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Quadratic Chabauty for modular curves: algorithms and examples

Jennifer S. Balakrishnan, Netan Dogra, J. Steffen Müller, Jan Tuitman, Jan Vonk

2023Compositio Mathematica20 citationsDOIOpen Access PDF

Abstract

We describe how the quadratic Chabauty method may be applied to determine the set of rational points on modular curves of genus $g>1$ whose Jacobians have Mordell–Weil rank $g$ . This extends our previous work on the split Cartan curve of level 13 and allows us to consider modular curves that may have few known rational points or non-trivial local height contributions at primes of bad reduction. We illustrate our algorithms with a number of examples where we determine the set of rational points on several modular curves of genus 2 and 3: this includes Atkin–Lehner quotients $X_0^+(N)$ of prime level $N$ , the curve $X_{S_4}(13)$ , as well as a few other curves relevant to Mazur's Program B. We also compute the set of rational points on the genus 6 non-split Cartan modular curve $X_{\scriptstyle \mathrm { ns}} ^+ (17)$ .

Topics & Concepts

MathematicsModular curvePrime (order theory)GenusRank (graph theory)QuotientQuadratic equationModular designCombinatoricsPure mathematicsDiscrete mathematicsAlgebra over a fieldModular formGeometryOperating systemBotanyBiologyComputer scienceAlgebraic Geometry and Number TheoryAdvanced Algebra and GeometryCommutative Algebra and Its Applications
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