Geometric Representation Theory and G-Signature
Abstract
Let G be a finite group. To every smooth G-action on a compact, connected and oriented surface we can associate its data of singular orbits. The set of such data becomes an Abelian group BG under the G-equivariant connected sum. We will show that the map which sends G to BG is functorial and carries many features of the representation theory of finite groups and thus describes a geometric representation theory. We will prove that BG consists only of copies of Z and Z/2Z. Furthermore we will show that there is a surjection from the G-equivariant cobordism group of surface diffeomorphisms to BG. We will define a G-signature which is related to the G-signature of Atiyah and Singer and prove that this new G-signature is injective on the copies of Z in BG.
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