Asymptotic results for average sizes of isogeny Selmer groups of hyperelliptic Jacobians are obtained by combining Bhargava geometry-of-numbers with new Vinberg-theory parametrizations for Dynkin types B and C, plus lower bounds via Greenberg-Wiles.
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3 Pith papers cite this work. Polarity classification is still indexing.
years
2026 3verdicts
UNVERDICTED 3representative citing papers
Geometrizes Poisson summation for quadrics over number fields by relating Braverman-Kazhdan and theta-lift Schwartz spaces.
Studies differential operators on Braverman-Kazhdan spaces P^der backslash G and claims they share structural properties with Weyl algebras while developing D-module theory.
citing papers explorer
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Arithmetic statistics of isogeny Selmer groups associated to hyperelliptic curves
Asymptotic results for average sizes of isogeny Selmer groups of hyperelliptic Jacobians are obtained by combining Bhargava geometry-of-numbers with new Vinberg-theory parametrizations for Dynkin types B and C, plus lower bounds via Greenberg-Wiles.
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Geometrization of summation formulae for quadrics
Geometrizes Poisson summation for quadrics over number fields by relating Braverman-Kazhdan and theta-lift Schwartz spaces.
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Weyl algebras on Braverman-Kazhdan spaces
Studies differential operators on Braverman-Kazhdan spaces P^der backslash G and claims they share structural properties with Weyl algebras while developing D-module theory.