Digital Object Identifier

	10.14457/CU.the.2014.422 Convergence of Adaptive Finite Element Methods for Semi-Linear Elliptic Partial Differential Equations
รหัสดีโอไอ	10.14457/CU.the.2014.422
Title	Convergence of Adaptive Finite Element Methods for Semi-Linear Elliptic Partial Differential Equations
Creator	Thanatyod Jampawai
Contributor	Khamron Mekchay
Publisher	Chulalongkorn University
Publication Year	2557
Keyword	Differential equations, Finite element method, Mathematical analysis, สมการเชิงอนุพันธ์, ไฟไนต์เอลิเมนต์, คณิตศาสตร์วิเคราะห์
Abstract	We analyze a standard adaptive finite element method (AFEM) for second order semi-linear elliptic partial differential equations with vanishing boundary over a polygonal domain in R^{2}. We prove a contraction property for the weighted sum of the energy error and the error estimator between any two consecutive loops, which implies the convergence of AFEM. The result is obtained based on the assumptions that the initial triangulation is sufficiently refined and a Lipschitz constant is sufficiently small in order to deal with the nonlinear inhomogeneous term f(x, u(x)), which is also assumed to be Lipschitz in the second variable.
URL Website	cuir.car.chula.ac.th

Chulalongkorn University

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EndNote

APA

Thanatyod Jampawai และ Khamron Mekchay. (2014) Convergence of Adaptive Finite Element Methods for Semi-Linear Elliptic Partial Differential Equations. Chulalongkorn University:ม.ป.ท. 10.14457/CU.the.2014.422

Chicago

Thanatyod Jampawai และ Khamron Mekchay. 2014. Convergence of Adaptive Finite Element Methods for Semi-Linear Elliptic Partial Differential Equations. ม.ป.ท.:Chulalongkorn University; 10.14457/CU.the.2014.422

MLA

Thanatyod Jampawai และ Khamron Mekchay. Convergence of Adaptive Finite Element Methods for Semi-Linear Elliptic Partial Differential Equations. ม.ป.ท.:Chulalongkorn University, 2014. Print. 10.14457/CU.the.2014.422

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