Wavelet Based Full Approximation Scheme for the Numerical Solution of Burgers’ equation arising in Fluid Dynamics using Biorthogonal wavelet
Authors
S. C. Shiralashetti , L. M. Angadi and A.B. Deshi
Abstract
Wavelet based methods are the new development in the area of applied mathematics. Wavelets
are \u00a0mathematical \u00a0tools \u00a0that \u00a0cut \u00a0functions \u00a0or \u00a0operators \u00a0into \u00a0different \u00a0frequency \u00a0components, \u00a0and \u00a0then \u00a0study
each \u00a0component \u00a0with \u00a0a \u00a0resolution \u00a0matching \u00a0to \u00a0its \u00a0scale. \u00a0In \u00a0this \u00a0paper, \u00a0we \u00a0proposed \u00a0Biorthogonal \u00a0wavelet
based full-approximation scheme for the numerical solution of Burgers\u2019 equation arising in fluid dynamics
using \u00a0biorthogonal \u00a0wavelet \u00a0filter \u00a0coefficients \u00a0as \u00a0prolongation \u00a0and \u00a0restriction \u00a0operators. \u00a0 \u00a0 \u00a0The \u00a0proposed
method gives higher accuracy in terms of better convergence with low computational time, which has been
demonstrated through the illustrative problem. \u00a0
