E(n)-coactions on semisimple Clifford algebras

Abstract

In this article we prove that E(n)-coactions over a finite-dimensional algebra A are classified by tuples (, d1, ... , dn) consisting of an involution and a family (di)i=1,...,n of -derivations satisfying appropriate conditions. Tuples of maps can be replaced by tuples of suitable elements (c, u1, . . . , un), whenever A is a semisimple Clifford algebra.

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