Recent research indicates that many convex optimization problems with random constraints exhibit a phase transition as the number of constraints increases. For example, this phenomenon emerges in the ℓ1 minimization method for identifying a sparse vector from random linear measurements. Indeed, the ℓ1 approach succeeds with high probability when the number of measurements exceeds a threshold that depends on the sparsity level; otherwise, it fails with high probability. This paper provides the first rigorous analysis that explains why phase transitions are ubiquitous in random convex optimization problems. It also describes tools for making reliable predictions about the quantitative aspects of the transition, including the location and the ...
We compute precise asymptotic expressions for the learning curves of least squares random feature (R...
Constraints satisfaction problem (CSP) is a family of computation problems that are generally hard t...
Random convex programs (RCPs) are convex optimization problems subject to a finite number of constra...
ABSTRACT. Recent empirical research indicates that many convex optimization problems with random con...
Recent research indicates that many convex optimization problems with random constraints exhibit a p...
Recent research indicates that many convex optimization problems with random constraints exhibit a ...
We derive bounds relating the statistical dimension of linear images of convex cones to Renegar's co...
Random convex programs (RCPs) are convex optimization problems subject to a finite number of constra...
With the advent of massive datasets, statistical learning and information processing techniques are ...
Our model is a generalized linear programming relaxation of a much studied random K-SAT problem. Spe...
In sparse signal recovery of compressive sensing, the phase transition determines the edge, which se...
Understanding the stochastic behavior of random projections of geometric sets constitutes a fundamen...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
For many random constraint satisfaction problems, by now there exist asymptotically tight estimates ...
Semidefinite relaxation methods transform a variety of non-convex optimization problems into convex ...
We compute precise asymptotic expressions for the learning curves of least squares random feature (R...
Constraints satisfaction problem (CSP) is a family of computation problems that are generally hard t...
Random convex programs (RCPs) are convex optimization problems subject to a finite number of constra...
ABSTRACT. Recent empirical research indicates that many convex optimization problems with random con...
Recent research indicates that many convex optimization problems with random constraints exhibit a p...
Recent research indicates that many convex optimization problems with random constraints exhibit a ...
We derive bounds relating the statistical dimension of linear images of convex cones to Renegar's co...
Random convex programs (RCPs) are convex optimization problems subject to a finite number of constra...
With the advent of massive datasets, statistical learning and information processing techniques are ...
Our model is a generalized linear programming relaxation of a much studied random K-SAT problem. Spe...
In sparse signal recovery of compressive sensing, the phase transition determines the edge, which se...
Understanding the stochastic behavior of random projections of geometric sets constitutes a fundamen...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
For many random constraint satisfaction problems, by now there exist asymptotically tight estimates ...
Semidefinite relaxation methods transform a variety of non-convex optimization problems into convex ...
We compute precise asymptotic expressions for the learning curves of least squares random feature (R...
Constraints satisfaction problem (CSP) is a family of computation problems that are generally hard t...
Random convex programs (RCPs) are convex optimization problems subject to a finite number of constra...