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Cayley Hamilton theorem with sandwich coefficients for n$\times$n matrices over a ring satisfying [x,y][u,v]=0

Published 16 Jun 2011 in math.RA | (1106.3223v1)

Abstract: If A is an n \times n matrix over a ring R satisfying the polynomial identity [x,y][u,v]=0, then an invariant Cayley-Hamilton identity of the form \Sigma A{i}c_{i,j}A{j}=0 with c_{i,j}\in R and c_{n,n}=(n!)2 holds for A.

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