The Vacuum Moduli Space of the Minimal Supersymmetric Standard Model

Abstract

A starting point in the study of the minimal supersymmetric Standard Model (MSSM) is the vacuum moduli space, which is a highly complicated algebraic variety: it is the image of an affine variety X ⊂ C49 under a symplectic quotient map φ to C973. Previous work computed the vacuum moduli space of the electroweak sector; geometrically this corresponds to studying a restriction of φ: C13 φres C22. We analyze the geometry of the full vacuum moduli space for superpotentials W minimal (without neutrinos) and W MSSM (with neutrinos) in C973. In both cases, we prove that X consists of three irreducible components X1, X2, and X3, and determine the images Mi of the Xi under φ. For W minimal we show they have, respectively, dimensions 1, 15, and 29, and prove that each of the Mi is a rational variety, while for W MSSM we show that M3 is the only component. Restricting the Mi to the electroweak sector, we recover known results. We describe the components of the vacuum moduli space geometrically in terms of incidence varieties to a product of Segre varieties.