Implicit Method of High Accuracy on Hexagonal Grids for Approximating the Solution to Heat Equation on Rectangle
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Amer Inst Physics
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info:eu-repo/semantics/closedAccess
Abstract
A two layer Implicit method on hexagonal grids is proposed for approximating the solution to first type boundary value problem of heat equation on rectangle. It is proven that the given implicit scheme is unconditionally stable and converges to the exact solution on the grids of order O(h(4) + t(2)) where, h and root 3/2 h are the step sizes in space variables x(1) and x(2) respectively and t is the step size in time. The method is applied on a test problem and the obtained numerical results justify the given theoretical results.
Description
4th International Conference of Mathematical Sciences (ICMS) -- JUN 17-21, 2020 -- Maltepe Univ, ELECTR NETWORK
Keywords
Finite difference method, Hexagonal grid, Stability analysis, Error bounds, Two dimensional heat equation
Journal or Series
Fourth International Conference of Mathematical Sciences (Icms 2020)
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Scopus Q Value
Volume
2334
