On the source algebra equivalence class of blocks with cyclic defect groups, II

Abstract

This series of papers is a contribution to the program of classifying p-blocks of finite groups up to source algebra equivalence, starting with the case of cyclic blocks. To any p-block B of a finite group with cyclic defect group D, Linckelmann associated an invariant W( B ), which is an indecomposable endo-permutation module over D, and which, together with the Brauer tree of B, essentially determines its source algebra equivalence class. In Parts II-IV of our series of papers, we classify, for odd p, those endo-permutation modules of cyclic p-groups arising from p-blocks of quasisimple groups. In the present Part II, we reduce the desired classification for the quasisimple classical groups of Lie type B, C, and D to the corresponding objective for the general linear and unitary groups; the classification is completed for the latter groups.

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