On the separability of some Green biset functors
Abstract
We show that the Green biset functor RC of complex characters over Z, is not separable, i.e. it is not projective as a bimodule over itself. Also, we show that RBG, the Burnside biset functor shifted by a finite group G, over a commutative ring R, is separable if and only if |G| is invertible in R. Finally, to address the question of the relation between functors and their evaluations, we show that the Burnside R-algebra RB(G) is separable if and only if |G| is invertible in R.
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