Add to ORKGThe classical Grothendieck inequality has applications to the design of approximation algorithms for NP-hard optimization problems. We show that an algorithmic interpretation may also be given for a noncommutative generalization of the Grothendieck inequality due to Pisier and Haagerup. Our main result, an efficient rounding procedure for this inequality, leads to a constant-factor polynomial time approximation algorithm for an optimization problem which generalizes the Cut Norm problem of Frieze and Kannan, and is shown here to have additional applications to robust principle component analysis and the orthogonal Procrustes problem
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
The little Grothendieck problem consists of maximizing ∑[subscript ij]C[subscript ij]x[subscript i]...
Abstract. We survey connections of the Grothendieck inequality and its variants to com-binatorial op...
The classical Grothendieck inequality has applications to the design of approximation algorithms for...
The classical Grothendieck inequality has applications to the design of approximation algorithms for...
Abstract: The classical Grothendieck inequality has applications to the design of ap-proximation alg...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
Grothendieck inequalities are fundamental inequalities which are frequently used in many areas of ma...
textabstractWe prove that for any $\varepsilon > 0$ it is NP-hard to approximate the non-commutativ...
textabstractWe prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendiec...
We prove that for any $\varepsilon > 0$ it is NP-hard to approximate the non-commutative Grothendie...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
The little Grothendieck problem consists of maximizing ∑[subscript ij]C[subscript ij]x[subscript i]...
Abstract. We survey connections of the Grothendieck inequality and its variants to com-binatorial op...
The classical Grothendieck inequality has applications to the design of approximation algorithms for...
The classical Grothendieck inequality has applications to the design of approximation algorithms for...
Abstract: The classical Grothendieck inequality has applications to the design of ap-proximation alg...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
Grothendieck inequalities are fundamental inequalities which are frequently used in many areas of ma...
textabstractWe prove that for any $\varepsilon > 0$ it is NP-hard to approximate the non-commutativ...
textabstractWe prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendiec...
We prove that for any $\varepsilon > 0$ it is NP-hard to approximate the non-commutative Grothendie...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
Neste trabalho, objetivamos apresentar o Teorema de Alon e Naor, o qual afirma que existe um algorit...
We prove that for any ε > 0 it is NP-hard to approximate the non-commutative Grothendieck problem t...
The little Grothendieck problem consists of maximizing ∑[subscript ij]C[subscript ij]x[subscript i]...
Abstract. We survey connections of the Grothendieck inequality and its variants to com-binatorial op...