Qudits of composite dimension, mutually unbiased bases and projective ring geometry

Abstract

The d2 Pauli operators attached to a composite qudit in dimension d may be mapped to the vectors of the symplectic module Zd2 (Zd the modular ring). As a result, perpendicular vectors correspond to commuting operators, a free cyclic submodule to a maximal commuting set, and disjoint such sets to mutually unbiased bases. For dimensions d=6,~10,~15,~12, and 18, the fine structure and the incidence between maximal commuting sets is found to reproduce the projective line over the rings Z6, Z10, Z15, Z6 × F4 and Z6 × Z3, respectively.