Modular Forms as Classification Invariants of 4D N=2 Heterotic--IIA Dual Vacua

Abstract

We focus on 4D N=2 string vacua described both by perturbative Heterotic theory and by Type IIA theory; a Calabi--Yau three-fold X IIA in the Type IIA language is further assumed to have a regular K3-fibration. It is well-known that one can assign a modular form to such a vacuum by counting perturbative BPS states in Heterotic theory or collecting Noether--Lefschetz numbers associated with the K3-fibration of XIIA. In this article, we expand the observations and ideas (using gauge threshold correction) in the literature and formulate a modular form with full generality for the class of vacua above, which can be used along with for the purpose of classification of those vacua. Topological invariants of XIIA can be extracted from and , and even a pair of diffeomorphic Calabi--Yau's with different K\"ahler cones may be distinguished by introducing the notion of "the set of 's for Higgs cascades/for curve classes". We illustrated these ideas by simple examples.