Pages that link to "Item:Q2138860"

The following pages link to An efficient numerical scheme based on Lucas polynomials for the study of multidimensional Burgers-type equations (Q2138860):

Displaying 14 items.

• A new algorithm based on Lucas polynomials for approximate solution of 1D and 2D nonlinear generalized Benjamin-Bona-Mahony-Burgers equation (Q1672662) (← links)
• Numerical study of 1D and 2D advection-diffusion-reaction equations using Lucas and Fibonacci polynomials (Q2053743) (← links)
• An efficient numerical method based on Lucas polynomials to solve multi-dimensional stochastic Itô-Volterra integral equations (Q2079375) (← links)
• A computational method based on the generalized Lucas polynomials for fractional optimal control problems (Q2110489) (← links)
• Lucas wavelet scheme for fractional Bagley-Torvik equations: Gauss-Jacobi approach (Q2114515) (← links)
• Computational and numerical investigation of the batch Markovian arrival process subject to renewal generated geometric catastrophes (Q2114624) (← links)
• Existence of solutions for a coupled system of fractional differential equations by means of topological degree theory (Q2167048) (← links)
• A new numerical treatment based on Lucas polynomials for 1D and 2D sinh-Gordon equation (Q2205742) (← links)
• Generalized Lucas tau method for the numerical treatment of the one and two-dimensional partial differential heat equation (Q2672491) (← links)
• Pell collocation pseudo spectral scheme for one-dimensional time-fractional convection equation with error analysis (Q2672553) (← links)
• (Q5884077) (← links)
• Optimized decomposition method for solving multi-dimensional Burgers' equation (Q6104229) (← links)
• Pseudospectral analysis for multidimensional fractional Burgers equation based on Caputo fractional derivative (Q6611210) (← links)
• An improved version of homotopy perturbation method for multi-dimensional Burgers' equations (Q6617572) (← links)