Hodge Representations

Abstract

Hodge representations were introduced by Green-Griffiths-Kerr to classify the Hodge groups of polarized Hodge structures, and the corresponding Mumford-Tate subdomains of a period domain. The purpose of this article is to provide an exposition of how, given a fixed period domain D, to enumerate the Hodge representations corresponding to Mumford-Tate subdomains D ⊂ D. After reviewing the well-known classical cases that D is Hermitian symmetric (weight n=1, and weight n=2 with pg = h2,0=1), we illustrate this in the case that D is the period domain parameterizing polarized Hodge structures of (effective) weight two Hodge structures with first Hodge number pg = h2,0 = 2. We also classify the Hodge representations of Calabi-Yau type, and enumerate the horizontal representations of CY 3-fold type. (The "horizontal" representations those with the property that corresponding domain D ⊂ D satisfies the infinitesimal period relation, a.k.a. Griffiths' transversality, and is therefore Hermitian.)