A functorial presentation of units of Burnside rings

Abstract

Let B× be the biset functor over F2 sending a finite group~G to the group B×(G) of units of its Burnside ring B(G), and let B× be its dual functor. The main theorem of this paper gives a characterization of the cokernel of the natural injection from B× in the dual Burnside functor F2B, or equivalently, an explicit set of generators GS of the kernel L of the natural surjection F2B B×. This yields a two terms projective resolution of B×, leading to some information on the extension functors Ext1(-,B×). For a finite group G, this also allows for a description of B×(G) as a limit of groups B×(T/S) over sections (T,S) of G such that T/S is cyclic of odd prime order, Klein four, dihedral of order 8, or a Roquette 2-group. Another consequence is that the biset functor B× is not finitely generated, and that its dual B× is finitely generated, but not finitely presented. The last result of the paper shows in addition that GS is a minimal set of generators of L, and it follows that the lattice of subfunctors of L is uncountable.