We introduce concurrent quantum non-local games, quantum output mirror games and concurrent classical-to-quantum non-local games, as quantum versions of synchronous non-local games, and provide tracial characterisations of their perfect strategies belonging to various correlation classes. We define *-algebras and C*-algebras of concurrent classical-to-quantum and concurrent quantum non-local games, and algebraic versions of the orthogonal rank of a graph. We show that quantum homomorphisms of quantum graphs can be viewed as entanglement assisted classical homomorphisms of the graphs, and give descriptions of the perfect quantum commuting and the perfect approximately quantum strategies for the quantum graph homomorphism game. We specialise ...
We use the example of playing a 2-player game with entangled quan-tum objects to investigate the eff...
We study the classical and quantum values of one- and two-party linear games, an important class of ...
Homomorphisms between relational structures play a central role in finite model theory, constraint s...
We introduce concurrent quantum non-local games, quantum output mirror games and concurrent classica...
Using the simulation paradigm in information theory, we define notions of quantum hypergraph homomor...
We introduce and examine three subclasses of the family of quantum no-signalling (QNS) correlations ...
We describe the main classes of non-signalling bipartite correlations in terms of states on operator...
We introduce quantum homomorphisms between quantum hypergraphs through the existence of perfect stra...
\u3cp\u3eGame theory is a well established branch of mathematics whose formalism has a vast range of...
Quantum graph theory, also known as non-commutative graph theory, is an operator space generalizatio...
Quantum entanglement, and the resulting peculiar non-classical correlations are one of the most coun...
We describe the main classes of non-signalling bipartite correlations in terms of states on operator...
Abstract We study bipartite games that arise in the context of nonlocality with the help of graph th...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
A quantum algorithm for an oracle problem can be understood as a quantum strategy for a player in a ...
We use the example of playing a 2-player game with entangled quan-tum objects to investigate the eff...
We study the classical and quantum values of one- and two-party linear games, an important class of ...
Homomorphisms between relational structures play a central role in finite model theory, constraint s...
We introduce concurrent quantum non-local games, quantum output mirror games and concurrent classica...
Using the simulation paradigm in information theory, we define notions of quantum hypergraph homomor...
We introduce and examine three subclasses of the family of quantum no-signalling (QNS) correlations ...
We describe the main classes of non-signalling bipartite correlations in terms of states on operator...
We introduce quantum homomorphisms between quantum hypergraphs through the existence of perfect stra...
\u3cp\u3eGame theory is a well established branch of mathematics whose formalism has a vast range of...
Quantum graph theory, also known as non-commutative graph theory, is an operator space generalizatio...
Quantum entanglement, and the resulting peculiar non-classical correlations are one of the most coun...
We describe the main classes of non-signalling bipartite correlations in terms of states on operator...
Abstract We study bipartite games that arise in the context of nonlocality with the help of graph th...
Thesis (S.M.)--Massachusetts Institute of Technology, Dept. of Electrical Engineering and Computer S...
A quantum algorithm for an oracle problem can be understood as a quantum strategy for a player in a ...
We use the example of playing a 2-player game with entangled quan-tum objects to investigate the eff...
We study the classical and quantum values of one- and two-party linear games, an important class of ...
Homomorphisms between relational structures play a central role in finite model theory, constraint s...