Elliptic genera of level N for complete intersections

Abstract

We study the elliptic genera of level N at the cusps of 1(N) for any complete intersection. These genera are described as the summations of generalized binomial coefficients, where each generalized binomial coefficient is related to the dimension and multi-degree of complete intersection. For complete intersection Xn(d), write c1(Xn(d))=c1x, where x∈ H2(Xn(d);Z) is a generator. We mainly discuss the values of the elliptic genera of level N for Xn(d) in the case of c1>0, =0 or <0. In particular, the values about the Todd genus, A-genus and Ak-genus of Xn(d) can be derived from the elliptic genera of level N.