A quadrature based method for evaluating exponential-type functions for exponential methods

被引：11

作者：

Lopez-Fernandez, Maria ^{[1
]}

机构：

[1] CSIC UAM UC3M UCM, Inst Ciencias Matemat, E-28006 Madrid, Spain

来源：

BIT NUMERICAL MATHEMATICS | 2010年 / 50卷 / 03期

关键词：

Exponential methods; Numerical inverse Laplace transform; Parabolic equations; DATA-SPARSE APPROXIMATION; OPERATOR-VALUED FUNCTIONS; RUNGE-KUTTA METHODS; LAPLACE TRANSFORMS; PARABOLIC PROBLEMS; NUMERICAL INVERSION; TIME-DISCRETIZATION; INTEGRATORS; EQUATIONS; CONTOURS;

D O I：

10.1007/s10543-010-0273-5

中图分类号：

TP31 [计算机软件];

学科分类号：

081202 ; 0835 ;

摘要：

We present a quadrature-based method to evaluate exponential-like operators required by different kinds of exponential integrators. The method approximates these operators by means of a quadrature formula that converges like O(e (-cK) ), with K the number of quadrature nodes, and it is useful when solving parabolic equations. The approach allows also the evaluation of the associated scalar mappings. The method is based on numerical inversion of sectorial Laplace transforms. Several numerical illustrations are provided to test the algorithm, including examples with a mass matrix and the application of the method inside the MATLAB package EXP4, an adaptive solver based on an exponential Runge-Kutta method.

引用

页码：631 / 655

页数：25

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