We have observed an interesting, yet unexplained, phenomenon: Semidefinite programming (SDP) based relaxations of maximum likelihood estimators (MLE) tend to be tight in recovery problems with noisy data, even when MLE cannot exactly recover the ground truth. Several results establish tightness of SDP based relaxations in the regime where exact recovery from MLE is possible. However, to the best of our knowledge, their tightness is not understood beyond this regime. As an illustrative example, we focus on the generalized Procrustes problem
As a widely used tool in tackling general quadratic optimization problems, semidefinite relaxation (...
Abstract—The binary symmetric stochastic block model deals with a random graph of n vertices partiti...
Semidefinite programming (SDP) is currently one of the most active areas of research in optimization...
We have observed an interesting, yet unexplained, phenomenon: Semidefinite programming (SDP) based r...
Many maximum likelihood estimation problems are, in general, intractable optimization problems. As a...
Recently, Linear Programming (LP)-based relaxations have been shown promising in boosting the perfor...
In this paper, we consider the max-cut problem as studied by Goemans and Williamson [8]. Since the p...
In this paper we summarize recent results on finding tight semidefinite programming relaxations for ...
In this paper, we consider a class of quadratic maximization problems. One important instance in tha...
Abstract We consider a parametric family of quadratically constrained quadratic progr...
International audienceContinuous relaxations are central to map inference in discrete Markov random ...
... systems, Maximum-Likelihood (ML) decoding is equivalent to finding the closest lattice point in ...
In this paper we study two strengthened semidefinite programming relaxations for the Max-Cut problem...
The problem of obtaining the maximum a posteriori estimate of a general discrete random field (i.e. ...
In recent years, the semidefinite relaxation (SDR) technique has been at the center of some of very ...
As a widely used tool in tackling general quadratic optimization problems, semidefinite relaxation (...
Abstract—The binary symmetric stochastic block model deals with a random graph of n vertices partiti...
Semidefinite programming (SDP) is currently one of the most active areas of research in optimization...
We have observed an interesting, yet unexplained, phenomenon: Semidefinite programming (SDP) based r...
Many maximum likelihood estimation problems are, in general, intractable optimization problems. As a...
Recently, Linear Programming (LP)-based relaxations have been shown promising in boosting the perfor...
In this paper, we consider the max-cut problem as studied by Goemans and Williamson [8]. Since the p...
In this paper we summarize recent results on finding tight semidefinite programming relaxations for ...
In this paper, we consider a class of quadratic maximization problems. One important instance in tha...
Abstract We consider a parametric family of quadratically constrained quadratic progr...
International audienceContinuous relaxations are central to map inference in discrete Markov random ...
... systems, Maximum-Likelihood (ML) decoding is equivalent to finding the closest lattice point in ...
In this paper we study two strengthened semidefinite programming relaxations for the Max-Cut problem...
The problem of obtaining the maximum a posteriori estimate of a general discrete random field (i.e. ...
In recent years, the semidefinite relaxation (SDR) technique has been at the center of some of very ...
As a widely used tool in tackling general quadratic optimization problems, semidefinite relaxation (...
Abstract—The binary symmetric stochastic block model deals with a random graph of n vertices partiti...
Semidefinite programming (SDP) is currently one of the most active areas of research in optimization...