A multiresolution collocation method and its convergence for Burgers' type equations

Abstract: In this article, a hybrid numerical method based on Haar wavelets and finite differences is proposed for shock ridden evolutionary nonlinear time-dependent partial differential equations (PDEs). A linear procedure using Taylor expansions is adopted to linearize the nonlinearity. The Euler difference scheme is used to discretize the time derivative part of the PDE. The PDE is converted into full algebraic form, once the space derivatives are replaced by finite Haar series. Convergence analysis is performed both… Show more

“…Due to these tremendous achievements, the popularity of CMWH is highlighted by various researchers and as a result they consider it as a solver for their beneficial problems. A brief overview of CMHW and its extension to a vast range of problems can be found in [27][28][29][30][31][32][33][34]. In 2018, Haar wavelets are turn to find the various type of source functions in inverse problems by M. Ahsan et al [35,36].…”

A higher-order collocation method based on Haar wavelets for integro-differential equations with two-point integral condition

“…Due to these tremendous achievements, the popularity of CMWH is highlighted by various researchers and as a result they consider it as a solver for their beneficial problems. A brief overview of CMHW and its extension to a vast range of problems can be found in [27][28][29][30][31][32][33][34]. In 2018, Haar wavelets are turn to find the various type of source functions in inverse problems by M. Ahsan et al [35,36].…”

A higher-order collocation method based on Haar wavelets for integro-differential equations with two-point integral condition

Mastering the Cahn–Hilliard equation and Camassa–Holm equation with cell-average-based neural network method

Modified fractional homotopy method for solving nonlinear optimal control problems