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Eigenstructure-preserving scheme for a hyperbolic system

Published 18 Jun 2019 in physics.comp-ph, physics.flu-dyn, and physics.plasm-ph | (1906.07320v1)

Abstract: A hyperbolic system must have a set of linearly independent eigenvectors and corresponding real eigenvalues. In numerical simulations, however, the eigenvalues can be complex because truncation errors pollute a characteristic polynomial of the hyperbolic system. Here we propose an eigenstructure-preserving scheme which always generates the real eigenvalues, even in discrete level. Although the eigenstructure is discussed in a non-conservative formulation, the proposed scheme is locally conservative owing to the skew-symmetric operators.

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