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Indexed by:期刊论文

Date of Publication:2017-03-01

Journal:JOURNAL OF SCIENTIFIC COMPUTING

Included Journals:SCIE、EI

Volume:70

Issue:3

Page Number:1316-1335

ISSN No.:0885-7474

Key Words:Semilinear elliptic equation; Boundary value problem; Eigenfunction expansion; Homotopy continuation; Polynomial system

Abstract:Symmetry is analyzed in the solution set of the polynomial system resulted from the eigenfunction expansion discretization of semilinear elliptic equation with polynomial nonlinearity. Such symmetry is inherited from the symmetry of the continuous problem and is rooted in the dihedral symmetry of the domain. Homotopies preserving such symmetry are designed to efficiently compute all solutions of the polynomial systems obtained from the discretizations for problems with cubic and quintic nonlinearities, respectively. The key points in homotopy construction are the special properties of the polynomial systems arising respectively from the discretizations of and in certain eigensubspaces. Such resulting polynomial systems are taken as start systems in the homotopies. Since only representative solution paths need to be followed, a lot of computational cost can be saved. Numerical results are presented to illustrate the efficiency.