On the secrecy gain of -modular lattices

Abstract

We show that for every >1, there is a counterexample to the -modular secrecy function conjecture by Oggier, Sol\'e and Belfiore. These counterexamples all satisfy the modified conjecture by Ernvall-Hyt\"onen and Sethuraman. Furthermore, we provide a method to prove or disprove the modified conjecture for any given -modular lattice rationally equivalent to a suitable amount of copies of Z \,Z with ∈ \3,5,7,11,23\. We also provide a variant of the method for strongly -modular lattices when ∈ \6,14,15\.