Mathematical comparison of classical and quantum mechanisms in optimization under local differential privacy

Abstract

Let >0. An n-tuple (pi)i=1n of probability vectors is called -differentially private (-DP) if e pj-pi has no negative entries for all i,j=1,…,n. An n-tuple (i)i=1n of density matrices is called classical-quantum -differentially private (CQ -DP) if ej-i is positive semi-definite for all i,j=1,…,n. Denote by Cn() the set of all -DP n-tuples, and by CQn() the set of all CQ -DP n-tuples. By considering optimization problems under local differential privacy, we define the subset ECn() of CQn() that is essentially classical. Roughly speaking, an element in ECn() is the image of (pi)i=1n∈Cn() by a completely positive and trace-preserving linear map (CPTP map). In a preceding study, it is known that EC2()=CQ2(). In this paper, we show that ECn()=CQn() for every n3, and estimate the difference between ECn() and CQn() in a certain manner.