Open AccessHAM-Based Adaptive Multiscale Meshless Method for Burgers Equation
Author(s) -
Shuli Mei
Publication year - 2013
Publication title -
journal of applied mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.307
H-Index - 43
eISSN - 1687-0042
pISSN - 1110-757X
DOI - 10.1155/2013/248246
Subject(s) - mathematics , partial differential equation , burgers' equation , discretization , interpolation (computer graphics) , ode , ordinary differential equation , regularized meshless method , nonlinear system , mathematical analysis , differential equation , computer science , singular boundary method , finite element method , animation , physics , computer graphics (images) , quantum mechanics , boundary element method , thermodynamics
Based on the multilevel interpolation theory, we constructed a meshless adaptive multiscale interpolation operator (MAMIO) with the radial basis function. Using this operator, any nonlinear partial differential equations such as Burgers equation can be discretized adaptively in physical spaces as a nonlinear matrix ordinary differential equation. In order to obtain the analytical solution of the system of ODEs, the homotopy analysis method (HAM) proposed by Shijun Liao was developed to solve the system of ODEs by combining the precise integration method (PIM) which can be employed to get the analytical solution of linear system of ODEs. The numerical experiences show that HAM is not sensitive to the time step, and so the arithmetic error is mainly derived from the discrete in physical space
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