Add to ORKGOne of the main concepts in quantum physics is a density matrix, which is a symmetric positive definite matrix of trace one. Finite probability distributions can be seen as a special case when the density matrix is restricted to be diagonal. We develop a probability calculus based on these more general distributions that includes definitions of joints, conditionals and formulas that relate these, including analogs of the Theorem of Total Probability and various Bayes rules for the calculation of posterior density matrices. The resulting calculus parallels the familiar “conventional” probability calculus and always retains the latter as a special case when all matrices are diagonal. We motivate both the conventional and the generalized Bayes...
The need to estimate smooth probability distributions (a.k.a. probability densities) from finite sam...
AbstractA general real matrix-variate probability model is introduced here, which covers almost all ...
Kolmogorov’s axioms of probability theory are extended to conditional probabilities among distinct (...
Recently the quantum Bayesian prediction problem was formulated by Tanaka and Komaki (2005). It is s...
The Maximum Entropy ($\textit{MaxEnt}$) method is a relatively new technique especially suitable for...
We find that the standard relative entropy and the Umegaki entropy are designed for the purpose of i...
This paper presents a new method for calculating the conditional probability of any multi-valued pre...
We discuss different formal frameworks for the description of generalized probabilities in statistic...
Abstract Using random matrix techniques and the theory of Matrix Product States we show that reduced...
Abstract It is well known that density matrices can be used in quantum mechanics to represent the in...
In this paper we present two flavors of a quantum extension to the lambda calculus. The first one, λ...
We introduce a graphical framework for Bayesian inference that is sufficiently general to accommodat...
From the basics to the forefront of modern research, this book presents all aspects of probability t...
We give a new characterization of relative entropy, also known as the Kullback-Leibler divergence. W...
Quantum mechanics is basically a mathematical recipe on how to construct physical models. Historical...
The need to estimate smooth probability distributions (a.k.a. probability densities) from finite sam...
AbstractA general real matrix-variate probability model is introduced here, which covers almost all ...
Kolmogorov’s axioms of probability theory are extended to conditional probabilities among distinct (...
Recently the quantum Bayesian prediction problem was formulated by Tanaka and Komaki (2005). It is s...
The Maximum Entropy ($\textit{MaxEnt}$) method is a relatively new technique especially suitable for...
We find that the standard relative entropy and the Umegaki entropy are designed for the purpose of i...
This paper presents a new method for calculating the conditional probability of any multi-valued pre...
We discuss different formal frameworks for the description of generalized probabilities in statistic...
Abstract Using random matrix techniques and the theory of Matrix Product States we show that reduced...
Abstract It is well known that density matrices can be used in quantum mechanics to represent the in...
In this paper we present two flavors of a quantum extension to the lambda calculus. The first one, λ...
We introduce a graphical framework for Bayesian inference that is sufficiently general to accommodat...
From the basics to the forefront of modern research, this book presents all aspects of probability t...
We give a new characterization of relative entropy, also known as the Kullback-Leibler divergence. W...
Quantum mechanics is basically a mathematical recipe on how to construct physical models. Historical...
The need to estimate smooth probability distributions (a.k.a. probability densities) from finite sam...
AbstractA general real matrix-variate probability model is introduced here, which covers almost all ...
Kolmogorov’s axioms of probability theory are extended to conditional probabilities among distinct (...