Cayley unitary elements in group algebras under oriented involutions
Abstract
Let F be a real extension of Q, G a finite group and FG its group algebra. Given both a group homomorphism σ:G→ \1\ (called an orientation) and a group involution :G → G such that gg∈ N=ker(σ), an oriented group involution of FG is defined by α=Σg∈ Gαgg α=Σg∈ Gαgσ(g)g. In this paper, in case the involution on G is the classical one, x x-1, β=x+x-1 is a skew-symmetric element in FG such that 1+β is invertible, for x∈ G with σ(x)=-1, we consider Cayley unitary elements built out of β. We prove that the coefficients of (1+β)-1 involve an interesting sequence which is a Fibonacci-like sequence.
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