数学物理学报 ›› 2014, Vol. 34 ›› Issue (3): 872-890.

• 论文 • 上一篇    下一篇

A POD REDUCED-ORDER SPDMFE EXTRAPOLATING ALGORITHM FOR HYPERBOLIC EQUATIONS

罗振东|李宏   

  1. School of Mathematics and Physics, North China Electric Power University, Beijing 102206, China; School of Mathematical Sciences, Inner Mongolia University, Huhhot 010021, China
  • 收稿日期:2013-04-30 修回日期:2013-10-12 出版日期:2014-05-20 发布日期:2014-05-20
  • 基金资助:

    Research of this work was mainly supported by the National Science Foundation of China (11271127, 11361035), Science Research of Guizhou Education Department (QJHKYZ[2013]207), and Natural Science Foundation of Inner Mongolia (2012MS0106).

A POD REDUCED-ORDER SPDMFE EXTRAPOLATING ALGORITHM FOR HYPERBOLIC EQUATIONS

 LUO Zhen-Dong, LI Hong   

  1. School of Mathematics and Physics, North China Electric Power University, Beijing 102206, China; School of Mathematical Sciences, Inner Mongolia University, Huhhot 010021, China
  • Received:2013-04-30 Revised:2013-10-12 Online:2014-05-20 Published:2014-05-20
  • Supported by:

    Research of this work was mainly supported by the National Science Foundation of China (11271127, 11361035), Science Research of Guizhou Education Department (QJHKYZ[2013]207), and Natural Science Foundation of Inner Mongolia (2012MS0106).

摘要:

In this article, a proper orthogonal decomposition (POD) method is used to study a classical splitting positive definite mixed finite element (SPDMFE) formulation for second-order hyperbolic equations. A POD reduced-order SPDMFE extrapolating algorithm with lower dimensions and sufficiently high accuracy is established for second-order hyperbolic equations. The error estimates between the classical SPDMFE solutions and the reduced-order SPDMFE solutions obtained from the POD reduced-order SPDMFE extrapolating algorithm are provided. The implementation for solving the POD reduced-order SPDMFE extrapolating algorithm is given. Some numerical experiments are presented illustrating that the results of numerical computation are consistent with theoretical conclusions, thus validating that the POD reduced-order SPDMFE extrapolating algorithm is feasible and
efficient for solving second-order hyperbolic equations.

关键词: Proper orthogonal decomposition, splitting positive definite mixed finite ele-ment formulation, hyperbolic equations, error estimate

Abstract:

In this article, a proper orthogonal decomposition (POD) method is used to study a classical splitting positive definite mixed finite element (SPDMFE) formulation for second-order hyperbolic equations. A POD reduced-order SPDMFE extrapolating algorithm with lower dimensions and sufficiently high accuracy is established for second-order hyperbolic equations. The error estimates between the classical SPDMFE solutions and the reduced-order SPDMFE solutions obtained from the POD reduced-order SPDMFE extrapolating algorithm are provided. The implementation for solving the POD reduced-order SPDMFE extrapolating algorithm is given. Some numerical experiments are presented illustrating that the results of numerical computation are consistent with theoretical conclusions, thus validating that the POD reduced-order SPDMFE extrapolating algorithm is feasible and
efficient for solving second-order hyperbolic equations.

Key words: Proper orthogonal decomposition, splitting positive definite mixed finite ele-ment formulation, hyperbolic equations, error estimate

中图分类号: 

  • 65N30