Add to ORKGA classical simulation scheme of quantum computation given a restricted set of states and measurements may be---occasionally, but only occasionally---interpreted naturally as a statistical simulation of positive quasi-probability distributions on a phase space. In this dissertation, we explore phase space representations for finite-dimensional quantum systems and their negativities beyond the usual analogues of the Wigner function. The first line of study focuses on a characterization tool for valid quasi-probability distributions of (possibly mixed) quantum states. A quantum generalization of Bochner\u27s theorem from classical probability theory simultaneously characterizes both the set of valid Wigner functions and the subset of positive...
Wigner’s 1932 quasi-probability Distribution Function in phase-space, his first paper in English, is...
The representation of quantum states via phase-space functions constitutes an intuitive technique to...
We introduce the number-conserving quantum phase space description as a versatile tool to address fu...
© 2015 IOP Publishing Ltd. Bochner's theorem gives the necessary and sufficient conditions on a func...
This paper comprises a review of both the quasi-probability representations of infinite-dimensional ...
In this work, the version of Wigner transforms and Wigner functions on discrete systems are formulat...
Abstract: In the present report we discuss measures of classicality/quantumness of states of finite-...
In recent years, an approach to discrete quantum phase spaces which comprehends all the main quasipr...
It is shown that, to any quasiprobability distribution corresponding to a given density operator, on...
We introduce quantum states associated with single phase space points in the Wigner formalism for fi...
We demonstrate that the Wigner function of a pure quantum state is a wave function in a specially tu...
This book covers the theory and applications of the Wigner phase space distribution function and its...
In contrast to a widespread belief, Wigner's theorem allows the construction of true joint probabili...
We discuss measures of classicality/quantumness of states of finite-dimensional quantum systems, whi...
An important problem in quantum computation is to characterize the resources required for a computat...
Wigner’s 1932 quasi-probability Distribution Function in phase-space, his first paper in English, is...
The representation of quantum states via phase-space functions constitutes an intuitive technique to...
We introduce the number-conserving quantum phase space description as a versatile tool to address fu...
© 2015 IOP Publishing Ltd. Bochner's theorem gives the necessary and sufficient conditions on a func...
This paper comprises a review of both the quasi-probability representations of infinite-dimensional ...
In this work, the version of Wigner transforms and Wigner functions on discrete systems are formulat...
Abstract: In the present report we discuss measures of classicality/quantumness of states of finite-...
In recent years, an approach to discrete quantum phase spaces which comprehends all the main quasipr...
It is shown that, to any quasiprobability distribution corresponding to a given density operator, on...
We introduce quantum states associated with single phase space points in the Wigner formalism for fi...
We demonstrate that the Wigner function of a pure quantum state is a wave function in a specially tu...
This book covers the theory and applications of the Wigner phase space distribution function and its...
In contrast to a widespread belief, Wigner's theorem allows the construction of true joint probabili...
We discuss measures of classicality/quantumness of states of finite-dimensional quantum systems, whi...
An important problem in quantum computation is to characterize the resources required for a computat...
Wigner’s 1932 quasi-probability Distribution Function in phase-space, his first paper in English, is...
The representation of quantum states via phase-space functions constitutes an intuitive technique to...
We introduce the number-conserving quantum phase space description as a versatile tool to address fu...