The quantum relative entropy is well known to obey a monotonicity property (i.e., it does not increase under the action of a quantum channel). Here we present several refinements of this entropy inequality, some of which have a physical interpretation in terms of recovery from the action of the channel. The recovery channel given here is explicit and universal, depending only on the channel and one of the arguments to the relative entropy
Integral representations of quantum relative entropy, and of the directional second and higher order...
Historically at the core of thermodynamics and information theory, entropy's use in quantum informat...
We provide a versatile upper bound on the number of maximally entangled qubits, or private bits, sha...
The fact that the quantum relative entropy is non-increasing with respect to quantum physical evolut...
The relative entropy is a principal measure of distinguishability in quantum information theory, wit...
The quantum relative entropy between two states satisfies a monotonicity property meaning that apply...
There are several inequalities in physics which limit how well we can process physical systems to ac...
Recently, there has been focus on determining the conditions under which the data processing inequal...
The optimized quantum f -divergences form a family of distinguishability measures that includes the ...
Recently, there has been focus on determining the conditions under which the data processing inequal...
© 1963-2012 IEEE. The quantum relative entropy between two states satisfies a monotonicity property ...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
A short quantum Markov chain is a tripartite state ρABC such that system A can be recovered perfectl...
The von Neumann entropy of a quantum state is a central concept in physics and information theory, h...
Several information measures have recently been defined that capture the notion of recoverability. I...
Integral representations of quantum relative entropy, and of the directional second and higher order...
Historically at the core of thermodynamics and information theory, entropy's use in quantum informat...
We provide a versatile upper bound on the number of maximally entangled qubits, or private bits, sha...
The fact that the quantum relative entropy is non-increasing with respect to quantum physical evolut...
The relative entropy is a principal measure of distinguishability in quantum information theory, wit...
The quantum relative entropy between two states satisfies a monotonicity property meaning that apply...
There are several inequalities in physics which limit how well we can process physical systems to ac...
Recently, there has been focus on determining the conditions under which the data processing inequal...
The optimized quantum f -divergences form a family of distinguishability measures that includes the ...
Recently, there has been focus on determining the conditions under which the data processing inequal...
© 1963-2012 IEEE. The quantum relative entropy between two states satisfies a monotonicity property ...
Distance measures between quantum states like the trace distance and the fidelity can naturally be d...
A short quantum Markov chain is a tripartite state ρABC such that system A can be recovered perfectl...
The von Neumann entropy of a quantum state is a central concept in physics and information theory, h...
Several information measures have recently been defined that capture the notion of recoverability. I...
Integral representations of quantum relative entropy, and of the directional second and higher order...
Historically at the core of thermodynamics and information theory, entropy's use in quantum informat...
We provide a versatile upper bound on the number of maximally entangled qubits, or private bits, sha...