Gluing endo-permutation modules

Abstract

In this paper, I show that if p is an odd prime, and if P is a finite p-group, then there exists an exact sequence of abelian groups 0 T(P) D(P)P H1((P),)(P), where D(P) is the Dade group of P and T(P) is the subgroup of endo-trivial modules. Here P is the group of sequences of compatible elements in the Dade groups D(NP(Q)/Q) for non trivial subgroups Q of P. The poset (P) is the set of elementary abelian subgroups of rank at least 2 of P, ordered by inclusion. The group H1((P),)(P) is the subgroup of H1((P),) consisting of classes of P-invariant 1-cocycles. Here P is the group of sequences of compatible elements in the Dade groups D(NP(Q)/Q) for non trivial subgroups Q of P. The poset (P) is the set of elementary abelian subgroups of rank at least 2 of P, ordered by inclusion. The group H1((P),)(P) is the subgroup of H1((P),) consisting of classes of P-invariant 1-cocycles. A key result to prove that the above sequence is exact is a characterization of elements of 2D(P) by sequences of integers, indexed by sections (T,S) of P such that T/S (/p)2, fulfilling certain conditions associated to subquotients of P which are either elementary abelian of rank~3, or extraspecial of order p3 and exponent p.