On the sparsity of non-diagonalisable integer matrices and matrices with a given discriminant

Abstract

We consider the set Mn( Z; H) of n× n-matrices with integer elements of size at most H and obtain upper bounds on the number of matrices from Mn( Z; H), for which the characteristic polynomial has a fixed discriminant d. When d=0, this corresponds to counting matrices with a repeated eigenvalue, and thus is related to counting non-diagonalisable matrices. For d 0, this problem seems not to have been studied previously, while for d=0, both our approach and the final result improve on those of A. J. Hetzel, J. S. Liew and K. Morrison (2007).

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