Likely intersections
Abstract
We prove a general likely intersections theorem, a counterpart to the Zilber-Pink conjectures, under the assumption that the Ax-Schanuel property and some mild additional conditions are known to hold for a given category of complex quotient spaces definable in some fixed o-minimal expansion of the ordered field of real numbers. For an instance of our general result, consider the case of subvarieties of Shimura varieties. Let S be a Shimura variety. Let π:D D = S realize S as a quotient of D, a homogeneous space for the action of a real algebraic group G, by the action of < G, an arithmetic subgroup. Let S' ⊂eq S be a special subvariety of S realized as π(D') for D' ⊂eq D a homogeneous space for an algebraic subgroup of G. Let X ⊂eq S be an irreducible subvariety of S not contained in any proper weakly special subvariety of S. Assume that the intersection of X with S' is persistently likely meaning that whenever ζ:S1 S and :S1 S2 are maps of Shimura varieties (meaning regular maps of varieties induced by maps of the corresponding Shimura data) with ζ finite, ζ-1 X + ζ-1 S' ≥ S1. Then X g ∈ G, π(g D') is special π(g D') is dense in X for the Euclidean topology.
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