Algebraic and Geometric Topology 3 (2003), paper no. 27, pages 791-856.

Generalized orbifold Euler characteristics of symmetric orbifolds and covering spaces

Hirotaka Tamanoi


Abstract. Let G be a finite group and let M be a G-manifold. We introduce the concept of generalized orbifold invariants of M/G associated to an arbitrary group Gamma, an arbitrary Gamma-set, and an arbitrary covering space of a connected manifold Sigma whose fundamental group is Gamma. Our orbifold invariants have a natural and simple geometric origin in the context of locally constant G-equivariant maps from G-principal bundles over covering spaces of Sigma to the G-manifold M. We calculate generating functions of orbifold Euler characteristic of symmetric products of orbifolds associated to arbitrary surface groups (orientable or non-orientable, compact or non-compact), in both an exponential form and in an infinite product form. Geometrically, each factor of this infinite product corresponds to an isomorphism class of a connected covering space of a manifold Sigma. The essential ingredient for the calculation is a structure theorem of the centralizer of homomorphisms into wreath products described in terms of automorphism groups of Gamma-equivariant G-principal bundles over finite Gamma-sets. As corollaries, we obtain many identities in combinatorial group theory. As a byproduct, we prove a simple formula which calculates the number of conjugacy classes of subgroups of given index in any group. Our investigation is motivated by orbifold conformal field theory.

Keywords.

AMS subject classification. Primary: 55N20, 55N91. Secondary: 57S17, 57D15, 20E22, 37F20, 05A15.

DOI: 10.2140/agt.2003.3.791

E-print: arXiv:math.GR/0309133

Submitted: 11 February 2002. (Revised: 31 July 2003.) Accepted: 20 August 2003. Published: 31 August 2003.

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Hirotaka Tamanoi
Department of Mathematics, University of California
Santa Cruz, CA 95064, USA
Email: tamanoi@math.ucsc.edu

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