Pages that link to "Item:Q949560"

The following pages link to Solution of delay differential equations via a homotopy perturbation method (Q949560):

Displaying 50 items.

• An efficient numerical scheme for solving a fractional-order system of delay differential equations (Q2101336) (← links)
• A new fixed point algorithm for finding the solution of a delay differential equation (Q2129945) (← links)
• Analytical and numerical solutions of a nonlinear alcoholism model via variable-order fractional differential equations (Q2150094) (← links)
• Two-dimensional Haar wavelet method for numerical solution of delay partial differential equations (Q2158461) (← links)
• A predator-prey model involving variable-order fractional differential equations with Mittag-Leffler kernel (Q2166899) (← links)
• A novel predictor-corrector scheme for solving variable-order fractional delay differential equations involving operators with Mittag-Leffler kernel (Q2180318) (← links)
• Solutions of neutral delay differential equations using a generalized Lambert \(W\) function (Q2185439) (← links)
• A new approximation of conformable time fractional partial differential equations with proportional delay (Q2192635) (← links)
• An efficient algorithm for solving Fredholm integro-differential equations with weakly singular kernels (Q2252230) (← links)
• Rational pseudospectral approximation to the solution of a nonlinear integro-differential equation arising in modeling of the population growth (Q2282651) (← links)
• Numerical solution of time-fractional nonlinear PDEs with proportional delays by homotopy perturbation method (Q2292373) (← links)
• Numerical solution of a model for stochastic polymer equation driven by space-time Brownian motion via homotopy perturbation method (Q2323887) (← links)
• Numerical solutions of fractional delay differential equations using Chebyshev wavelet method (Q2335474) (← links)
• Rational homotopy perturbation method for solving stiff systems of ordinary differential equations (Q2337556) (← links)
• A solution of delay differential equations via Picard-Krasnoselskii hybrid iterative process (Q2360003) (← links)
• A class of Birkhoff-Lagrange-collocation methods for high order boundary value problems (Q2400789) (← links)
• A new Jacobi rational-Gauss collocation method for numerical solution of generalized pantograph equations (Q2448391) (← links)
• A new approximate analytical method for ODEs (Q2509426) (← links)
• Analytical treatment of some partial differential equations arising in mathematical physics by using the Exp-function method. (Q2797246) (← links)
• The existence of periodic solutions for coupled pantograph Rayleigh system (Q2809493) (← links)
• Multistep finite difference schemes for the variable coefficient delay parabolic equations (Q2816617) (← links)
• Bifurcation of the periodic motion in nonlinear delayed oscillators (Q2832127) (← links)
• A solution to the Lane-Emden equation inthetheory of stellar structure utilizing the Tau method (Q2846195) (← links)
• The first integral method for constructing exact and explicit solutions to nonlinear evolution equations (Q2882448) (← links)
• A spectral element approach for the stability of delay systems (Q2894760) (← links)
• A new algorithm for solving differential equations (Q2905699) (← links)
• Numerical solutions of wave equations subject to an integral conservation condition by He's homotopy perturbation method (Q2919314) (← links)
• Numerical solutions for the nonlinear Fornberg-Whitham equation by He's methods (Q2919329) (← links)
• Rational approximation solution of the foam drainage equation with time‐ and space‐fractional derivatives (Q2966965) (← links)
• Application of semi‐analytical methods for solving the Rosenau‐Hyman equation arising in the pattern formation in liquid drops (Q2966973) (← links)
• Approximate solutions for Fornberg‐Whitham type equations (Q2966975) (← links)
• Solution of the heat equation in the cast‐mould heterogeneous domain using a weighted algorithm based on the homotopy perturbation method (Q2967018) (← links)
• A semi‐analytical technique for the solution of differential‐algebraic equations and applications in flow of an incompressible viscous fluid (Q2967050) (← links)
• Homotopy Padé method for solving second-order one-dimensional telegraph equation (Q2967073) (← links)
• On some modified variational iteration methods for solving the one-dimensional sine–Gordon equation (Q2995494) (← links)
• An efficient numerical method for solving coupled Burgers' equation by combining homotopy perturbation and pade techniques (Q3015181) (← links)
• Analytical approach to Boussinesq equation with space- and time-fractional derivatives (Q3018555) (← links)
• An analytical approximation for solving nonlinear Blasius equation by NHPM (Q3055957) (← links)
• Comparison between variational iteration method and homotopy perturbation method for linear and nonlinear partial differential equations with the nonhomogeneous initial conditions (Q3055977) (← links)
• New general solutions for the general elliptic and auxiliary equations and application to the coupled KdV equation (Q3056412) (← links)
• He's homotopy perturbation method for solving the space- and time-fractional telegraph equations (Q3066950) (← links)
• Homotopy perturbation method to obtain new solitary solutions with compact support for Boussinesq-like B(2n, 2n) equations with fully nonlinear dispersion (Q3075001) (← links)
• A numerical treatment for the solution of the hydromagnetic peristaltic flow of a bio‐fluid with variable viscosity in a circular cylindrical tube (Q3075955) (← links)
• Reliable analysis for the nonlinear fractional calculus model of the semilunar heart valve vibrations (Q3075956) (← links)
• Exact solutions for some systems of PDEs by He's homotopy perturbation method (Q3082595) (← links)
• The homotopy perturbation method for solving the linear and the nonlinear Goursat problems (Q3089041) (← links)
• Analytical approach to fractional partial differential equations in fluid mechanics by means of the homotopy perturbation method (Q3113103) (← links)
• Applications of variational iteration and homotopy perturbation methods to obtain exact solutions for time‐fractional diffusion‐wave equations (Q3113110) (← links)
• Homotopy perturbation method for numerical solutions of coupled Burgers equations with time‐ and space‐fractional derivatives (Q3113115) (← links)
• Analytical solution of wave system in R^<i>n</i>with coupling controllers (Q3113119) (← links)