Evaluation of the matrix exponential function using finite elements in time
This work offers a new numerical approach for the classic problem of matrix exponential evaluation, which is important for computational linear algebra applications.
The paper presents a finite element method in a fictitious time variable to evaluate matrix exponentials, achieving accurate calculations for any given matrix by solving a set of simultaneous equations.
The evaluation of a matrix exponential function is a classic problem of computational linear algebra. Many different methods have been employed for its numerical evaluation [Moler C and van Loan C 1978 SIAM Review 20 4], none of which produce a definitive algorithm which is broadly applicable and sufficiently accurate, as well as being reasonably fast. Herein, we employ a method which evaulates a matrix exponential as the solution to a first-order initial value problem in a fictitious time variable. The new aspect of the present implementation of this method is to use finite elements in the fictitious time variable. [Weatherford C A, Red E, and Wynn A 2002 Journal of Molecular Structure 592 47] Then using an expansion in a properly chosen time basis, we are able to make accurate calculations of the exponential of any given matrix as the solution to a set of simultaneous equations.