Sandpile groups of supersingular isogeny graphs

Nathanaël Munier; Ari Shnidman

doi:10.5802/jtnb.1262

Sandpile groups of supersingular isogeny graphs

Nathanaël Munier, Ari Shnidman

Einstein Institute of Mathematics

The Hebrew University of Jerusalem

Research output: Contribution to journal › Article › peer-review

Abstract

Let p and q be distinct primes, and let X_p,qbe the (q + 1)- regular graph whose nodes are supersingular elliptic curves over F_pand whose edges are q-isogenies. For fixed p, we compute the distribution of the ℓ-Sylow subgroup of the sandpile group (i.e. Jacobian) of X_p,qas q → ∞. We find that the distribution disagrees with the Cohen–Lenstra heuristic in this context. Our proof is via Galois representations attached to modular curves. As a corollary, we give an upper bound on the probability that the Jacobian is cyclic, which we conjecture to be sharp.

Original language	English
Pages (from-to)	751-774
Number of pages	24
Journal	Journal de Theorie des Nombres de Bordeaux
Volume	35
Issue number	3
DOIs	https://doi.org/10.5802/jtnb.1262
State	Published - 2023

All Science Journal Classification (ASJC) codes

Algebra and Number Theory

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10.5802/jtnb.1262

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title = "Sandpile groups of supersingular isogeny graphs",

abstract = "Let p and q be distinct primes, and let Xp,qbe the (q + 1)- regular graph whose nodes are supersingular elliptic curves over Fpand whose edges are q-isogenies. For fixed p, we compute the distribution of the ℓ-Sylow subgroup of the sandpile group (i.e. Jacobian) of Xp,qas q → ∞. We find that the distribution disagrees with the Cohen–Lenstra heuristic in this context. Our proof is via Galois representations attached to modular curves. As a corollary, we give an upper bound on the probability that the Jacobian is cyclic, which we conjecture to be sharp.",

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AU - Munier, Nathanaël

AU - Shnidman, Ari

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N2 - Let p and q be distinct primes, and let Xp,qbe the (q + 1)- regular graph whose nodes are supersingular elliptic curves over Fpand whose edges are q-isogenies. For fixed p, we compute the distribution of the ℓ-Sylow subgroup of the sandpile group (i.e. Jacobian) of Xp,qas q → ∞. We find that the distribution disagrees with the Cohen–Lenstra heuristic in this context. Our proof is via Galois representations attached to modular curves. As a corollary, we give an upper bound on the probability that the Jacobian is cyclic, which we conjecture to be sharp.

AB - Let p and q be distinct primes, and let Xp,qbe the (q + 1)- regular graph whose nodes are supersingular elliptic curves over Fpand whose edges are q-isogenies. For fixed p, we compute the distribution of the ℓ-Sylow subgroup of the sandpile group (i.e. Jacobian) of Xp,qas q → ∞. We find that the distribution disagrees with the Cohen–Lenstra heuristic in this context. Our proof is via Galois representations attached to modular curves. As a corollary, we give an upper bound on the probability that the Jacobian is cyclic, which we conjecture to be sharp.

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JF - Journal de Theorie des Nombres de Bordeaux

IS - 3

ER -

Sandpile groups of supersingular isogeny graphs

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