Beyond a question of Markus Linckelmann

Abstract

In the 2002 Durham Symposium, Markus Linckelmann [1] conjectured the existence of a regular central k*-extension of the full subcategory over the selfcentralizing Brauer pairs of the Frobenius P-category F(b,G) associated with a block b of defect group P of a finite group G, which would include, as k*-automorphism groups of the objects, the k*-groups associated with the automizers of the corresponding selfcentralizing Brauer (b,G)-pairs, introduced in [3, 6.6]; as a matter of fact, in this question the selfcentralizing Brauer pairs can be replaced by the nilcentralized Brauer pairs, still getting a positive answer. But the condition on the k*-automorphism groups of the objects is not precise enough to guarantee the uniqueness of a solution, as showed by Sejong Park in [2, Theorem 1.3]. This uniqueness depends on the folder structure [5,~Section~2] associated with F(b,G) in [4,~Theorem~11.32], and here we prove the existence and the uniqueness of such a regular central k*-extension for any folded Frobenius P-category.