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KIAM Preprint № 75, Moscow, 2023
Authors: Botchev M.A.
Coarse grid corrections in Krylov subspace evaluations of the matrix exponential
Abstract:
A coarse grid correction (CGC) approach is proposed to enhance the efficiency of the matrix exponential and phi matrix function evaluations. The approach is intended for iterative methods computing the matrix-vector products with these functions. It is based on splitting the vector by which the matrix function is multiplied into a smooth part and a remaining part. The smooth part is then handled on a coarser grid, whereas the computations on the original grid are carried out with a relaxed stopping criterion tolerance. Estimates on the error are derived for the two-grid and multigrid variants of the proposed CGC algorithm. Numerical experiments demonstrate the efficiency of the algorithm, when employed in combination with Krylov subspace and Chebyshev polynomial expansion methods.
Keywords:
matrix exponential, phi matrix function, multigrid, Krylov subspace methods, exponential residual, exponential time integration
Publication language: russian,  pages: 28
Research direction:
Mathematical problems and theory of numerical methods
Russian source text:
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About authors:
  • Botchev Mikhail Aleksandrovich,  orcid.org/0000-0001-5901-7120KIAM RAS