Galois Orbit Bounds for Surface Degenerations
David Urbanik (IAS)
Abstract: Given a family g : X -> S of smooth projective algebraic varieties over a number field K, one often wants to constrain the points s in S where the fibre X_s acquires "extra" algebraic structure. A basic sort of constraint which is important in unlikely intersection theory is that of a Galois-orbit lower bound: an inequality h(s) <= poly([K(s) : K]), where h is some logarithmic Weil height and K(s) is the field of definition of s. Recent work has focused on how to use G-functions constructed from degenerations of g to produce such inequalities. We describe some new results in the case where g is a one-parameter degeneration of surfaces, and the central role played by rigid and "adelic" geometry. This leads to new cases of the Zilber-Pink conjecture for 1-parameter families of K3 surfaces.
algebraic geometrynumber theory
Audience: researchers in the topic
( paper )
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| Organizers: | Edgar Costa*, Bjorn Poonen*, David Roe*, Andrew Sutherland*, Robin Zhang*, Wei Zhang*, Eran Assaf*, Thomas Rüd |
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