On the pure virtual braid group PV3
Abstract
In this article, we investigate various properties of the pure virtual braid group PV3. From its canonical presentation, we obtain a free product decomposition of PV3. As a consequence, we show that PV3 is residually torsion free nilpotent, which implies that the set of finite type invariants in the sense of Goussarov-Polyak-Viro is complete for virtual pure braids with three strands. Moreover we prove that the presentation of PV3 is aspherical. Finally we determine the cohomology ring and the associated graded Lie algebra of PV3.
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