English

On quantum ergodicity for higher dimensional cat maps modulo prime powers

Number Theory 2025-09-16 v2 Mathematical Physics Dynamical Systems math.MP

Abstract

A discrete model of quantum ergodicity of linear maps generated by symplectic matrices ASp(2d,Z)A \in \mathrm{Sp}(2d,\mathbb{Z}) modulo an integer N1N\ge 1, has been studied for d=1d=1 and almost all NN by P. Kurlberg and Z. Rudnick (2001). Their result has been strengthened by J. Bourgain (2005) and subsequently by A. Ostafe, I. E. Shparlinski, and J. F. Voloch (2023). For arbitrary dd this has been studied by P. Kurlberg, A. Ostafe, Z. Rudnick and I. E. Shparlinski (2024). The corresponding equidistribution results, for certain eigenfunctions, share the same feature: they apply to almost all moduli NN and are unable to provide an explicit construction of such ``good'' values of NN. Here, using a bound of I. E. Shparlinski (1978) on exponential sums with linear recurrence sequences modulo a power of a fixed prime, we construct such an explicit sequence of NN, with a power saving on the discrepancy.

Keywords

Cite

@article{arxiv.2507.00325,
  title  = {On quantum ergodicity for higher dimensional cat maps modulo prime powers},
  author = {Subham Bhakta and Igor E. Shparlinski},
  journal= {arXiv preprint arXiv:2507.00325},
  year   = {2025}
}
R2 v1 2026-07-01T03:40:39.099Z