Non-Archimedean Welch Bounds and Non-Archimedean Zauner Conjecture

Abstract

Let K be a non-Archimedean (complete) valued field satisfying align* |Σj=1nλj2|=1≤ j ≤ n|λj|2, ∀ λj ∈ K, 1≤ j ≤ n, ∀ n ∈ N. align* For d∈ N, let Kd be the standard d-dimensional non-Archimedean Hilbert space. Let m ∈ N and Symm(Kd) be the non-Archimedean Hilbert space of symmetric m-tensors. We prove the following result. If \τj\j=1n is a collection in Kd satisfying τj, τj =1 for all 1≤ j ≤ n and the operator Symm(Kd) x Σj=1n x, τj m τj m ∈ Symm(Kd) is diagonalizable, then align (1) 1≤ j,k ≤ n, j ≠ k\|n|, | τj, τk|2m \≥ |n|2|d+m-1 m| . align We call Inequality (1) as the non-Archimedean version of Welch bounds obtained by Welch [IEEE Transactions on Information Theory, 1974]. We formulate non-Archimedean Zauner conjecture.