Effectivity for bounds on points of good reduction in the moduli space of hypersurfaces
Abstract
Let S be a finite set of primes. For sufficiently large n and d, Lawrence and Venkatesh proved that in the moduli space of hypersurfaces of degree d in Pn, the locus of points with good reduction outside S is not Zariski dense. We make this result effective by computing explicit values of n and d for which this statement holds. We accomplish this by giving a more precise computation and analysis of the Hodge numbers of these hypersurfaces and check that they satisfy certain bounds.
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