Add to ORKG© 2017 IEEE. We propose a novel approach to solving the problem which is referred to as the polyhedral projection problem (PPP) and serves to find a projection of a point onto a polyhedron given by the linear inequality constraints. The basic idea of this approach is to utilize a reduction of the PPP to the problem of projecting the origin of Euclidean space onto the Minkowski difference of the considered polyhedron and point. We make use our previous results related to the concept of the Minkowski difference for the above-mentioned objects. The proposed approach is new (relative to the traditional ones) thanks to further reducing the PPP to the problem of projecting the origin onto the convex hull of some vectors corresponding to the gradi...
In this paper we consider a problem, called convex projection, of projecting a convex set onto a su...
International audiencePolyhedral projection is a main operation of the polyhedron abstract domain.It...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
© 2017 IEEE. We propose a novel approach to solving the problem which is referred to as the polyhedr...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
This paper is aimed at presenting a systematic expositionof the existing now dierent formulations fo...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
We consider the problem of projecting a point in a polyhedral set onto the boundary of the set using...
This note brings together two fundamental topics: polyhedral projection and parametric linear progra...
International audiencePolyhedral projection is a main operation of the polyhedron abstract domain.It...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
We discuss the problem of projecting points on their convex hull. Points in the interior of the conv...
Abstract. The intrinsic cost of polyhedra has lead to research on more tractable sub-classes of line...
International audiencePolyhedra are used in verification and automatic parallelization to capture li...
The abstract domain of polyhedra lies at the heart of many program analysis techniques. However, its...
In this paper we consider a problem, called convex projection, of projecting a convex set onto a su...
International audiencePolyhedral projection is a main operation of the polyhedron abstract domain.It...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...
© 2017 IEEE. We propose a novel approach to solving the problem which is referred to as the polyhedr...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
This paper is aimed at presenting a systematic expositionof the existing now dierent formulations fo...
© 2018, Pleiades Publishing, Ltd. This paper is aimed at presenting a systematic exposition of the e...
We consider the problem of projecting a point in a polyhedral set onto the boundary of the set using...
This note brings together two fundamental topics: polyhedral projection and parametric linear progra...
International audiencePolyhedral projection is a main operation of the polyhedron abstract domain.It...
Consider a polyhedral convex cone which is given by a finite number of linear inequal-ities. We inve...
We discuss the problem of projecting points on their convex hull. Points in the interior of the conv...
Abstract. The intrinsic cost of polyhedra has lead to research on more tractable sub-classes of line...
International audiencePolyhedra are used in verification and automatic parallelization to capture li...
The abstract domain of polyhedra lies at the heart of many program analysis techniques. However, its...
In this paper we consider a problem, called convex projection, of projecting a convex set onto a su...
International audiencePolyhedral projection is a main operation of the polyhedron abstract domain.It...
A system of linear inequality and equality constraints determines a convex polyhedral set of feasibl...