Corrigendum to "Oscillation behavior of third-order neutral Emden-Fowler delay xdynamic equations on time scales" [Adv. Difference Equ., 2010, 1-23 (2010)] [PDF]
, 2012 Tao Ji, Shuhong Tang, Tongxing Li
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Solving delay differential equations by Runge-Kutta method using different types of interpolation [PDF]
, 2001 Introduction to delay differential equations (DDEs) and the areas where they arise are given. Analysis of specific numerical methods for solving delay differential equation is considered.
Alkhasawneh, Rae'd Ali Ahmed
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ASYMPTOTIC AND OSCILLATORY BEHAVIOUR OF SOLUTIONS OF THIRD ORDER GENERALIZED MIXED DIFFERENCE EQUATION [PDF]
, 2015 M. Maria Susai Manuel +3 more
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The numerical solution of the nonlinear hyperbolic-parabolic heat equation
Discrete and Continuous Models and Applied Computational ScienceThe article discusses a mathematical model and a finite-difference scheme for the heating process of an infinite plate. The disadvantages of using the classical parabolic heat equation for this case and the rationale for using the hyperbolic heat ...
Vladislav N. Khankhasaev +1 more
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Higher-order approximations for space-fractional diffusion equation
Journal of Numerical Analysis and Approximation TheorySecond-order and third-order finite difference approximations for fractional derivatives are derived from a recently proposed unified explicit form. The Crank-Nicholson schemes based on these approximations are applied to discretize the space-fractional
Anura Gunarathna Wickramarachchi +1 more
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Effect of liquid droplets on turbulence in a round gaseous jet [PDF]
The main objective of this investigation is to develop a two-equation turbulence model for dilute vaporizing sprays or in general for dispersed two-phase flows including the effects of phase changes.
Elghobashi, S. E., Mostafa, A. A.
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Global Dynamics of a Third-Order Rational Difference Equation
Karaelmas Science and Engineering Journal, 2018 In this paper, we will investigate the global dynamics of the following non-linear difference equation x(n+1)=Ax(n-2)/B+Cx(n)^p(1)x(n-1)^p(2) , where the parameters are non-negative numbers and the initial values are non-negative numbers.
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Oscillation and nonoscillation in nonlinear third order difference equations [PDF]
International Journal of Mathematics and Mathematical Sciences, 1989 B. Smith, W. E. Taylor
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A general method for studying quadratic perturbations of the third-order Lyness difference equation [PDF]
, 2013 Guifeng Deng, Nianzu Liu, Qiuying Lu
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