Sets of Special Subvarieties of Bounded Degree

Abstract

Let f : X S be a family of smooth projective algebraic varieties over a smooth connected quasi-projective base S, and let V = R2k f* Z(k) be the integral variation of Hodge structure coming from degree 2k cohomology it induces. Associated to V one has the so-called Hodge locus HL(S) ⊂ S, which is a countable union of "special" algebraic subvarieties of S parametrizing those fibres of V possessing extra Hodge tensors (and so conjecturally, those fibres of f possessing extra algebraic cycles). The special subvarieties belong to a larger class of so-called weakly special subvarieties, which are subvarieties of S maximal for their algebraic monodromy groups. For each positive integer d, we give an algorithm to compute the set of all weakly special subvarieties Z ⊂ S of degree at most d (with the degree taken relative to a choice of projective compactification S ⊂ S and very ample line bundle L on S). As a corollary of our algorithm we prove conjectures of Daw-Ren and Daw-Javanpeykar-K\"uhne on the finiteness of sets of special and weakly special subvarieties of bounded degree.