Statistics of Limit Root Bundles Relevant for Exact Matter Spectra of F-Theory MSSMs

Abstract

In the largest, currently known, class of one Quadrillion globally consistent F-theory Standard Models with gauge coupling unification and no chiral exotics, the vector-like spectra are counted by cohomologies of root bundles. In this work, we apply a previously proposed method to identify toric base 3-folds, which are promising to establish F-theory Standard Models with exactly three quark-doublets and no vector-like exotics in this representation. The base spaces in question are obtained from triangulations of 708 polytopes. By studying root bundles on the quark doublet curve C(3,2)1/6 and employing well-known results about desingularizations of toric K3-surfaces, we derive a triangulation independent lower bound NP(3) for the number NP(3) of root bundles on C(3,2)1/6 with exactly three sections. The ratio NP(3) / NP, where NP is the total number of roots on C(3,2)1/6, is largest for base spaces associated with triangulations of the 8-th 3-dimensional polytope 8 in the Kreuzer-Skarke list. For each of these O( 1015 ) 3-folds, we expect that many root bundles on C(3,2)1/6 are induced from F-theory gauge potentials and that at least every 3000th root on C(3,2)1/6 has exactly three global sections and thus no exotic vector-like quark-doublet modes.