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Auteurs principaux: Blomer, Valentin, Brumley, Farrell, Radiwiłł, Maksym
Format: Preprint
Publié: 2026
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Accès en ligne:https://arxiv.org/abs/2603.05609
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author Blomer, Valentin
Brumley, Farrell
Radiwiłł, Maksym
author_facet Blomer, Valentin
Brumley, Farrell
Radiwiłł, Maksym
contents We prove a conjecture of Michel--Venkatesh on joinings of distinct Linnik problems, in the setting of simultaneous quaternionic embeddings of imaginary quadratic fields having sufficiently many small split primes. This splitting condition is known to hold for all but $O((\log\log X)^{1 + o(1)})$ discriminants up to $X$. We also treat a non-equivariant form of this conjecture proposed by Aka--Einsiedler--Shapira, which in particular applies to the classical Gauss construction joining Linnik points on the sphere with CM points on the modular surface.
format Preprint
id arxiv_https___arxiv_org_abs_2603_05609
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Joint Linnik problems
Blomer, Valentin
Brumley, Farrell
Radiwiłł, Maksym
Number Theory
We prove a conjecture of Michel--Venkatesh on joinings of distinct Linnik problems, in the setting of simultaneous quaternionic embeddings of imaginary quadratic fields having sufficiently many small split primes. This splitting condition is known to hold for all but $O((\log\log X)^{1 + o(1)})$ discriminants up to $X$. We also treat a non-equivariant form of this conjecture proposed by Aka--Einsiedler--Shapira, which in particular applies to the classical Gauss construction joining Linnik points on the sphere with CM points on the modular surface.
title Joint Linnik problems
topic Number Theory
url https://arxiv.org/abs/2603.05609