Lifting solutions of polynomial equations on matrices over field to complete local principal ideal rings

Abstract

Let O be a complete local principal ideal ring with residue field k of characteristic not 2 and f∈ O[x1,x2,…,xm]. Take A∈ Mn( O) with its reduction A∈ Mn(k). In this article, we study the following lifting problem. Suppose there exists a tuple (B1, B2, …,Bm)∈ Mn(k)m of pairwise commuting matrices such that f(B1, B2, …,Bm) = A; under what conditions can this solution be lifted to a tuple (B1,B2,…,Bm)∈ Mn( O)m of pairwise commuting matrices satisfying f(B1,B2,…,Bm)=A? For A cyclic, we show that, under suitable hypotheses analogous to those appearing in Hensel lemma, such a lifting is always possible.