This book is devoted to aspects of the foundations of quantum mechanics in which probabilistic and statistical concepts play an essential role. The main part of the book concerns the quantitative statistical theory of quantum measurement, based on the notion of positive operator-valued measures. During the past years there has been substantial progress in this direction, stimulated to a great extent by new applications such as Quantum Optics, Quantum Communication and high-precision experiments. The questions of statistical interpretation, quantum symmetries, theory of canonical commutation r
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
The present wave of interest in quantum foundations is caused by the tremendous development of quant...
Composed of contributions from leading experts in quantum foundations, this volume presents viewpoin...
Quantum mechanics is basically a mathematical recipe on how to construct physical models. Historical...
Interest in problems of statistical inference connected to measurements of quantum systems has recen...
Based on lectures given by the author, this book focuses on providing reliable introductory explanat...
The topic of the present inquiry is the foundation of the statistical interpretation of quantum mech...
QuantumMechanics can be viewed as a linear dynamical theory having a familiar mathematical framework...
The aim of the paper is to derive essential elements of quantum mechanics from a parametric structur...
Quantum probability is a subtle blend of quantum mechanics and classical probability theory. Its imp...
Foundational issues in statistical mechanics and the more general question of how probability is to ...
The paper starts with an introduction to the basic mathematical model of classical probability (CP),...
Recent developments in the mathematical foundations of quantum mechanics have brought the theory clo...
Chapter 1: On the existence of quantum representations for two dichotomic measurements. Under which ...
The classical probability theory initiated by Kolmogorov and its quantum counterpart, pioneered by v...
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
The present wave of interest in quantum foundations is caused by the tremendous development of quant...
Composed of contributions from leading experts in quantum foundations, this volume presents viewpoin...
Quantum mechanics is basically a mathematical recipe on how to construct physical models. Historical...
Interest in problems of statistical inference connected to measurements of quantum systems has recen...
Based on lectures given by the author, this book focuses on providing reliable introductory explanat...
The topic of the present inquiry is the foundation of the statistical interpretation of quantum mech...
QuantumMechanics can be viewed as a linear dynamical theory having a familiar mathematical framework...
The aim of the paper is to derive essential elements of quantum mechanics from a parametric structur...
Quantum probability is a subtle blend of quantum mechanics and classical probability theory. Its imp...
Foundational issues in statistical mechanics and the more general question of how probability is to ...
The paper starts with an introduction to the basic mathematical model of classical probability (CP),...
Recent developments in the mathematical foundations of quantum mechanics have brought the theory clo...
Chapter 1: On the existence of quantum representations for two dichotomic measurements. Under which ...
The classical probability theory initiated by Kolmogorov and its quantum counterpart, pioneered by v...
Statistical Physics examines the collective properties of large ensembles of particles, and is a pow...
The present wave of interest in quantum foundations is caused by the tremendous development of quant...
Composed of contributions from leading experts in quantum foundations, this volume presents viewpoin...