International audienceThis paper presents a projection-based approach for solving conic feasibility problems. To find a point in the intersection of a cone and an affine subspace, we simply project a point onto this intersection. This projection is computed by dual algorithms operating a sequence of projections onto the cone, and generalizing the alternating pro jection method. We release an easy-to-use Matlab package implementing an elementary dual projection algorithm. Numerical experiments show that, for solving some semidefinite feasibility problems, the package is competitive with sophisticated conic programming software. We also provide a particular treatment of semidefinite feasibility problems modeling polynomial sum-of-squares decomposi...
The objective of this paper is to design an efficient and convergent ADMM (alternating direction met...
Abstract. We model a problem motivated by road design as a feasibility problem. Projections onto the...
We propose a new iterative approach for solving linear programs over convex cones. Assuming that Sla...
International audienceThis paper presents a projection-based approach for solving conic feasibility ...
International audienceThere exist efficient algorithms to project a point onto the intersection of a...
Convex conic programming is a general optimization model which includes linear, second-order-cone an...
The convex feasibility problem asks to find a point in the intersection of finitely many closed conv...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
Abstract. The convex feasibility problem asks to find a point in the intersection of finitely many c...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
We consider Dykstra’s alternating projection method when it is used to find the projection onto poly...
This paper develops a new variant of the classical alternating projection method for solving convex ...
The feasible set in a conic program is the intersection of a convex cone with an affine space. In th...
In this paper, under a suitable regularity condition, we establish a broad class of conic convex pol...
The objective of this paper is to design an efficient and convergent ADMM (alternating direction met...
Abstract. We model a problem motivated by road design as a feasibility problem. Projections onto the...
We propose a new iterative approach for solving linear programs over convex cones. Assuming that Sla...
International audienceThis paper presents a projection-based approach for solving conic feasibility ...
International audienceThere exist efficient algorithms to project a point onto the intersection of a...
Convex conic programming is a general optimization model which includes linear, second-order-cone an...
The convex feasibility problem asks to find a point in the intersection of finitely many closed conv...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
Abstract. The convex feasibility problem asks to find a point in the intersection of finitely many c...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
Abstract. The split feasibility problem has many applications in various fields of science and techn...
We consider Dykstra’s alternating projection method when it is used to find the projection onto poly...
This paper develops a new variant of the classical alternating projection method for solving convex ...
The feasible set in a conic program is the intersection of a convex cone with an affine space. In th...
In this paper, under a suitable regularity condition, we establish a broad class of conic convex pol...
The objective of this paper is to design an efficient and convergent ADMM (alternating direction met...
Abstract. We model a problem motivated by road design as a feasibility problem. Projections onto the...
We propose a new iterative approach for solving linear programs over convex cones. Assuming that Sla...