Elliptic Genera and N=2 Superconformal Field Theory
Abstract
Recently Witten proposed to consider elliptic genus in N=2 superconformal field theory to understand the relation between N=2 minimal models and Landau-Ginzburg theories. In this paper we first discuss the basic properties satisfied by elliptic genera in N=2 theories. These properties are confirmed by some fundamental class of examples. Then we introduce a generic procedure to compute the elliptic genera of a particular class of orbifold theories, i.e.\/ the ones orbifoldized by e2π iJ0 in the Neveu-Schwarz sector. This enables us to calculate the elliptic genera for Landau-Ginzburg orbifolds. When the Landau-Ginzburg orbifolds allow an interpretation as target manifolds with SU(N) holonomy we can compare the expressions with the ones obtained by orbifoldizing tensor products of N=2 minimal models. We also give sigma model expressions of the elliptic genera for manifolds of SU(N) holonomy.
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