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A μ-mode approach for exponential integrators: actions of φ-functions of Kronecker sums
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A μ-mode approach for exponential integrators: actions of φ-functions of Kronecker sums
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Journal Article
A μ-mode approach for exponential integrators: actions of φ-functions of Kronecker sums
2024
Overview
We present a method for computing actions of the exponential-like
φ
-functions for a Kronecker sum
K
of
d
arbitrary matrices
A
μ
. It is based on the approximation of the integral representation of the
φ
-functions by Gaussian quadrature formulas combined with a scaling and squaring technique. The resulting algorithm, which we call
phiks
, evaluates the required actions by means of
μ
-mode products involving exponentials of the
small sized
matrices
A
μ
, without forming the
large sized
matrix
K
itself.
phiks
, which profits from the highly efficient level 3 BLAS, is designed to compute different
φ
-functions applied on the same vector or a linear combination of actions of
φ
-functions applied on different vectors. In addition, thanks to the underlying scaling and squaring techniques, the desired quantities are available simultaneously at suitable time scales. All these features allow the effective usage of
phiks
in the exponential integration context. In fact, our newly designed method has been tested in popular exponential Runge–Kutta integrators of stiff order from one to four, in comparison with state-of-the-art algorithms for computing actions of
φ
-functions. The numerical experiments with discretized semilinear evolutionary 2D or 3D advection–diffusion–reaction, Allen–Cahn, and Brusselator equations show the superiority of the proposed
μ
-mode approach.
Publisher
Springer International Publishing,Springer Nature B.V
