The Minimal Degree Standard Identity on MnE2 and MnE3
Abstract
We prove an Amitsur--Levitzki-type theorem for Grassmann algebras, stating that the minimal degree of a standard identity that is a polynomial identity of the ring of n × n matrices over the m-generated Grassmann algebra is at least 2m2+4n-4 for all n,m≥ 2 and this bound is sharp for m=2,3 and any n≥ 2. The arguments are purely combinatorial, based on computing sums of signs corresponding to Eulerian trails in directed graphs.
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