On quantum information

TL;DR

This paper generalizes the concept of quantum measurement entropy for infinite-dimensional Hilbert spaces, deriving a form of the generalized information measure under certain continuity assumptions.

Contribution

It introduces a generalized quantum information measure for infinite-dimensional spaces and characterizes its form based on continuity properties.

Findings

Derived a general form of the quantum information measure.

Extended entropy concepts to infinite-dimensional quantum systems.

Provided conditions under which the generalized information is uniquely determined.

Abstract

We investigate the following generalisation of the entropy of quantum measurement. Let H be an infinite-dimensional separable Hilbert space with a 'density' operator {\rho}, tr {\rho}=1. Let I(P)\in R be defined for any partition P = (P_1,...,P_m), P_1+ ... +P_m=1_H, P_i \in proj H$ and let I(P_i Qj, i \leq m, j \leq n) = I(P) + I(Q) for Q =(Q_1,..., Q_n), \sum Q_j = 1_H and P_iQ_j = Q_j P_i, tr {\rho} P_iQ_j = tr {\rho} P_i tr {\rho} Q_j (P, Q are physically independent). Assuming some continuity properties we give a general form of generalised information I.