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An elementary proof of eigenvalue preservation for the co-rotational Beris-Edwards system

Published 3 Oct 2018 in math.AP | (1810.01550v1)

Abstract: We study the co-rotational Beris-Edwards system modeling nematic liquid crystals and revisit the eigenvalue preservation property discussed in \cite{XZ16}. We give an alternative but direct proof to the eigenvalue preservation of the initial data for the $Q$-tensor. It is noted that our proof is not only valid in the whole space case, but in the bounded domain case as well.

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