Pseudo-Anosov homeomorphisms and the lower central series of a surface group
Abstract
Let Gammak be the lower central series of a surface group Gamma of a compact surface S with one boundary component. A simple question to ponder is whether a mapping class of S can be determined to be pseudo-Anosov given only the data of its action on Gamma/Gammak for some k. In this paper, to each mapping class f which acts trivially on Gamma/Gammak+1, we associate an invariant Psik(f) in End(H1(S, Z)) which is constructed from its action on Gamma/Gammak+2 . We show that if the characteristic polynomial of Psik(f) is irreducible over Z, then f must be pseudo-Anosov. Some explicit mapping classes are then shown to be pseudo-Anosov.
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