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Mean Value for Random Ideal Lattices

Number Theory 2025-12-12 v2

Abstract

We investigate the average number of lattice points within a ball for the nnth cyclotomic number field, where the lattice is chosen at random from the set of unit determinant ideal lattices of the field. We show that this average is nearly identical to the average number of lattice points in a ball among all unit determinant random lattices of the same dimension. To establish this result, we apply the Hecke integration formula and subconvexity bounds on Dedekind zeta functions of cyclotomic fields. The symmetries arising from the roots of unity in an ideal lattice allow us to prove the existence of ideal lattice packings of dimension φ(n)\varphi(n) and density n2φ(n)(1+o(1))n\cdot 2^{-\varphi(n)}(1+o(1)) as nn goes to infinity.

Keywords

Cite

@article{arxiv.2411.14973,
  title  = {Mean Value for Random Ideal Lattices},
  author = {Nihar Gargava and Maryna Viazovska},
  journal= {arXiv preprint arXiv:2411.14973},
  year   = {2025}
}

Comments

Added a more general version of the main theorem

R2 v1 2026-06-28T20:09:03.882Z