Eventual periodicity of the Smith forms of integer matrix powers
Abstract
We prove that the Smith forms of the powers of an integer square matrix behave in an eventually periodic manner. More precisely, if SF(M) denotes the Smith form of M ∈ Zm × m, then for every A ∈ Zm × m there exist n0 ∈ N, an integer T ≥ 1, and a constant diagonal matrix D ∈ Zm × m such that n ≥ n0 implies SF(An+T)=D · SF(An). This provides an eventually affirmative answer to a conjecture posed in 2013 by R. Bruner. We also show that both n0 and T can be arbitrarily large.
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