On the Capacity of Secure K-user Product Computation over a Quantum MAC

Abstract

Inspired by recent work by Christensen and Popovski on secure 2-user product computation for finite-fields of prime-order over a quantum multiple access channel, the generalization to K users and arbitrary finite fields is explored. Asymptotically optimal (capacity-achieving for large alphabet) schemes are proposed. Additionally, the capacity of modulo-d (d≥ 2) secure K-sum computation is shown to be 2/K computations/qudit, generalizing a result of Nishimura and Kawachi beyond binary, and improving upon it for odd K.