Periodicity of the pure mapping class group of non-orientable surfaces

Abstract

We show that the pure mapping class group Ngk of a non-orientable closed surface of genus g≥slant 2 with k≥slant 1 marked points has p-periodic cohomology for each odd prime p for which Ngk has p-torsion. Using the Yagita invariant and the cohomology classes obtained by the representation of subgroups of order p, we obtain that the p-period is less than or equal to 4 when g≥slant 3 and k≥slant 1. Moreover, combining the Nielsen realization theorem and a characterization of the p-period given in terms of normalizers and centralizers of cyclic subgroups of order p, we show that the p-period of Ngk is bounded below by 4, whenever Ngk has p-periodic cohomology, g≥slant 3 and k≥slant 0. These results provide partial answers to questions proposed by G. Hope and U. Tillmann.