The matrix equations XA-AX=Xαg(X) over fields or rings

Abstract

Let n,α≥ 2. Let K be an algebraically closed field with characteristic 0 or greater than n. We show that the dimension of the variety of pairs (A,B)∈ Mn(K)2, with B nilpotent, that satisfy AB-BA=Aα or A2-2AB+B2=0 is n2-1 ; moreover such matrices (A,B) are simultaneously triangularizable. Let R be a reduced ring such that n! is not a zero-divisor and A be a generic matrix over R ; we show that X=0 is the sole solution of AX-XA=Xα. Let R be a commutative ring with unity ; let A be similar to diag(λ1In1,·s,λrInr) such that, for every i= j, λi-λj is not a zero-divisor. If X is a nilpotent solution of XA-AX=Xαg(X) where g is a polynomial, then AX=XA.