On Algorithmic Universality in F-theory Compactifications

Abstract

We study universality of geometric gauge sectors in the string landscape in the context of F-theory compactifications. A finite time construction algorithm is presented for 43 × 2.96 × 10755 F-theory geometries that are connected by a network of topological transitions in a connected moduli space. High probability geometric assumptions uncover universal structures in the ensemble without explicitly constructing it. For example, non-Higgsable clusters of seven-branes with intricate gauge sectors occur with probability above 1-1.01× 10-755, and the geometric gauge group rank is above 160 with probability .999995. In the latter case there are at least 10 E8 factors, the structure of which fixes the gauge groups on certain nearby seven-branes. Visible sectors may arise from E6 or SU(3) seven-branes, which occur in certain random samples with probability 1/200.