International audienceWe consider the problem of minimizing a convex function over the intersection of finitely many simple sets which are easy to project onto. This is an important problem arising in various domains such as machine learning. The main difficulty lies in finding the projection of a point in the intersection of many sets. Existing approaches yield an infeasible point with an iteration-complexity of $O(1/\varepsilon^2)$ for nonsmooth problems with no guarantees on the in-feasibility. By reformulating the problem through exact penalty functions, we derive first-order algorithms which not only guarantees that the distance to the intersection is small but also improve the complexity to $O(1/\varepsilon)$ and $O(1/\sqrt{\varepsilo...
We consider a smooth penalty algorithm to solve nonconvex optimization problem based on a family of ...
We present necessary and sufficient optimality conditions for the minimization of pseudoconvex funct...
International audienceWe consider a minimization linear program over a polytope P described by prohi...
<p>The rapid growth in data availability has led to modern large scale convex optimization problems ...
Abstract—The focus of this paper is on the set intersection problem for closed convex sets admitting...
Abstract. The intersection graph of a set of geometric objects is defined as a £¥¤§¦©¨����� � graph ...
Abstract: Suppose that we have several polytopes in Rd and we can translate them without rotation. H...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
Given two compact convex sets P and Q in the plane, we compute an image of P under a rigid motion th...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
In this paper we present a new iterative projection method for finding the closest point in the inte...
This paper considers a special but broad class of convex programing (CP) problems whose feasible reg...
Given two compact convex sets P and Q in the plane, we compute an image of P under a rigid motion th...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
We consider a smooth penalty algorithm to solve nonconvex optimization problem based on a family of ...
We present necessary and sufficient optimality conditions for the minimization of pseudoconvex funct...
International audienceWe consider a minimization linear program over a polytope P described by prohi...
<p>The rapid growth in data availability has led to modern large scale convex optimization problems ...
Abstract—The focus of this paper is on the set intersection problem for closed convex sets admitting...
Abstract. The intersection graph of a set of geometric objects is defined as a £¥¤§¦©¨����� � graph ...
Abstract: Suppose that we have several polytopes in Rd and we can translate them without rotation. H...
summary:The method of projections onto convex sets to find a point in the intersection of a finite n...
In this paper we consider a projection method for convex feasibility problem that is known to conver...
Given two compact convex sets P and Q in the plane, we compute an image of P under a rigid motion th...
Thesis (Ph.D.)--University of Washington, 2017Convex optimization is more popular than ever, with ex...
In this paper we present a new iterative projection method for finding the closest point in the inte...
This paper considers a special but broad class of convex programing (CP) problems whose feasible reg...
Given two compact convex sets P and Q in the plane, we compute an image of P under a rigid motion th...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
We consider a smooth penalty algorithm to solve nonconvex optimization problem based on a family of ...
We present necessary and sufficient optimality conditions for the minimization of pseudoconvex funct...
International audienceWe consider a minimization linear program over a polytope P described by prohi...