fin de rédaction : 20-07-2007In this work, we study how to take into account, from the convex analysis and optimization viewpoint, constraint sets of the following type : sets of vectors whose components are autocorrelations lags of finite discrete signals. A set of vectors with autocorrelated components turns out to be a convex cone, for which we etablish many basic properties such as : smoothness or not of the boundary, structure of faces, acuteness, expression of the polar cone, evaluation of the normal cone at a point, etc. Next, we propose some algorithms to solve optimization problems where this type of constraint set appears ; in particular we consider the problem of projecting a point on the convex cone of vectors with autocorrelate...
A new optimization technique based on the projections onto convex space (POCS) framework for solving...
L'optimisation convexe a été un outil puissant pour concevoir des algorithmes. Dans la pratique est ...
Optimization is a scientific discipline that lies at the boundarybetween pure and applied mathematic...
fin de rédaction : 20-07-2007In this work, we study how to take into account, from the convex analys...
AbstractProgramming problems may be classified, on the basis of the objective function and types of ...
The authors analyze the sensitivity of optimal values and optimal sets of finite dimensional optimiz...
International audienceThere exist efficient algorithms to project a point onto the intersection of a...
Recently convex optimization models were successfully applied for solving various prob-lems in image...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
Convex conic programming is a general optimization model which includes linear, second-order-cone an...
In this paper, we present a novel technique for signal synthesis in the presence of an inconsistent ...
Programming problems may be classified, on the basis of the objective function and types of constrai...
This paper develops a general framework for solving a variety of convex cone problems that frequentl...
Ithis paper we present some gradient projection algorithms for solving optimizationproblem with conv...
A new signal processing framework based on the projections onto convex sets (POCS) is developed for ...
A new optimization technique based on the projections onto convex space (POCS) framework for solving...
L'optimisation convexe a été un outil puissant pour concevoir des algorithmes. Dans la pratique est ...
Optimization is a scientific discipline that lies at the boundarybetween pure and applied mathematic...
fin de rédaction : 20-07-2007In this work, we study how to take into account, from the convex analys...
AbstractProgramming problems may be classified, on the basis of the objective function and types of ...
The authors analyze the sensitivity of optimal values and optimal sets of finite dimensional optimiz...
International audienceThere exist efficient algorithms to project a point onto the intersection of a...
Recently convex optimization models were successfully applied for solving various prob-lems in image...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
Convex conic programming is a general optimization model which includes linear, second-order-cone an...
In this paper, we present a novel technique for signal synthesis in the presence of an inconsistent ...
Programming problems may be classified, on the basis of the objective function and types of constrai...
This paper develops a general framework for solving a variety of convex cone problems that frequentl...
Ithis paper we present some gradient projection algorithms for solving optimizationproblem with conv...
A new signal processing framework based on the projections onto convex sets (POCS) is developed for ...
A new optimization technique based on the projections onto convex space (POCS) framework for solving...
L'optimisation convexe a été un outil puissant pour concevoir des algorithmes. Dans la pratique est ...
Optimization is a scientific discipline that lies at the boundarybetween pure and applied mathematic...