One-skeleta, Betti numbers and equivariant cohomology
Abstract
The one-skeleton of a G-manifold M is the set of points p in M where Gp ≥ G -1; and M is a GKM manifold if the dimension of this one-skeleton is 2. Goresky, Kottwitz and MacPherson show that for such a manifold this one-skeleton has the structure of a ``labeled" graph, (, α), and that the equivariant cohomology ring of M is isomorphic to the ``cohomology ring'' of this graph. Hence, if M is symplectic, one can show that this ring is a free module over the symmetric algebra (*), with b2i() generators in dimension 2i, b2i() being the ``combinatorial'' 2i-th Betti number of . In this article we show that this ``topological'' result is , in fact, a combinatorial result about graphs.
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