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UM E-Theses Collection (澳門大學電子學位論文庫)

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Title

Fully discrete local discontinuous Galerkin Methods for some time-fractional fourth-order problems

English Abstract

In this thesis, we study the fully discrete local discontinuous Galerkin method for some time-fractional fourth-order differential equations. The method is based on a finite difference in time and local discontinuous Galerkin (LDG) methods in space. This scheme was employed to solve the problem and shown to converge with order O(τ −αh k+1 + τ 2−α + τ − α 2 h k+ 1 2 + h k+1). We find that the LDG method can actually achieve convergence rate equals O(τ 2−α + h k+1). The claims are justified accurately by numerical tests.

Issue date

2015.

Author

Guo, Li

Faculty
Faculty of Science and Technology
Department
Department of Mathematics
Degree

M.Sc.

Subject

Galerkin methods

Discontinuous functions

Supervisor

Vong, Seak Weng

Files In This Item

Full-text (Intranet only)

Location
1/F Zone C
Library URL
991000744829706306