, *NONLINEAR equations, *COSINE function, *DIFFERENTIAL equations

Abstract

The paper deals with modelling and analytical solving of a strong nonlinear oscillator with position-dependent mass. The oscillator contains a nonlinear restoring force, a quadratic damping force and a constant force which excites vibration. The model of the oscillator is a non-homogenous nonlinear second order differential equation with a position-dependent parameter. In the paper, the closed-form exact solution for periodic motion of the oscillator is derived. The solution has the form of the cosine Ateb function with amplitude and frequency which depend on the coefficient of mass variation, damping parameter, coefficient of nonlinear stiffness and excitation value. The proposed solution is tested successfully via its application for oscillators with quadratic nonlinearity. Based on the exact closed-form solution, the approximate procedure for solving an oscillator with slow-time variable stiffness and additional weak nonlinearity is developed. The proposed method is named the 'approximate time variable Ateb function solving method' and is applicable to many nonlinear problems in physical and applied sciences where parameters are time variable. The method represents the extended and adopted version of the time variable amplitude and phase method, which is rearranged for Ateb functions. The newly developed method is utilized for vibration analysis of grafted skin on the human body. It is found that the grafted skin vibration properties, i.e., amplitude, frequency and phase, vary in time and depend on the dimension, density and nonlinear viscoelastic properties of the skin and also on the force which acts on it. The results obtained analytically are compared with numerically and experimentally obtained ones and show good agreement. [ABSTRACT FROM AUTHOR]

Published

2022

46. On Finite/Fixed-Time Stability Theorems of Discontinuous Differential Equations.

Author

Li, Luke and Wang, Dongshu

Subjects

*DIFFERENTIAL equations, *AUTOMATIC control systems, *LYAPUNOV functions, *DISCONTINUOUS functions, *LYAPUNOV stability

Abstract

We investigated the finite/fixed-time stability (FNTS/FXTS) of discontinuous differential equations (DDEs) in this paper. To cope with differential equations that were discontinuous on the right-hand side, we utilized the Filippov solution, which is widely used in engineering. Under the framework of the Filippov solution, we transformed this issue into an FNTS/FXTS problem in the corresponding functional differential inclusion. We proposed some new FNTS/FXTS criteria, which will have important applications in the field of control engineering. It is worth mentioning that the coefficient function in the inequality satisfied by the Lyapunov function (LF) could be indefinite. Moreover, our paper gave a new estimation for the settling time (ST). Finally, two illustrative examples were given to demonstrate the validity and feasibility of the proposed criteria. [ABSTRACT FROM AUTHOR]

Published

2022

47. Higher Monotonicity Properties for Zeros of Certain Sturm-Liouville Functions.

Author

Tsai, Tzong-Mo

Subjects

*DIFFERENTIAL equations, *ORTHOGONAL polynomials, *BESSEL functions, *DIFFERENCE equations, *STURM-Liouville equation, *MONOTONIC functions, *EQUATIONS

Abstract

In this paper, we consider the differential equation y ″ + ω 2 ρ (x) y = 0 , where ω is a positive parameter. The principal concern here is to find conditions on the function ρ − 1 / 2 (x) which ensure that the consecutive differences of sequences constructed from the zeros of a nontrivial solution of the equation are regular in sign for sufficiently large ω. In particular, if c ν k (α) denotes the kth positive zero of the general Bessel (cylinder) function C ν (x ; α) = J ν (x) cos α − Y ν (x) sin α of order ν and if | ν | < 1 / 2 , we prove that (− 1) m Δ m + 2 c ν k (α) > 0 (m = 0 , 1 , 2 , ... ; k = 1 , 2 , ...) , where Δ a k = a k + 1 − a k. This type of inequalities was conjectured by Lorch and Szego in 1963. In addition, we show that the differences of the zeros of various orthogonal polynomials with higher degrees possess sign regularity. [ABSTRACT FROM AUTHOR]

Published

2023

48. Guaranteed Pursuit and Evasion Times in a Differential Game for an Infinite System in Hilbert Space l 2.

Author

Ibragimov, Gafurjan, Qushaqov, Xolmurodjon, Muxammadjonov, Akbarjon, and Pansera, Bruno Antonio

Subjects

*DIFFERENTIAL games, *HILBERT space, *DIFFERENTIAL equations, *ORTHOGONAL matching pursuit

Abstract

The present paper is devoted to studying a pursuit differential game described by an infinite system of binary differential equations in Hilbert space l 2 . The control parameters of the players are subject to geometric constraints. The pursuer tries to bring the state of the system to the origin of the Hilbert space l 2 , and oppositely, the evader tries to avoid it. Our aim is to construct a strategy for the pursuer to complete a differential game and an evasion control. We obtain an equation for the guaranteed pursuit and evasion times. [ABSTRACT FROM AUTHOR]

Published

2023

49. Mathematical and Statistical Aspects of Estimating Small Oscillations Parameters in a Conservative Mechanical System Using Inaccurate Observations.

Author

Tsitsiashvili, Gurami, Gudimenko, Alexey, and Osipova, Marina

Subjects

*FREQUENCIES of oscillating systems, *VIBRATION (Mechanics), *ARITHMETIC series, *DIFFERENTIAL equations, *OSCILLATIONS, *PARAMETER estimation

Abstract

This paper selects a set of reference points in the form of an arithmetic progression for planning an experiment to evaluate the parameters of systems of differential equations. This choice makes it possible to construct estimates of the parameters of a system of first-order differential equations based on the reversibility of the observation matrix, as well as estimates of the parameters of a system of second-order differential equations describing vibrations in a mechanical system by switching to a system of first-order differential equations. In turn, the reversibility of the observation matrix used in parameter estimation is established using the Vandermonde formula. A volumetric computational experiment has been carried out showing how, with an increase in the number of observations in the vicinity of reference points and with a decrease in the step of arithmetic progression, the accuracy of estimates of the parameters of the analyzed system increases. Among the estimated parameters, the most important are the oscillation frequencies of a conservative mechanical system, which establish its proximity to resonance, and therefore, determine the stability and reliability of the system. [ABSTRACT FROM AUTHOR]

Published

2023

50. Second-Order Neutral Differential Equations with Distributed Deviating Arguments: Oscillatory Behavior.

Author

Al-Jaser, Asma, Qaraad, Belgees, Bazighifan, Omar, and Iambor, Loredana Florentina

Subjects

*DIFFERENTIAL equations, *FUNCTIONAL differential equations, *DELAY differential equations, *ARGUMENT

Abstract

In this paper, new criteria for a class oscillation of second-order delay differential equations with distributed deviating arguments were established. Our method mainly depends on making sharper estimates for the non-oscillatory solutions of the studied equation. By using the Ricati technique and comparison theorems that compare the studied equations with first-order delay differential equations, we obtained new and less restrictive conditions that ensure the oscillation of all solutions of the studied equation. Further, we give an illustrative example. [ABSTRACT FROM AUTHOR]

Published

2023