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On Poincaré duality for pairs (G,W)

Maria Gorete Carreira AndradeErmínia de Lourdes Campello FantiLígia Laís Fêmina — 2015

Open Mathematics

Let G be a group and W a G-set. In this work we prove a result that describes geometrically, for a Poincaré duality pair (G, W ), the set of representatives for the G-orbits in W and the family of isotropy subgroups. We also prove, through a cohomological invariant, a necessary condition for a pair (G, W ) to be a Poincaré duality pair when W is infinite.

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