On the Complexity of Atypical Special Points

Abstract

Given an integral variation of Hodge structure V on a complex algebraic variety S, polarized by some bilinear form Q : V V Z, it is believed that the set Aiso0 ⊂ S(C) of isolated atypical special points associated to (V, Q) forms a finite set. Here we show that the number of such points s is O(Q(ts, ts)) for any > 0, where ts is a minimal integral Hodge tensor defining s (in an appropriate sense). This resolves a conjecture of Grimm and Monnee.

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