Lang-Vojta Conjecture over function fields for surfaces dominating Gm2
Abstract
We prove the nonsplit case of the Lang-Vojta conjecture over function fields for surfaces of log general type that are ramified covers of Gm2. This extends results of Corvaja and Zannier, who proved the conjecture in the split case, and results of Corvaja and Zannier and the second author that were obtained in the case of the complement of a degree four and three component divisor in P2. We follow the strategy developed by Corvaja and Zannier and make explicit all the constants involved.
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