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Invariant factors as limit of singular values of a matrix

Published 15 Nov 2018 in math.AG | (1811.07706v2)

Abstract: The paper concerns a result in linear algebra motivated by ideas from tropical geometry. Let $A(t)$ be an $n \times n$ matrix whose entries are Laurent series in $t$. We show that, as $t \to 0$, logarithms of singular values of $A(t)$ approach the invariant factors of $A(t)$. This leads us to suggest logarithms of singular values of an $n \times n$ complex matrix as an analogue of the logarithm map on $(\mathbb{C}*)n$ for the matrix group $GL(n, \mathbb{C})$.

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