We give a converging semidefinite programming hierarchy of outer approximations for the set of quantum correlations of fixed dimension and derive analytical bounds on the convergence speed of the hierarchy. In particular, we give a semidefinite program of size $\exp(\mathcal{O}\big(T^{12}(\log^2(AT)+\log(Q)\log(AT))/\epsilon^2\big))$ to compute additive $\epsilon$-approximations on the values of two-player free games with $T\times T$-dimensional quantum assistance, where $A$ and $Q$ denote the numbers of answers and questions of the game, respectively. For fixed dimension $T$, this scales polynomially in $Q$ and quasi-polynomially in $A$, thereby improving on previously known approximation algorithms for which worst-case run-time guarantees...
We show how a vector-valued version of Schechtmans empirical method can be used to reduce the number...
One of the most confounding open problems in quantum computing is whether we can approximate the qua...
This paper considers the decidability of fully quantum nonlocal games with noisy maximally entangled...
International audienceWe give a converging semidefinite programming hierarchy of outer approximation...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We describe a simple method to derive high performance semidefinite programing relaxations for optim...
We study the problem of approximating the commuting-operator value of a two-player non-local game. I...
We establish the first hardness results for the problem of computing the value of one-round games pl...
In this paper we study optimization problems related to bipartite quantum correlations using techniq...
We introduce quantum XOR games, a model of two-player one-round games that extends the model of XOR ...
We study and extend the semidefinite programming (SDP) hierarchies introduced in Navascués and Vérte...
We establish the first hardness results for the problem of computing the value of one-round games pl...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We show that the value of a general two-prover quantum game cannot be computed by a semidefinite pro...
This thesis contributes to the study of parallel repetition theorems and concentration bounds for no...
We show how a vector-valued version of Schechtmans empirical method can be used to reduce the number...
One of the most confounding open problems in quantum computing is whether we can approximate the qua...
This paper considers the decidability of fully quantum nonlocal games with noisy maximally entangled...
International audienceWe give a converging semidefinite programming hierarchy of outer approximation...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We describe a simple method to derive high performance semidefinite programing relaxations for optim...
We study the problem of approximating the commuting-operator value of a two-player non-local game. I...
We establish the first hardness results for the problem of computing the value of one-round games pl...
In this paper we study optimization problems related to bipartite quantum correlations using techniq...
We introduce quantum XOR games, a model of two-player one-round games that extends the model of XOR ...
We study and extend the semidefinite programming (SDP) hierarchies introduced in Navascués and Vérte...
We establish the first hardness results for the problem of computing the value of one-round games pl...
Quantum de Finetti theorems are a useful tool in the study of correlations in quantum multipartite s...
We show that the value of a general two-prover quantum game cannot be computed by a semidefinite pro...
This thesis contributes to the study of parallel repetition theorems and concentration bounds for no...
We show how a vector-valued version of Schechtmans empirical method can be used to reduce the number...
One of the most confounding open problems in quantum computing is whether we can approximate the qua...
This paper considers the decidability of fully quantum nonlocal games with noisy maximally entangled...