A correction to the uniqueness of a partial perfect locality over a Frobenius P-category

Abstract

Let p be a prime, P a finite p-group and F a Frobenius P-category. In "Existence, uniqueness and functoriality of the perfect locality over a Frobenius P-category", Algebra Colloquium, 23(2016) 541-622, we also claimed the uniqueness of the partial perfect locality L X over any up-closed set X of F-selfcentralizing subgroups of P, but recently Bob Oliver exhibit some counter-examples, demanding some revision of our arguments. In this Note we show that, up to replacing the perfect localities by the "extendable" perfect localities over any up-closed set X of F-selfcentralizing subgroups of P, our arguments are correct, still proving the existence and the uniqueness of the perfect F sc-locality, since it is "extendable". We take advantage to simplify some of our arguments.