F-Theories on Double Sextics and Effective String Theories
Abstract
We construct new F-theory vacua in 8-dimensions. They are coming by projective realizations of F-theory on K3 surfaces admitting double covers onto 2, branched along a plane sextic curve, the so called double sextics. The new vacua are associated with singular K3 surfaces. In this way the stable picture of the heterotic string is mapped at the triple points of the sextic. We argue that this formulation naturally incorporates the Sp(4,Z) invariance that the extrapolating four dimensional vector multiplet sector of all heterotic vacua may possess. In addition, we describe the way that the 4D g=2 description of (0,2) moduli dependence of N=1 gauge coupling constants may be connected to Riemann surfaces, with natural Sp(4,Z) duality invarinace. Here we recover a novel way to break space-time supersymmetry and fix the moduli parameters in the presence of Wilson lines. In the context of arithmetic of torsion points on elliptic curves, we describe in detail, the derivation of elliptic fibrations in Weierstrass form. We also consider the heterotic duals to compactifications of F-theory in four dimensions belonging to isomorphic classes of elliptic curves with point-cusps of order two. For the latter theories, we calculate the N=2 4D heterotic prepotential fTTT corresponding to o(2)T × o(2)U, classical perturbative duality group, and their conjugate modular theories.
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