1,290 results
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2. A mathematical review on Caputo fractional derivative models for Covid-19.
- Author
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Suganya, S. and Parthiban, V.
- Subjects
CAPUTO fractional derivatives ,SARS-CoV-2 ,COVID-19 ,DIFFERENTIAL equations ,SCIENTIFIC community - Abstract
Several papers on the dynamics and early identification of COVID-19 by mathematical modelling have been published in the last two years. This review will look at the quantitative analysis and dynamical behaviors of novel coronavirus, with a focus on the Caputo fractional derivative. Currently many mathematical models are used to investigate the Novel coronavirus under Caputo fractional order system of differential equations. In this paper, we have focused on reviewing the Caputo fractional model of Covid 19, local stability and optimal control. The purpose of this work is to provide the research community a complete overview of the Caputo fractional derivative approach used in these investigations. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
3. On Generalized Vieta-Pell functions and their associated operational matrices.
- Author
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Khaleel, Inas Abd Ulkader and Shihab, Suha
- Subjects
VECTOR valued functions ,DIFFERENTIAL equations - Abstract
This paper studies the properties of Generalized Vieta Pell Functions (GVPFs). Then new definition for such functions is considered with some interesting properties. The definite expression for constructing the operation matrix of the derivative of GVPFs is given, which is the direct method to find the higher-order derivative according to the requirement of the total differential equation. The explicit expression that relates the power function with the GVPFs is formulated in this work. Another contribution of the present paper is the generation of words for the product of two Generalized Vieta Pell Function vectors. All the results mentioned above are applicable in a wide range of computational processes and useful for finding more exact results. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
4. A numerical study for solving higher-order fuzzy differential equations using modified RKM methods.
- Author
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Mechee, Mohammed S., Salman, Zahrah I., and Al Shuwaili, Basim K.
- Subjects
DIFFERENTIAL equations ,ORDINARY differential equations - Abstract
In this paper, direct explicit numerical RKM methods for solving classes of higher-order ordinary differential equations (ODEs) have been developed and modified to be appropriate with fuzzy differential equations (FDEs) with more computational efficiency. The aim of this paper is to derive the numerical methods of RKM type to solve some classes of higher-order FDEs. The numerical results of implementation showed that the efficiency and advantage of the proposed integrators comparing with classical RK methods in sense of evaluation computational time. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
5. Controllability of the nonlinear smoking model.
- Author
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Tjahjana, R. H., Herdiana, R., and Permatasari, A. H.
- Subjects
- *
CONTROLLABILITY in systems engineering , *NONLINEAR differential equations , *NONLINEAR equations , *SMOKING , *DIFFERENTIAL equations - Abstract
This paper exposes the controllability problem of the nonlinear smoking model. Mathematically, the form of smoking model is the first order of nonlinear differential equation system. The model consists of six variables and two controls. The most important thing before controlling a smoker is to determine its controllability. If the smoking model is in nonlinear standard control model, then it has drift. Applying the Lie Bracket method, the controllability matrix can be found. After determining the rank of the controllability matrix, the controllability of the model can be determined. The result can be stated that the smoking model is locally accessible. This means the control design can be made to control the smoker. In addition, if the optimal control approach is used in controlling the smoking model, through its cost functional model, we can make minimization of beginners and smokers. Another result of this paper is the presentation of optimal control analysis using the Pontryagin Principle approach. The analysis results can be stated as follows, first, each solution of the equation in the dynamic system model is a positive function, second, the model of the system of differential equations with the given initial conditions, has a solution, and that solution is a single solution. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
6. Optimization of difference formulas for solving differential equations in the Hilbert space.
- Author
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Shadimetov, Kholmat and Esanov, Shermamat
- Subjects
- *
DIFFERENTIAL equations , *NUMERICAL solutions to initial value problems , *NUMERICAL functions , *SOBOLEV spaces , *FUNCTION spaces , *ORDINARY differential equations - Abstract
In the numerical solution of Initial Value Problems (IVP) for ordinary differential equations, computational methods serve to approximate the determination of functions representing the solution of these problems. The problem of finding the most convenient numerical expressions for a function and its connection with methods for improving such approximations plays an important role in practical calculations. It is of great interest to consider the so-called discrete methods, i.e. methods that determine the solution for discrete values of the independent variable. Discrete methods are currently the most widely used. One of the discrete methods is difference formulas for the numerical solution of the IVP. In this paper, in the Sobolev space where all derivatives up to the mth order participate in the norms of functions, we consider the problem of constructing optimal difference formulas. In the optimization of difference formulas, i.e. when constructing optimal difference formulas in function spaces, an important role is played by the extremal function of a given difference formula. In this paper, the extremal function of the difference formula is explicitly found in the Sobolev space. Next, the square of the norm of the error functional of difference formulas is calculated. Minimizing this norm with respect to the coefficients of the difference formulas, a system of equations is obtained. In addition, the existence and uniqueness of a solution to the resulting system are proved. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
7. A priori selected spline–wavelet basis for option pricing under Black–Scholes and Merton model.
- Author
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Černá, Dana
- Subjects
BLACK-Scholes model ,PRICES ,SPARSE matrices ,A priori ,DIFFERENTIAL equations ,SPLINES - Abstract
The paper deals with option pricing under the classical Black-Scholes model and a more sophisticated Merton jump– diffusion model, which allows jumps in the underlying asset price. The Merton model is represented by non–stationary integro– differential equations. Due to the integral term, standard methods are not very efficient because they lead to full discretization matrices. The Black–Scholes model can be considered a particular case of the Merton model, which does not contain the integral term. In the paper, a method is proposed, which is a combination of the Crank–Nicolson scheme and the wavelet–Galerkin method using adaptive quadratic spline wavelet basis selected a priori. This enables to significantly decrease the number of basis functions and size of matrices and vectors involved in computation compared to standard non–adaptive wavelet–Galerkin methods. Furthermore, the proposed wavelet–based method leads to sparse discretization matrices with uniformly bounded condition numbers. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
8. Compact Integrated Radial Basis Function (CIRBF) for natural convection flow in a square cavity.
- Author
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Thai, Thinh Q. and Thai-Quang, Nha
- Subjects
RADIAL basis functions ,NATURAL heat convection ,NEWTONIAN fluids ,DIFFERENTIAL equations ,NAVIER-Stokes equations ,CRANK-nicolson method - Abstract
This paper presents a numerical scheme to approximate a set of differential equations establishing the behavior of Newtonian fluid motion. The three primary differential equations are the continuity equation, the momentum equation (aka the Navier-Stokes equation) and the energy equation. The paper uses a numerical approach namely Compact Integrated Radial Basis Function (CIRBF) to approximate space variables whereas Crank-Nicolson and Adams-Bashforth methods are adopted to discretize temporal variables. More specifically, the spatial approximation at a point is obtained by collecting the desired information of two adjacent nodes along with their corresponding derivatives. Our scheme is verified by comparison with the benchmark solution of natural convection flow in a square cavity. The solution is in good agreement with the previously published results, thereby showing the robustness and reliability of CIRBF approach. [ABSTRACT FROM AUTHOR]
- Published
- 2021
- Full Text
- View/download PDF
9. Third Symposium on “Recent Trends in the Numerical Solution of Differential Equations”: Preface.
- Author
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Brugnano, Luigi and Weinmüller, Ewa
- Subjects
CONFERENCES & conventions ,NUMERICAL analysis ,DIFFERENTIAL equations ,EIGENVALUES ,RUNGE-Kutta formulas - Abstract
Information about the third symposium on Recent Trends in the Numerical Solution of Differential Equations is presented. Topics include numerical methods for eigenvalue problems and analysis of boundedness of general linear methods. In addition, the event highlighted various studies including the use of the well-known technique of defect correction and a new practical strategy to detect stiffness based on explicit Runge-Kutta schemes.
- Published
- 2010
- Full Text
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10. Mathematical modeling of rigid diaphragm geometry in MEMS pressure sensor.
- Author
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Nag, Meetu, Mehta, Ruchika, and Pratap, Bhanu
- Subjects
PRESSURE sensors ,MATHEMATICAL models ,DIFFERENTIAL equations ,GEOMETRY - Abstract
Silicon has remarkable mechanical properties, and it is a very promising material for MEMS pressure sensors. The Silicon diaphragm plays an important role in enhancing the sensitivity and linearity of the pressure sensor. In this paper, a silicon diaphragm is modeled by solving the analytical equations for both rigidly clamped and freely supported diaphragms by exploring the solution of differential equation and dependency on the different parameters of the diaphragm. For obtaining maximum deflection of the diaphragm, boundary conditions are applied for different loads. COMSOL Multiphysics is used to simulate the optimum geometry of the diaphragm for enhancing the sensitivity of the pressure sensor. Results reveal that diaphragm thickness of 20 µm shows the high displacement sensitivity of the pressure sensor. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
11. Application of Extended Kalman Filter in Antibiotic Resistance Research.
- Author
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Anrui Fu, Bo Wang, and Minghong Yao
- Subjects
DRUG resistance in bacteria ,KALMAN filtering ,QUANTITATIVE research ,ANTIBIOTICS - Abstract
This article uses quantitative methods to put forward some solutions on antibiotic resistance crisis. In order to describe the propagation process of a bacterium, the paper selects the sales volume of antibiotics to reflect the changes in bacterial antibiotic resistance. On this basis, the article simulates the trend of bacterial resistance in a perfect competitive market. The result shows that the disease can repeat in the next several years and never fade away. From the result, the paper comes out a conclusion that it is essential to stop offering antibiotics duly in order to eradicate the bacteria. [ABSTRACT FROM AUTHOR]
- Published
- 2020
- Full Text
- View/download PDF
12. Spoon Design Using Partial Differential Equations.
- Author
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Ismail, Nur Baini and Ahmat, Norhayati
- Subjects
SPOONS ,PARTIAL differential equations ,DIFFERENTIAL equations ,FINITE volume method ,CURVES - Abstract
Spoon is a form of free-form surfaces. In this paper, a method for designing a spoon using partial differential equations (PDE) is discussed. Boundary curves are defined in term of Fourier series. By selecting the appropriate boundary curves, a design of spoon is generated using fourth order elliptic PDE. Then by solving the elliptic PDE, a smooth design of spoon can be generated. In addition, this paper also examined the impact of the choice of number of boundary curves in generating different spoon shapes. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF
13. Study the solutions of differential equations by Laplace transform: A review.
- Author
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Singla, Garima and Nagar, Harish
- Subjects
- *
DIFFERENTIAL equations , *ALGEBRAIC equations , *LAPLACE transformation , *SIMULTANEOUS equations , *INTEGRAL equations , *RESEARCH personnel - Abstract
Laplace transform is a principal technique which is discover to find the solution of various problem in a real life. Laplace transform is one of the most efficient tools which is used by the researchers to identify the solutions of various real problems patterned into differential equations or simultaneous differential equations and integral equations which is easily solvable by Laplace method. In this paper, we are proceeding to study the details on Laplace transform, its properties and "study on solving differential equation by Laplace transform". Laplace transform bring to the ordinary differential equations into an algebraic sum. This paper represents how ordinary differential equations is solved through Laplace transform. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
14. Study review: The existence of strong and weak solutions to Banach spaces in mathematical differential equations.
- Author
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Alfaris, Lulut, Siagian, Ruben Cornelius, Kaimuddin, Januar Saleh, and Sumarto, Eko Pramesti
- Subjects
- *
BANACH spaces , *DIFFERENTIAL equations , *NONLINEAR differential equations - Abstract
An investigation of the use of Banach spaces for finding solutions to non-linear differential equations is conducted in this paper, focusing on weak and strong solutions. We present 12 theorems and several mathematical assumptions to support the findings, which conclude that, under certain conditions, at least one weak solution for the non-linear differential Equation is obtained in Banach spaces. Furthermore, it is suggested in the paper that the same result can be obtained by expanding upon the compactness assumption. The properties of weak and strong solutions of non-linear differential equations using Banach spaces are improved upon by this research, and its potential real-world applications are highlighted. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
15. Weighted optimal order of convergence cubature formulas in Sobolev space L¯P(m) (Kn).
- Author
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Jalolov, Ozodjon
- Subjects
CUBATURE formulas ,SOBOLEV spaces ,THEORY of distributions (Functional analysis) ,DIFFERENTIAL equations - Abstract
The main area of application of various spaces of generalized functions lies in the theory of differential equations and in the theory of quadrature and cubature formulas. Therefore, it becomes necessary to study spaces of generalized functions, one way or another related to various domains in R
n . The theory of differential equations in the space of generalized functions differs from the theory of these equations in the space of ordinary functions. Deriving these equations and finding their solutions are important in applications. In the study of various questions arising in the theory of approximate integration and partial differential equations and related departments of analysis, the so-called Functional approach turned out to very fruitful. In this paper we investigate weighted cubature formula in the functional spaces L ¯ P (m) of S.L. Sobolev for the functions defined in the n - dimensional unit cube Kn and obtain an upper estimate for the norm of error functionals of weighted cubature formulas. Based on the Bakhvalov theorem it is proved that considered cubature formulas of the optimal on order of convergence in these spaces. [ABSTRACT FROM AUTHOR]- Published
- 2023
- Full Text
- View/download PDF
16. Homotopy perturbation method for solution of q-fractional differential equations.
- Author
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Madhavi, B., Kumar, G. Suresh, and Rao, T. Srinivasa
- Subjects
DIFFERENTIAL equations ,NONLINEAR differential equations ,FRACTIONAL differential equations ,TOPOLOGY - Abstract
In this paper, we present a numerical method for solving nonlinear q-fractional differential equations(q-FDEs). Here, we consider q-fractional derivative in the Caputo sense. The homotopy perturbation method(HPM) is applied to construct the numerical solutions. Using homotopy technique in topology, a homotopy is built with an installing parameter s ∈ (0, 1), and is treated as a small parameter. Numerical provide the applicability and validity of this method. The proposed method is consistently valid for small parameters as well as for large parameters. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
17. See transform and convolution theorem in fractional differential equations.
- Author
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Patil, Dinkar P. and Khakale, Savita S.
- Subjects
FRACTIONAL differential equations ,DIFFERENTIAL equations ,MATHEMATICAL convolutions - Abstract
Now a day's integral transform play very important role in differential equations. In this paper we apply SEE Transform Method and prove convolution theorem to solve linear homogeneous and non-homogeneous Fractional Differential Equations with constant coefficients. The Caputo sense used to describe fractional derivatives. The validity and applicability of the presented technique is verified by including some examples. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
18. Low-Thrust multi-revolutionary trajectories to geostationary orbit using angular independent variable.
- Author
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Oo, Paing Soe Thu
- Subjects
ORBITS (Astronomy) ,BOUNDARY value problems ,TRAJECTORY optimization ,DIFFERENTIAL equations ,CONTINUATION methods ,INDEPENDENT variables ,MAXIMUM principles (Mathematics) - Abstract
In this paper, the problem of optimization of multi-revolutionary transfers of a spacecraft with a fixed angular range of auxiliary longitude and the free transfer time from a given initial orbit to geostationary orbit in a central Newtonian gravitational field is considered. The purpose of the optimization is to calculate the program of control of the vector of the thrust, which provided optimal multi-revolutionary trajectories to the final orbit with the minimum cost of the propellant. The magnitude of thrust is assumed to be constant. The optimized control is the vector control program of thrust, including its direction and periods of operation. For mathematical modeling of the spacecraft motion, differential equations in equinoctial elements are used, and as an independent variable, an auxiliary longitude is used, introduced in such a way that the differential equation for it coincides with the differential equation for true longitude in unperturbed motion. An approach based on the Pontryagin maximum principle is proposed to solve the trajectory optimization problem. Using the maximum principle, the problem of optimizing the multi-revolutionary transfer of spacecraft with limited thrust is reduced to a two-point boundary value problem and the boundary value problem is solved by the method of continuation on parameter. To get the goal, the problems of optimizing the multi-revolutionary transfer with limited power and limited thrust are considered. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
19. Solving the Biharmonic Equation in Irregular Domains by the Least Squares Collocation Method.
- Author
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Belyaev, V. A. and Shapeev, V. P.
- Subjects
COLLOCATION methods ,BIHARMONIC equations ,DIFFERENTIAL equations ,LINEAR algebraic groups ,ALGEBRAIC equations ,ANALYTICAL solutions ,FINITE difference method - Abstract
This paper addresses a new version of the least squares collocation (LSC) method of high order accuracy proposed and implemented for the numerical solution of the nonhomogeneous biharmonic equation. The differential problem is projected onto a polynomial space of the fourth and eighth degrees by the LSC method. The algorithm implemented is applied in irregular domains. The boundaries of these domains are given by analytical curves, in particular, by splines. The irregular domain is embedded in a rectangle covered by a regular grid with rectangular cells. In this paper we use the irregular cells (i-cells) which are cut o by the domain boundary from the rectangular cells of the initial regular grid. The idea of attaching elongated i-cells to the neighboring ones is used. A separate piece of the analytical solution is constructed in the combined cells. The collocation and matching points located outside the domain are used to approximate the differential equations in the boundary cells. These two approaches allow us to reduce essentially the conditionality of the corresponding system of linear algebraic equations. It is shown that the approximate solutions obtained by the LSC method converge with an increased order and coincide with the analytical solutions of the test problems with high accuracy in the case of the known solution. The numerical results are compared with those found by other authors who used a high order finite difference method (FDM). The nonhomogeneous biharmonic equation is used to model the stress-strain state (SSS) of isotropic thin irregular plates as an application. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF
20. Application of evolutionary algorithms for the identification of the first-order differential equations systems.
- Author
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Karaseva, Tatiana and Semenkin, Eugene
- Subjects
DIFFERENTIAL equations ,DIFFERENTIAL forms ,EVOLUTIONARY algorithms ,GENETIC programming ,NUMBER systems ,DIFFERENTIAL evolution - Abstract
The paper considers a new approach to the identification of dynamic objects in the form of the first-order differential equations system. The peculiarities of the proposed approach are the absence of restrictions on the structure of the differential equations included in the system and the symbolic representation of the obtained solution. The proposed approach includes a self-configuring genetic programming algorithm for selecting the structure of differential equations. The number of algorithms corresponds to the number of equations in the system. The method of differential evolution is used to optimize numeric constants. The authors apply a self-configuring procedure for the indicated evolutionary algorithms. The proposed approach has been tested on a variety of problems. The accuracy of the obtained solution has been investigated depending on the presence of noise in the sample data. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
21. Solving the created ordinary differential equations from Lomax distribution.
- Author
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Mohammed, Hussein Jabbar and Mohammed, Maha A.
- Subjects
CUMULATIVE distribution function ,DIFFERENTIAL equations ,HAZARD function (Statistics) ,ORDINARY differential equations - Abstract
This study presents a procedure to transfer a Lomax distribution into a class of ordinary differential equations. In this proposed designed some functions, which obtained from Lomax distribution, such as Survival function, cumulative distribution function, and hazard function are used. The aim of this research is to convert the Lomax distribution to the set of differential equations, then find the exact solutions for the created equations. Despite the availability of the exact solution and this is sufficient, the approximate solution, both analytical and numerical, remains a question that we discuss in this paper to study the types of solutions to these mentioned equations. an approximate solution is determined by analytically by Variation Iteration method (VIM) and numerically by Runge-Kutta of 4
th Order (RK4) method. Finally, a numerical illustration is also realized by utilizing MATLB 2016a, where the new results are shown. [ABSTRACT FROM AUTHOR]- Published
- 2022
- Full Text
- View/download PDF
22. Performance analysis of M/Ek/1 queue with working vacation, N-policy and customer impatience in transient mode.
- Author
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Devi, V. N. Rama, Sridhar, G., and Chandan, K.
- Subjects
QUEUING theory ,PATIENCE ,CONSUMERS ,VACATIONS ,DIFFERENTIAL equations ,SENSITIVITY analysis - Abstract
This paper deals with the Markovian queueing system with working vacation in which the server may met with failures. There will be no delay in initiating repair. During this period any new customer is allowed to join the system. Each customer will be provided Erlangian phase service. Whenever the server finds nobody, the server goes for a working vacation during which the server provides service at a slower rate than the normal. Further, we considered two types of customer's impatience. We solved the system of differential equations to find Transient state probabilities and computed various performance indices of the queue. We then executed the sensitivity analysis and observed the impact on different parameters. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
23. Bernoulli wavelet technique in compution of solution of singular differential equation.
- Author
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Yadav, Kailash, Piriadarshani, D., James, Beena, and Shekhar, Himanshu
- Subjects
- *
NUMERICAL solutions to differential equations , *DIFFERENTIAL equations - Abstract
In this paper the Bernoulli wavelets technique is applied to determine the numerical solution of singular ordinary differential equations. From a mathematical view, the suggested technique is straightforward as it provides precise data. According to this technique, the Bernoulli operational matrix is obtained from the Bernoulli function. The Bernoulli operational matrix constitutes a powerful means utilized in analyzing systems to identify the suitable numerical solutions to any differential equations. Numerical examples were give to support the effectiveness of the technique. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
24. On Choosing a Value of Shape Parameter in Radial Basis Function Collocation Methods.
- Author
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Krowiak, Artur and Podgórski, Jordan
- Subjects
RADIAL basis functions ,COLLOCATION methods ,NUMBER systems ,DIFFERENTIAL equations - Abstract
In the paper two approaches to determine a value of shape parameter for radial basis function collocation methods are presented. This value enables to achieve very accurate results in Kansa method and radial basis function-based pseudospectral one. Both approaches are based on the estimation of the condition number of the system matrix. One of them tries to find the value of shape parameter employing a heuristic that relates the condition number to computational precision, the other one searches for the largest value of this parameter that still ensures stable computation using geometrical dependence. The presented algorithms guarantee performing computation in the stable region and are more efficient than commonly used ones. Moreover they allow to automate the computational process for these methods. In the paper the algorithms are validated by a few differential equations using multiquadrics functions. The results show that the approaches lead to high accuracy especially when non-uniform grid is applied. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
25. Second Symposium on “Recent Trends in the Numerical Solution of Differential Equations”: Preface.
- Author
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Brugnano, Luigi
- Subjects
CONFERENCES & conventions ,NUMERICAL analysis ,DIFFERENTIAL equations ,MATHEMATICAL models ,DIFFERENTIABLE dynamical systems - Abstract
Information about the Recent Trends in the Numerical Solution of Differential Equations second symposium is presented. Topics discussed include the numerical method of Hamiltonian problems, new definition of stiffness with applications and numerical methods for variational inequalities. The meeting featured several mathematics experts, including L. Aceto, L. Brugnano and R. Lamour.
- Published
- 2009
- Full Text
- View/download PDF
26. Guaranteed feedback strategies versus best reply dynamics.
- Author
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Krasovskii, Nikolay A., Tarasyev, Alexander M., and Tarasyev, Alexander A.
- Subjects
NASH equilibrium ,BOND market ,BEHAVIORAL assessment ,DIFFERENTIAL equations ,TIME perspective ,PSYCHOLOGICAL feedback - Abstract
The paper is devoted to the analysis of behavior of equilibrium trajectories in dynamic bimatrix games. We consider a system of differential equations which describe evolutionary dynamics of behavior of two players on the infinite time horizon. In the first case, we examine an approach based on the idea of guaranteed strategies in the sense of N.N. Krasovskii, for which the construction of the dynamic Nash equilibrium is implemented. In the second case, we consider a dynamic system based on the strategies of players' best replies. In this case, the equilibrium trajectory converges to the point of the static Nash equilibrium. For both cases, equilibrium trajectories are constructed and the comparison is carried out for the values of players' payoff functionals at the points of equilibrium. It is shown that characteristics of trajectories of the dynamic Nash equilibrium are better than properties of trajectories of the best reply dynamics. For demonstration of the behavior of equilibrium trajectories in the dynamic bimatrix games the model is presented in which we consider payoff matrices of two players on the financial markets of stocks and bonds. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
27. Analysis of the dissipativity of nonlinear differential systems using Lyapunov functions method.
- Author
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Ekimov, A. V., Balykina, Yu. E., and Svirkin, M. V.
- Subjects
LYAPUNOV functions ,NONLINEAR systems ,NONLINEAR analysis ,DIFFERENTIAL equations - Abstract
The paper considers non-stationary systems of differential equations. The aim of this work is to obtain sufficient conditions for uniform dissipativity using the method of Lyapunov functions. The right side of the original system is presented as a sum of two terms: the first nonlinear approximation (unperturbed part) and its perturbation. For an exponentially stable unperturbed system, conditions are obtained for the order of perturbations under which the perturbed system has the property of uniform dissipativity. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
28. Extraction of parameters during signal radio profile processing in radiosensor diagnostics.
- Author
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Boikov, K. A.
- Subjects
SCIENTIFIC literature ,VECTOR analysis ,DIFFERENTIAL equations ,ELECTRONIC equipment ,MODERN literature ,FOURIER transforms ,FREE flaps - Abstract
Modern methods of technical diagnostics, such as thermophysical diagnostics, vibrometry, boundary scanning, vector circuit analysis, have serious drawbacks. They are expressed in high inertia, distraction of processor time, or require galvanic contact with the object of study, which is often unacceptable. These shortcomings can be eliminated by passive radio-sensor technical diagnostics (PRTD), which uses its own radiation (signal radio profiles) to assess the technical condition of a radio-electronic device. In modern scientific literature, the issues of extracting the parameters of technical diagnostics of radio-electronic devices that it provides are practically not covered. The aim of the work is to study the extraction of the parameters of the signal radio profile and compare them with the parameters of radio electronic devices, the assessment of which can be provided by PRTD. Numerical modeling methods, methods of correlation analysis of the results were used to obtain signal radio profiles. In order to find the parameters of the signal radio profile, a mathematical method for solving differential equations was used. The paper presents an equation for the signal radio profile emitted by the electronic unit of the device, as well as an expression for its free components. The possibility of using a modified windowed Fourier transform to find the number of elementary components of a complex radio profile is shown, with an assessment of the correctness of the transformation at the initial stages of the analysis. A method for assessing the correctness of restoring the original signal radio profile is highlighted. A table of correspondence between the parameters of the radio-electronic device and the parameters of the signal radio profile is presented. The extraction of parameters opens up new possibilities in the field of studying the technical condition of radio electronic devices. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
29. Engineering method for solving boundary value problems.
- Author
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Dalabaev, U. and Umarova, Sh
- Subjects
BOUNDARY value problems ,METHODS engineering ,ORDINARY differential equations ,ALGEBRAIC equations ,DIFFERENTIAL equations - Abstract
The paper proposes a simple approximate method for solving differential equations for boundary value problems. A method is proposed for averaging differential equations over a moving volume, which allows obtaining approximate analytical solutions of differential equations. The control volume is the only one in the considered area of the boundary value problem. In this case, the control volume is considered to be moved in the area under consideration. Based on the averaging of boundary value problems over the volume being moved, an algebraic equation is obtained. When averaging over one of the variables (in the case of a two-dimensional problem), ordinary differential equations are obtained. Examples are given. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
30. Analysis of a fluid queue modulated by a queue with vacations in random environment.
- Author
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Sophia, Susairaj and Deepika, Babu Muthu
- Subjects
GENERATING functions ,VACATIONS ,DIFFERENTIAL equations ,FLUIDS - Abstract
A fluid queueing system fed by a single server vacation queue in a random environment is considered in this paper with the aim to investigate the buffer content distribution. The system of differential equations is solved using probability generating function technique and the buffer content distribution for the operative state and vacation state are determined. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
31. Application of Caputo differential equation in electrical circuits for different kinds of sources.
- Author
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Maheswari, M., Piriadarshani, D., James, Beena, and Nishi, N. Daniya
- Subjects
DIFFERENTIAL equations ,STOCHASTIC models ,ELECTRIC circuits - Abstract
In this paper, different types of electrical circuits were modelled and their stochastic sources were computed for different kinds of sources using Caputo Fabrizio derivative. Numerical examples were given to support our results. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
32. Properties of κ-hypergeometric function and fractional derivatives.
- Author
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Dang, Shruti, Mittal, Ekta, Joshi, Sunil, and Menon, Mudita
- Subjects
DIFFERENTIAL equations ,HYPERGEOMETRIC functions - Abstract
The object of this paper is to develop quardratic transformation of κ-hypergeometric differential equation and also develop new forms of quardratic transformation. Further we establish some properties of κ-hypergeometric function with κ-Caputo fractional derivative. [ABSTRACT FROM AUTHOR]
- Published
- 2023
- Full Text
- View/download PDF
33. A variant of an oscillation criterion for delayed second order half-linear differential equations.
- Author
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Pátíková, Zuzana
- Subjects
LINEAR differential equations ,DIFFERENTIAL equations ,OSCILLATIONS ,DELAY differential equations - Abstract
The aim of this paper is to extend an oscillation criterion for the half-linear second order differential equations with delay to a more general form and to discuss relationship between these two variants and the link to the perturbation principle. The proving technique employs the Riccati transformation. [ABSTRACT FROM AUTHOR]
- Published
- 2022
- Full Text
- View/download PDF
34. Symbolic-Numeric Implementation of The Four Potential Method for Calculating Normal Modes of Square Electromagnetic Waveguide with Rectangular Insert.
- Author
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Tiutiunnik, A. A. and Malykh, M. D.
- Subjects
GALERKIN methods ,ELECTROMAGNETIC waves ,WAVEGUIDES ,ELECTROMAGNETIC fields ,DIFFERENTIAL equations ,COMPUTER systems ,MAPLE - Abstract
In this paper, the Maple computer algebra system is used to construct a symbolic-numeric implementation of the method for calculating normal modes of square closed waveguides in a vector formulation. The method earlier proposed by Malykh et al. [M.D. Malykh, L.A. Sevastianov, A.A. Tiutiunnik, N.E. Nikolaev. On the representation of electromagnetic fields in closed waveguides using four scalar potentials // Journal of Electromagnetic Waves and Applications, 32 (7), 886-898 (2018)] will be referred to as the method of four potentials. The Maple system is used at all stages of treating the system of differential equations for four potentials: the generation of the Galerkin basis, the substitution of approximate solution into the system under study, the formulation of a computational problem, and its approximate solution. The paper presents the results of the verification method. [ABSTRACT FROM AUTHOR]
- Published
- 2019
- Full Text
- View/download PDF
35. Spectral Properties of One Elliptic Operator in a Punctured Domain.
- Author
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Nalzhupbayeva, Gulzat
- Subjects
DIFFERENTIAL equations ,ELLIPTIC equations ,BOUNDARY value problems ,DERIVATIVES (Mathematics) ,HILBERT space - Abstract
In the work we derive regularized trace formulas which were established in papers of Kanguzhin and Tokmagambetov for the Laplace and m-Laplace operators in a punctured domain with the fixed iterating order m ∊ N. By using techniques of Sadovnichii and Lyubishkin, the authors in that papers described regularized trace formulae in the spatial dimension d = 2. In this note one claims that the formulas are also true for more general operators in the higher spatial dimensions, namely, 2 ≤ d ≤ 2m. Also, we give the further discussions on a development of the analysis associated with the operators in punctured domains. This can be done by using so called 'nonharmonic' analysis. [ABSTRACT FROM AUTHOR]
- Published
- 2018
- Full Text
- View/download PDF
36. A study of differential robot line-tracking based on visual recognition with segmented PID.
- Author
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Zhou, Wenbo
- Subjects
- *
DIFFERENTIAL equations , *EQUATIONS of motion , *MOBILE robots , *ARTIFICIAL satellite tracking - Abstract
In the field of robot tracing, traditional sensors have the disadvantages of low accuracy, poor robustness, and expensive, which cannot meet the requirements of modern robot tracing. Based on the above analysis, this paper solves the equations of motion of differential wheeled robots, processes the visual sensor data through erosion and expansion operations to further acquire trajectories, and designs a segmented PID control system. Through repeated simulation experiments with ROS2 and gazebo simulation lines, we have come to the following conclusions: visual tracking has a better foresight, and can well solve the shortcomings of traditional sensors with low precision and poor sensitivity. The control error of the segmented PID control strategy is 50% of the traditional PID control strategy, and it can improve the response speed and robustness of the traditional PID. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
37. Study of the non-relativistic energy spectra of hyperbolic function position dependent mass with Modified Hyperbolic Pöschl Teller potential under AB force.
- Author
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Suparmi, A., Maria, S., Cari, C., and Faniandari, S.
- Subjects
- *
HYPERBOLIC functions , *SCHRODINGER equation , *DIFFERENTIAL equations , *DIATOMIC molecules , *QUANTUM numbers , *LAPLACE transformation - Abstract
In this paper, we have solved the Schrodinger equation of hyperbolic function position dependent mass for a Modified Hyperbolic Pöschl-Teller potential under external hyperbolic magnetic and AB forces using Laplace transform and Hypergeometry method. The second order differential equation of Schrodinger equation reduced to first order differential equation by using Laplace transform. Then radial part of the system was solved by using hypergeometric function. The eigen function and eigen energy values are obtained, where the energy spectra are influenced by the quantum number, potential parameters, and external magnetic with the various of B and AB force are affected depending on the diatomic molecules for certain condition. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
38. More on the asymptotic behaviour of solutions to a second order Emden-Fowler difference equation.
- Author
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Diblík, Josef and Korobko, Evgeniya
- Subjects
- *
DIFFERENTIAL equations , *INDEPENDENT variables , *DEPENDENT variables , *INTEGERS , *DIFFERENCE equations - Abstract
The paper investigates a second order difference equation of the Emden-Fowler type Δ2u(k) ± kαum(k) = 0, where k is the independent variable taking values k = k0, k0 + 1, ... with k0 a fixed integer, u: {k0, k0 + 1, ...} → ℝ is the dependent variable and Δ2u(k) is its second-order forward difference. New conditions with respect to parameters m ∈ ℝ, m ≠ 1 and α ∈ ℝ are found such that the equation admits a solution asymptotically represented by a power function asymptotically equivalent with the exact solution of second-order differential Emden-Fowler equation y″(x) ± xαym(x) = 0. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
39. Differential equations as a projection of implicit functions using spatio-temporal Taylor expansion and critical points properties.
- Author
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Skala, Vaclav
- Subjects
- *
DIFFERENTIAL equations , *IMPLICIT functions , *ORDINARY differential equations , *PARTIAL differential equations , *RADIAL basis functions , *VECTOR fields , *TAYLOR'S series - Abstract
This contribution introduces a novel method for formulating differential equations. This method relies on expanding an implicit function that varies with time (denoted as "t") in the space-time domain using Taylor series. This formulation encompasses both ordinary differential equations (ODEs) and partial differential equations (PDEs). In the context of visualizing vector fields, such as fluid flow and electromagnetic fields, the critical points of ODEs play a crucial role in understanding physical phenomena behavior. This paper outlines a general approach for formulating ODEs and PDEs by treating them as time-varying scalar functions using the Taylor expansion. Furthermore, a new condition for identifying critical points is derived and specified specifically for cases where the function is invariant with respect to time (referred to as "t-invariant"). This newly derived formula enhances the detection of critical points, particularly in the context of acquiring and analyzing large 3D fluid flow data. This advancement enables efficient compression of 3D vector data and their representation through radial basis functions (RBFs). [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
40. Improving the analysis of hybrid systems through the infinity computer.
- Author
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Falcone, Alberto, Garro, Alfredo, and Sergeyev, Yaroslav D.
- Subjects
- *
HYBRID systems , *FINITE state machines , *DIFFERENTIAL equations , *FACTORIES , *CYBER physical systems , *SYSTEM dynamics , *NUCLEAR power plants - Abstract
Modeling and Simulation of Cyber-Physical Systems require to deal with new challenges arising from the growing heterogeneity of the involved components and related interactions, which often exhibit both continuous and discrete behaviors. To formalize the entire system's dynamics and take into consideration the interactions between the physical and cyber worlds, Hybrid Systems are widely adopted. Hybrid System models extend the traditional finite state machine by combining differential equations to model the continuous behavior of the system with a finite control graph, which formalizes discrete behaviors. The correct design and implementation of such Hybrid Systems play an essential role in the simulation of real-world Cyber-Physical Systems, especially for the ones involved in critical industrial plants such as nuclear, chemical, and aerospace. Traditional numerical methods engage a lot of computational resources to simulate a Hybrid System, as a consequence, slow down the simulation significantly. To overcome these computational issues, the paper investigates the use of a recently proposed numerical method, based on the Infinity Computer methodology, to design and simulate Hybrid Systems. The proposed method allows to reduce computational resources by generating observations more densely where it is necessary. To show the validity of the proposed method, an important real-life Hybrid System has been studied and the simulation results have been compared with the standard method. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
41. A coupled problem in stresses on loading a homogeneous semi-infinite thermoelastic rod.
- Author
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Begmatov, A. and Khaldjigitov, A.
- Subjects
- *
THERMOELASTICITY , *EQUATIONS of motion , *STRAINS & stresses (Mechanics) , *MECHANICAL loads , *BOUNDARY value problems , *DIFFERENTIAL equations , *LAPLACE transformation - Abstract
Usually, the complete system of thermoelasticity equations consists of the equation of motion, the Dugamel-Neumann relations, the Cauchy relation, and the heat influx equation. In this case, usually the boundary value problem is reduced to a system of differential equations for displacements and temperature with the corresponding initial and boundary conditions. Coupled thermoelasticity problems can be formulated in both stress and temperature, but this requires the second order of smoothness of the stress tensor. In this regard, there is an additional condition regarding stress. In this paper, the coupled problems of thermoelasticity are proposed to be considered on the basis of the equations of motion, the continuity equation, the Dugamel-Neumann relation, and the heat influx equation. In this case, a system of three interrelated equations for stress, velocity and temperature was obtained. Based on this system, the problem of the stress-strain state of a homogeneous semi-infinite thermoelastic rod under the action of a dynamic thermomechanical load applied to the end of the rod is considered. The exact analytical solution was obtained by the continuation method followed by the application of the Laplace and Fourier integral transformations. The asymptotic behavior of the stress is studied for small and large values of time. The propagation velocity of a thermoelastic wave has also been studied. Numerical calculations are carried out, the qualitative and quantitative nature of the mutual influence of temperature on the distribution of stresses and velocities of the rod sections is analyzed. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
42. Almost oscillatory solutions of Emden-Fowler type neutral delay equations of third order.
- Author
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Saad, Jihan and Mohamad, Hussain Ali
- Subjects
- *
DELAY differential equations , *DIFFERENTIAL equations , *EQUATIONS - Abstract
In this paper, the asymptotic behavior and oscillation criteria of neutral differential equations of Emden-Fowler type of third order are studied. Where some conditions were formulated to ensure oscillation for all solutions of these equations. The obtained conditions can be generalized to higher order delay differential equations of Emden-Fowler type. The obtained results showed that the Emden-Fowler type in the neutral differential equation plays a major role in the presence or absence of the oscillation property, unlike other types of neutral differential equations. Some examples are presented to illustrate and apply the results obtained. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
43. System gramians computation for the one and two-dimensional heat equations.
- Author
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Perev, Kamen
- Subjects
- *
HEAT equation , *DISTRIBUTED parameter systems , *DIFFERENTIAL forms , *DIFFERENTIAL equations , *CARLEMAN theorem , *FOURIER series , *SEPARATION of variables - Abstract
The paper considers the problem of observability and controllability gramians computation for one-dimensional and two-dimensional heat equations. The heat equation is a parabolic differential equation representing the process of heat flow. In the one-dimensional case, the heat equation models the physical process of a heat flow in a rod. In the two-dimensional case, this equation shows how the heat flow changes in a plate. The solutions of the heat equations are derived by applying the time-space separation principle and by using the Fourier series approximation. The zero input solution participates in computing the observability gramian of the distributed parameter system. The solution of the nonhomogeneous differential equation under zero initial conditions is used for computing the controllability gramian. Both solutions are based on the state space formulation of the infinite dimensional systems into an abstract differential form. The gramians computation procedure uses the Riesz-spectral framework of trajectory representation. The obtained system gramians are derived in explicit form, which allows their simple form of computation. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
44. The dynamical behavior of AIDS and HCV infection model with two modes of transmission.
- Author
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Yaseen, Rasha Majeed and Al-Husseiny, Hassan Fadhil
- Subjects
- *
AIDS , *HEPATITIS C , *STABILITY theory , *DIFFERENTIAL equations , *INFECTION - Abstract
The aim of this paper is to describe an epidemic model when two SI-type of diseases are transmitted vertically as well as horizontally through one population. The population contains two subclasses: susceptible and infectious, while the infectious are divided into three subgroups: those infected by AIDS disease, HCV disease, and by both diseases. A nonlinear mathematical model for AIDS and HCV diseases is Suggested and analyzed. Both local and global stability for each feasible equilibrium point are determined theoretically by using the stability theory of differential equations, Routh-Hurwitz and Gershgorin theorem. Moreover, the numerical simulation was carried out on the model parameters in order to determine their impact on the disease dynamics, and the results are displayed graphically and discussed. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
45. A method for researching the aerodynamic properties of cotton fiber in a rotor spinning machine separator.
- Author
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Korabayev, Sherzod, Akhmedov, Kamol, Bobojanov, Husanhon, and Matismailov, Saypila
- Subjects
- *
MACHINE separators , *EQUATIONS of motion , *AIR resistance , *COTTON fibers , *DIFFERENTIAL equations , *ROTORS , *AIR flow - Abstract
In this paper, the experimental description and verification of the airflow in the rotor spinning machine are very difficult, because the process takes place in the chamber. To describe the process, we conducted studies based on a new experimental approach. In the experimental work, the uniformity and stability of the velocity field of each channel for moving fibers in an aerodynamic device were checked. The speed of the airflow was changed from 5 m/s to 30 m/s. Differential equations of motion along the OX and OY axis were created taking into account the air resistance. When determining the movement of fibers in a conical channel, the total velocity was divided into components, constant values were found, and the general equations of motion were derived. Also, the movement of fibers in a conical channel along the OY axis as a function of time on different surfaces, the movement along the OY axis as a function of time at different speeds, the movement of fibers in a conical channel along the OX axis as a function of time on different surfaces, the movement along the OX axis as a function of time at different speeds graphs were obtained. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
46. Synthesis of a control system for a two-mass electromechanical object.
- Author
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Porubay, Oksana, Siddikov, Isamiddin, Nashvandova, Gulruxsor, and Alimova, Gulchexra
- Subjects
- *
ELASTICITY , *TRANSFER functions , *DIFFERENTIAL equations , *PROBLEM solving , *POLYNOMIALS , *ELECTROMECHANICAL technology - Abstract
The paper considers the issues of creating a system of second-order differential equations for controlling a dynamic object described by a system with an elastic property, alignments which are further transformed into two polynomial controls in matrix form. To solve the problem of synthesizing a control system in a control system, two matrix polynomials are introduced into the control system with unknown parameters that were the transfer function of the controller, the order of which is equal to two, which gives the system astatic properties. To solve this problem, matrix polynomial control is converted to matrix linear control with real coefficients. The results of simulation modeling show that the synthesized system meets the requirements of the object, the proposed device allows you to ensure the stability of the system, gives the properties of astaticism, and the duration of the transition process is determined by the location of the poles of the system and the desired quality indicators. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
47. Estimates for the norm of an integral operator with Oinarov's kernel.
- Author
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Kuliev, Komil, Kulieva, Gulchehra, and Ismatov, Normurod
- Subjects
- *
DIFFERENTIAL equations , *INTEGRAL operators , *OSCILLATIONS - Abstract
In this paper we give lower and upper estimates for the norm of the Hardy-Volterra operator with Oinarov's kernel in the case 1 < p ≤ q < ∞. The results given are very important in the study of the oscillation and non-oscillation properties of solutions of differential equations, as well as spectral properties. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
48. Computational spline interpolation algorithm for solving two point boundary value problems.
- Author
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Mishra, Arunesh Kumar and Singh, Kulbhushan
- Subjects
- *
BOUNDARY value problems , *SPLINE theory , *SPLINES , *INTERPOLATION algorithms , *DIFFERENTIAL equations , *PROBLEM solving - Abstract
In this paper we will discuss the theoretical analysis for Bickley's method and numerical procedure for getting the approximate solution. If (sm, ck) denote the class of spline functions consisting of piecewise polynomial of degree m, joined at "knots" with at-least k continuous derivatives (k < m) then spline functions in (Sm, cm-1) are used as approximating function for two point boundary value problem in the second order differential equations. The result shows that the presented cubic spline function which interpolates the lacunary data was efficient and effective for solving such problems. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
49. Neural ordinary differential equations for solving nonlinear system of ethanol fermentation in bioreactor.
- Author
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Azimi, Ahmad Izul Fakhruddin, Jamil, Norazaliza Mohd, and Rahim, Mohd Hasbi Ab
- Subjects
- *
NONLINEAR differential equations , *NONLINEAR equations , *DIFFERENTIAL equations , *ETHANOL , *FERMENTATION , *ORDINARY differential equations , *RESEARCH personnel - Abstract
Differential equations are used in many sectors of science and engineering to describe real-world issues. Unfortunately, sometimes it is difficult to solve using analytical methods and researchers have developed numerous approaches to solve these differential equations. The purpose of this paper is to emphasise the study of Neural Ordinary Differential Equations (Neural ODE) in solving differential equations linked to ethanol production via fermentation. Two analyses were conducted in order to compare the most effective approaches for solving these mathematical equations. The first comparison is between the conventional numerical method and Neural ODE. The data from experimental data were utilised to determine which approach had the least error in this analysis. Neural ODE performed well when compared to Runge-Kutta, the fourth and eighth orders. Following that, Neural ODE was compared to a recently created technique, Hypersolver, with the goal of enhancing Neural ODE performance. A study on the number of epochs and batches were performed in order to determine which hyperparameters gave the best and fastest results. The analysis of the number of epochs reveals that as the number of epochs rises, the error decreases, but the wall clock increases. For the analysis of batches in Hypersolver, increasing the batch size reduces the wall-clock during training, but no fixed error trend between microbe, ethanol and substrate can be identified, and these errors remain minimal when compared to Neural ODE. From these studies, it can be concluded that Neural ODE is capable of solving the presented model in the same way as the conventional numerical technique does, and the addition of training in Hypersolver does not show significant impact because the difference between Hypersolver and Neural ODE is very small. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
50. A comparative study of Taylor method, fourth order Runge-Kutta method and Runge-Kutta Fehlberg method to solve ordinary differential equations.
- Author
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Noar, Nor Aida Zuraimi Md, Apandi, Nur Ilyana Anwar, and Rosli, Norhayati
- Subjects
- *
RUNGE-Kutta formulas , *ORDINARY differential equations , *INITIAL value problems , *DIFFERENTIAL equations , *COMPARATIVE studies - Abstract
This paper mainly presents the Taylor method, Runge-Kutta fourth-order (RK4) method and Runge-Kutta Fehlberg (RKF) method for solving initial value problem (IVP) for ordinary differential equations (ODE). These problems can be effectively addressed using any of the three proposed methods, which have demonstrated high efficiency and practical suitability. Two differential equations model which describe the physical situation are chosen; Newton's cooling law and the spring mass damper system. Numerical comparisons between the Taylor method, RK4 and RKF have been presented. For Newton's cooling law problem, the performance and the computational effort of these methods have been compared. In order to verify the accuracy, we compare numerical solutions with the exact solution in the spring mass damper system problem. The step size needs to be decreased to achieve higher accuracy in the solution. The resulting value indicates that RKF and RK4 are the most efficient for solving the ODE in terms of convergence and accuracy, respectively. Meanwhile, Taylor Methods is still compatible but needs more iterations to converge. In the spring mass damper system problem, the Taylor Method diverges. [ABSTRACT FROM AUTHOR]
- Published
- 2024
- Full Text
- View/download PDF
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