Aaron Levin
Published 2006-01-27Version 1
In this article we completely determine the possible dimensions of integral points and holomorphic curves on the complement of a union of hyperplanes in projective space. Our main theorems generalize a result of Evertse and Gyory, who determined when all sets of integral points (over all number fields) on the complement of a union of hyperplanes are finite, and a result of Ru, who determined when all holomorphic maps to the complement of a union of hyperplanes are constant. The main tools used are the S-unit lemma and its analytic analogue, Borel's lemma.
On the Zariski-Density of Integral Points on a Complement of Hyperplanes in P^n
Integral points on the complement of the branch locus of projections from hypersurfaces
Integral points on the complement of plane quartics
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