New perspectives in the duality of M-theory, heterotic strings, and F-theory

TL;DR

This paper explores new perspectives on dualities among M-theory, heterotic strings, and F-theory in eight and seven dimensions, revealing multiple F-theory limits of a single M-theory and their implications for gauge symmetries.

Contribution

It introduces a novel framework for understanding the dualities and limits among M-theory, heterotic strings, and F-theory, highlighting the existence of multiple F-theory limits with different gauge symmetry properties.

Findings

Multiple F-theory limits of a single M-theory are identified.

Discrete gauge symmetries can form or not form depending on the F-theory limit.

Constraints on gauge groups are derived using genus-one fibrations and Jacobian fibrations.

Abstract

We discuss a new perspective on the dualities among seven-dimensional M-theory on elliptically fibered K3 surfaces, eight-dimensional (8D) heterotic strings on $T^2$, and 8D F-theory on elliptic K3 surfaces. There are several distinct small-fiber F-theory limits of a single M-theory, and we deduce that the distinct F-theory limits of an identical M-theory generally include both an F-theory limit, wherein a discrete gauge symmetry forms, and another F-theory limit, wherein a discrete gauge symmetry does not form. We also discuss constraints imposed on the degrees of discrete gauge groups and on the continuous gauge groups formed in F-theory on K3 surfaces by applying a formula that is known to hold for genus-one fibrations of K3 surfaces, and by utilizing the existence of the Jacobian fibrations.