Sparsity of Integral Points on Moduli Spaces of Varieties

Abstract

Let X be a quasi-projective variety over a number field, admitting (after passage to C) a geometric variation of Hodge structure whose period mapping has zero-dimensional fibers. Then the integral points of X are sparse: the number of such points of height ≤ B grows slower than any positive power of B. For example, homogeneous integral polynomials in a fixed number of variables and degree, with discriminant divisible only by a fixed set of primes, are sparse when considered up to integral linear substitutions.