Add to ORKGAbstract—The focus of this paper is on the set intersection problem for closed convex sets admitting projection operation in a closed form. The objective is to investigate algorithms that would converge (in some sense) if and only if the problem has a solution. To do so, we view the set intersection problem as a stochastic optimization problem of minimizing the “average” residual error of the set collection. We consider a stochastic gradient method as a main tool for investigating the properties of the stochastic optimization problem. We show that the stochastic optimization problem has a solution if and only if the stochastic gradient method is convergent almost surely. We then consider a special case of the method, namely the random proje...
Random projections can reduce the dimensionality of point sets while keeping approximate congruence....
In this paper we consider a projection method for convex feasibility problem that is known to conver...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
The first focus of this thesis is to solve a stochastic convex minimization problem over an arbitrar...
We consider convex optimization problems with structures that are suitable for sequential treatment ...
With the advent of massive datasets, statistical learning and information processing techniques are ...
In a stochastic convex feasibility problem connected with a complete probability space (Omega, A, mu...
Convergence of a projected stochastic gradient algorithm is demonstrated for convex objective functi...
The problem of finding the convex hull of the intersection points of random lines was studied in Dev...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
Abstract. We propose a randomized method for general convex optimization problems; namely, the minim...
International audienceWe consider the problem of minimizing a convex function over the intersection ...
We consider maximising a concave function over a convex set by a simple randomised algorithm. The st...
The connection between the conditioning of a problem instance -- the sensitivity of a problem instan...
We consider maximising a concave function over a convex set by a simple randomised algorithm. The st...
Random projections can reduce the dimensionality of point sets while keeping approximate congruence....
In this paper we consider a projection method for convex feasibility problem that is known to conver...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...
The first focus of this thesis is to solve a stochastic convex minimization problem over an arbitrar...
We consider convex optimization problems with structures that are suitable for sequential treatment ...
With the advent of massive datasets, statistical learning and information processing techniques are ...
In a stochastic convex feasibility problem connected with a complete probability space (Omega, A, mu...
Convergence of a projected stochastic gradient algorithm is demonstrated for convex objective functi...
The problem of finding the convex hull of the intersection points of random lines was studied in Dev...
AbstractA unified framework is presented for studying the convergence of projection methods for find...
Abstract. We propose a randomized method for general convex optimization problems; namely, the minim...
International audienceWe consider the problem of minimizing a convex function over the intersection ...
We consider maximising a concave function over a convex set by a simple randomised algorithm. The st...
The connection between the conditioning of a problem instance -- the sensitivity of a problem instan...
We consider maximising a concave function over a convex set by a simple randomised algorithm. The st...
Random projections can reduce the dimensionality of point sets while keeping approximate congruence....
In this paper we consider a projection method for convex feasibility problem that is known to conver...
AbstractThe cyclic projections algorithm is an important method for determining a point in the inter...