Litcius/Paper detail

A Kernel-Based Least-Squares Collocation Method for Surface Diffusion

Meng Chen, Ka Chun Cheung, Leevan Ling

2023SIAM Journal on Numerical Analysis11 citationsDOIOpen Access PDF

Abstract

There are plenty of applications and analysis for time-independent elliptic partial differential equations in the literature hinting at the benefits of overtesting by using more collocation conditions than the number of basis functions.Overtesting not only reduces the problem size, but is also known to be necessary for stability and convergence of widely used unsymmetric Kansa-type strong-form collocation methods.We consider kernelbased meshfree methods, which is a method of lines with collocation and overtesting spatially, for solving parabolic partial differential equations on surfaces without parametrization.In this paper, we extend the time-independent convergence theories for overtesting techniques to the parabolic equations on smooth and closed surfaces.

Topics & Concepts

MathematicsCollocation (remote sensing)Partial differential equationCollocation methodOrthogonal collocationConvergence (economics)Kernel (algebra)Applied mathematicsOrdinary differential equationParabolic partial differential equationMathematical analysisDifferential equationComputer scienceCombinatoricsMachine learningEconomicsEconomic growthAdvanced Numerical Methods in Computational MathematicsNumerical methods in engineeringAdvanced Numerical Analysis Techniques