Strongly Independent Matrices and Applications on the Rigidity of A-Invariant Measures on n-Torus
Abstract
We introduce the notion of strongly independent matrices and show the existence of strongly independent matrices in GL(n,Z) over Zn\0\ when 2n+1 is a prime number. As an application of strong independence, we give a measure rigidity result for endomorphisms on n-torus Tn.
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