The conditional quantum entropy is an entropy measure used in

quantum information theory Quantum information is the information of the state of a quantum system. It is the basic entity of study in quantum information theory, and can be manipulated using quantum information processing techniques. Quantum information refers to both ...

. It is a generalization of the

conditional entropy In information theory, the conditional entropy quantifies the amount of information needed to describe the outcome of a random variable Y given that the value of another random variable X is known. Here, information is measured in shannons, na ...

classical information theory Information theory is the scientific study of the quantification, storage, and communication of information. The field was originally established by the works of Harry Nyquist and Ralph Hartley, in the 1920s, and Claude Shannon in the 1940s. Th ...

. For a bipartite state

\rho^

, the conditional entropy is written

S(A, B)_\rho

, or

H(A, B)_\rho

, depending on the notation being used for the

von Neumann entropy In physics, the von Neumann entropy, named after John von Neumann, is an extension of the concept of Gibbs entropy from classical statistical mechanics to quantum statistical mechanics. For a quantum-mechanical system described by a density mat ...

. The quantum conditional entropy was defined in terms of a conditional density operator

\rho_

Nicolas Cerf Nicolas Jean Cerf (born 1965) is a Belgian physicist. He is professor of quantum mechanics and information theory at the Université Libre de Bruxelles and a member of the Royal Academies for Science and the Arts of Belgium. He received his Ph.D. ...

and Chris Adami, who showed that quantum conditional entropies can be negative, something that is forbidden in classical physics. The negativity of quantum conditional entropy is a sufficient criterion for quantum non-separability. In what follows, we use the notation

S(\cdot)

for the

, which will simply be called "entropy".

Definition

Given a bipartite quantum state

\rho^

, the entropy of the joint system AB is

S(AB)_\rho \ \stackrel\   S(\rho^)

, and the entropies of the subsystems are

S(A)_\rho \ \stackrel\   S(\rho^A) = S(\mathrm_B\rho^)

and

S(B)_\rho

. The von Neumann entropy measures an observer's uncertainty about the value of the state, that is, how much the state is a mixed state. By analogy with the classical conditional entropy, one defines the conditional quantum entropy as

S(A, B)_\rho \ \stackrel\  S(AB)_\rho - S(B)_\rho

. An equivalent operational definition of the quantum conditional entropy (as a measure of the

quantum communication Quantum information science is an interdisciplinary field that seeks to understand the analysis, processing, and transmission of information using quantum mechanics principles. It combines the study of Information science with quantum effects in p ...

cost or surplus when performing

quantum state In quantum physics, a quantum state is a mathematical entity that provides a probability distribution for the outcomes of each possible measurement on a system. Knowledge of the quantum state together with the rules for the system's evolution in ...

merging) was given by Michał Horodecki, Jonathan Oppenheim, and

Andreas Winter Andreas J. Winter (born 14 June 1971, Mühldorf, Germany) is a German mathematician and mathematical physicist at the Universitat Autònoma de Barcelona (UAB) in Spain. He received his Ph.D. in 1999 under Rudolf Ahlswede and Friedrich Götze a ...

Properties

Unlike the classical

, the conditional quantum entropy can be negative. This is true even though the (quantum) von Neumann entropy of single variable is never negative. The negative conditional entropy is also known as the

coherent information Coherent information is an entropy measure used in quantum information theory. It is a property of a quantum state ρ and a quantum channel \mathcal; intuitively, it attempts to describe how much of the quantum information in the state will remain ...

, and gives the additional number of bits above the classical limit that can be transmitted in a quantum dense coding protocol. Positive conditional entropy of a state thus means the state cannot reach even the classical limit, while the negative conditional entropy provides for additional information.

References

* *{{citation, first=Mark M., last=Wilde, arxiv=1106.1445, title=Quantum Information Theory, pages=xi-xii, year=2017, publisher=Cambridge University Press, bibcode = 2011arXiv1106.1445W , doi=10.1017/9781316809976.001, chapter=Preface to the Second Edition, isbn=9781316809976, s2cid=2515538 Quantum mechanical entropy