Graphs and $({\Bbb Z}_2)^k$-actions
Abstract
Let denote all nonbounding effective smooth -actions on -dimensional smooth closed connected manifolds, each of which is cobordant to one with finite fixed set. Motivated by GKM theory, one can associate to each action of a -colored regular graph of valence . Together with the combinatorics of colored graphs, equivariant cobordism and the tom Dieck-Kosniowski-Stong localization theorem, we give a lower bound for the number of fixed points of an action in , which can become the best possible in some cases; we determine the existence and the equivariant cobordism classification of all actions in with , where is the subset of , each of which is equivariantly cobordant to an effective -action fixing just isolated points, and it is well-known that is empty if ; we characterize the explicit relationships among tangent representations at fixed points of each action in with , which actually give the explicit solution of the Smith problem in such cases. As an application, we also study the minimum number of fixed points of all actions in .
Cite
@article{arxiv.math/0508643,
title = {Graphs and $({\Bbb Z}_2)^k$-actions},
author = {Zhi Lü},
journal= {arXiv preprint arXiv:math/0508643},
year = {2010}
}
Comments
44 pages with 9 figures. Rewritten and expanded