Abstract
Purpose - This paper aims to find the numerical solution of planar and non-planar Burgers' equation and analysis of the shock behave.
Design/methodology/approach - First, the authors discritize the time-dependent term using Crank-Nicholson finite difference approximation and use quasilinearization to linearize the nonlinear term then apply Scale-2 Haar wavelets for space integration. After applying this scheme on partial differential, the equation transforms into a system of algebraic equation. Then, the system of equation is solved using Gauss elimination method.
Findings Present method is the extension of the method (Jiwari, 2012). The numerical solutions using Scale-2 Haar wavelets prove that the proposed method is reliable for planar and non-planar nonlinear Burgers' equation and yields results better than other methods and compatible with the exact solutions.
Originality/value - The numerical results for non-planar Burgers' equation are very sparse. In the present paper, the authors identify where the shock wave and discontinuity occur in planar and non-planar Burgers'' equation.