Inner and Outer Derivations of FV8n
Abstract
Let F be a field of characteristic 0 or an odd rational prime p. In this article, we give an explicit classification of all the inner and outer derivations of the group algebra FV8n, where V8n is a group of order 8n (n a positive integer) with presentation a, b a2n = b4 = 1, ba = a-1b-1, b-1a = a-1b . First, we explicitly classify all the F-derivations of FV8n by giving the dimension and a basis of the derivation algebra consisting of all F-derivations of FV8n. Consequently, we classify all inner and outer derivations of FV8n when F is an algebraic extension of a prime field. Thus, we establish that all the derivations of FV8n are inner when the characteristic of F is 0 or p with p relatively prime to n, and that non-zero outer derivations exist only in the case when the characteristic of F is p with p dividing n.
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