On the Rank of Jacobian Varieties of the Curves ys=axr+b

Abstract

We study the family of algebraic curves of genus ≥ 1 defined by the affine equations ys=axr+b over a number field k, where r ≥ 2 and s≥ 2 are fixed integers. Assuming the strong version of Lang's conjecture on varieties of general type, we prove that the Mordell-Weil rank of the Jacobian varieties of these curves is uniformly bounded. The proof proceeds by constructing a parameter space for curves in the family with a given number of rational points and analyzing the geometry of its fibers, which are shown to be complete intersection curves of increasing genus.

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