A continuous version of De Finetti's theorem is proved in which the role of the homogeneous product states is played by the independent increment stationary processes on the real line. The proof is based on a conditional, finite De Finetti's theorem (i.e., a result involving only a finite number of random variables and exchangeable conditional expectations rather than exchangeable probabilities). Our technique of proof improves and simplifies a result of Freedman and includes a generalization of the quantum De Finetti's theorem as well as some more recent variants of it. The last section of the paper is an attempt to answer a question of Diaconis and Freedman
In its most basic form, the finite quantum de Finetti theorem states that the reduced k-partite dens...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We prove a uniformly computable version of de Finetti’s theorem on exchangeable sequences of real ra...
A continuous version of De Finetti's theorem is proved in which the role of the homogeneous product ...
Abstract. This paper gives a simpler proof of theorems characterizing mixtures of processes with sta...
The quantum versions of de Finetti’s theorem derived so far express the convergence of n-partite sym...
The extended de Finetti theorem characterizes exchangeable infinite sequences of random variables as...
AbstractThe extended de Finetti theorem characterizes exchangeable infinite sequences of random vari...
A finite form of de Finetti’s representation theorem is established using elementary information-the...
For the quantum stochastic processes generated by the Boolean commutation relations, we prove the fo...
AbstractWe prove a computable version of the de Finetti theorem on exchangeable sequences of real ra...
The symmetric states on a quasi local C*-algebra on the infinite set of indices J are those invarian...
We work in a general framework where the state of a physical system is defined by its behavior under...
We showthat the classical de Finetti theorem has a canonical noncommutative counterpart if we streng...
AbstractThis paper reviews de Finetti’s pioneering contributions to the theory of stochastic process...
In its most basic form, the finite quantum de Finetti theorem states that the reduced k-partite dens...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We prove a uniformly computable version of de Finetti’s theorem on exchangeable sequences of real ra...
A continuous version of De Finetti's theorem is proved in which the role of the homogeneous product ...
Abstract. This paper gives a simpler proof of theorems characterizing mixtures of processes with sta...
The quantum versions of de Finetti’s theorem derived so far express the convergence of n-partite sym...
The extended de Finetti theorem characterizes exchangeable infinite sequences of random variables as...
AbstractThe extended de Finetti theorem characterizes exchangeable infinite sequences of random vari...
A finite form of de Finetti’s representation theorem is established using elementary information-the...
For the quantum stochastic processes generated by the Boolean commutation relations, we prove the fo...
AbstractWe prove a computable version of the de Finetti theorem on exchangeable sequences of real ra...
The symmetric states on a quasi local C*-algebra on the infinite set of indices J are those invarian...
We work in a general framework where the state of a physical system is defined by its behavior under...
We showthat the classical de Finetti theorem has a canonical noncommutative counterpart if we streng...
AbstractThis paper reviews de Finetti’s pioneering contributions to the theory of stochastic process...
In its most basic form, the finite quantum de Finetti theorem states that the reduced k-partite dens...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We prove a uniformly computable version of de Finetti’s theorem on exchangeable sequences of real ra...