Null ideals of sets of 3 × 3 similar matrices with irreducible characteristic polynomial
Abstract
Let F be a field and Mn(F) the ring of n × n matrices over F. Given a subset S of Mn(F), the null ideal of S is the set of all polynomials f with coefficients from Mn(F) such that f(A) = 0 for all A ∈ S. We say that S is core if the null ideal of S is a two-sided ideal of the polynomial ring Mn(F)[x]. We study sufficient conditions under which S is core in the case where S consists of 3 × 3 matrices, all of which share the same irreducible characteristic polynomial. In particular, we show that if F is finite with q elements and |S| ≥slant q3-q2+1, then S is core. As a byproduct of our work, we obtain some results on block Vandermonde matrices, invertible matrix commutators, and graphs defined via an invertible difference relation.
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