Mathematical Model of Quantum Channel Capacity

TL;DR

This paper derives a closed-form expression for the capacity of a quantum channel considering Gaussian mixture noise models, providing bounds for entropy and mutual information to determine maximum data rates.

Contribution

It introduces a novel closed-form capacity expression for quantum channels with Gaussian mixture noise, extending previous models to both scalar and vector cases.

Findings

Closed-form capacity expression derived for quantum channels.

Bounds for entropy and mutual information established.

Capacity calculated for scalar and vector Gaussian mixture models.

Abstract

In this article, we are proposing a closed-form solution for the capacity of the single quantum channel. The Gaussian distributed input has been considered for the analytical calculation of the capacity. In our previous couple of papers, we invoked models for joint quantum noise and the corresponding received signals; in this current research, we proved that these models are Gaussian mixtures distributions. In this paper, we showed how to deal with both of cases, namely (I)the Gaussian mixtures distribution for scalar variables and (II) the Gaussian mixtures distribution for random vectors. Our target is to calculate the entropy of the joint noise and the entropy of the received signal in order to calculate the capacity expression of the quantum channel. The main challenge is to work with the function type of the Gaussian mixture distribution. The entropy of the Gaussian mixture distributions cannot be calculated in the closed-form solution due to the logarithm of a sum of exponential functions. As a solution, we proposed a lower bound and a upper bound for each of the entropies of joint noise and the received signal, and finally upper inequality and lower inequality lead to the upper bound for the mutual information and hence the maximum achievable data rate as the capacity. In this paper reader will able to visualize an closed-form capacity experssion which make this paper distinct from our previous works. These capacity experssion and coresses ponding bounds are calculated for both the cases: the Gaussian mixtures distribution for scalar variables and the Gaussian mixtures distribution for random vectors as well.