Cellularity of centrosymmetric matrix algebras and Frobenius extensions
Abstract
Centrosymmetric matrices of order n over an arbitrary algebra R form a subalgebra of the full n× n matrix algebra over R. It is called the centrosymmetric matrix algebra of order n over R and denoted by Sn(R). We prove (1) Sn(R) is Morita equivalent to S2(R) if n is even, and to S3(R) if n 3 is odd; (2) the full n× n matrix algebra over R is a separable Frobenius extension of Sn(R); and (3) if R is a commutative ring, then Sn(R) is a cellular R-algebra in the sense of Graham-Lehrer for all n 1.
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