On the equivalence problem of Smith forms for multivariate polynomial matrices

Abstract

This paper delves into the equivalence problem of Smith forms for multivariate polynomial matrices. Generally speaking, multivariate (n ≥ 2) polynomial matrices and their Smith forms may not be equivalent. However, under certain specific condition, we derive the necessary and sufficient condition for their equivalence. Let F∈ K[x1,…,xn]l× m be of rank r, dr(F)∈ K[x1] be the greatest common divisor of all the r× r minors of F, where K is a field, x1,…,xn are variables and 1 ≤ r ≤ \l,m\. Our key findings reveal the result: F is equivalent to its Smith form if and only if all the i× i reduced minors of F generate K[x1,…,xn] for i=1,…,r.

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