Alternatively, two-field-variable local weak forms are used in order to decompose the governing equation, biharmonic equation, into a couple of Poisson equations and then impose straightforward boundary conditions. The shape functions using regular and irregular nodal distribution as well as order of polynomial basis choice are constructed by moving kriging interpolation. Received 13 June 2014 accepted 8 December 2014 Available online 16 December 2014īiharmonic equation Meshless method Moving kriging interpolation Ībstract Meshless method choosing Heaviside step function as a test function for solving simply supported thin plates under various loads is presented in this paper. Moving kriging interpolation for solving simply supported thin plates under various loadsĭepartment of Mathematics, Faculty of Science, King Mongkut's University of Technology Thonburi (KMUTT), Bangkok 10140, Thailand Two-field-variable meshless method based on c^m^ King Saud University Journal of King Saud University -Science Journal of King Saud University - Science (2015) 27, 209-216
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