AbstractThe Reformulation-Linearization Technique (RLT) provides a hierarchy of relaxations spanning the spectrum from the continuous relaxation to the convex hull representation for linear 0-1 mixed-integer and general mixed-discrete programs. We show in this paper that this result holds identically for semi-infinite programs of this type. As a consequence, we extend the RLT methodology to describe a construct for generating a hierarchy of relaxations leading to the convex hull representation for bounded 0-1 mixed-integer and general mixed-discrete convex programs, using an equivalent semi-infinite linearized representation for such problems as an intermediate stepping stone in the analysis. For particular use in practice, we provide speci...
In this paper we consider a semi-infinite relaxation of mixed integer linear programs. We show that ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
The Perspective Reformulation (PR) of a Mixed-Integer NonLinear Program with semi-continuous variabl...
AbstractIn this paper, we consider the reformulation-linearization technique (RLT) of Sherali and Ad...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
AbstractWe present a linearization strategy for mixed 0-1 quadratic programs that produces small for...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
AbstractIn this paper we introduce DRL*, a new hierarchy of linear relaxations for 0–1 mixed integer...
Reduced RLT constraints are a special class of Reformulation- Linearization Technique (RLT) constrai...
<p>In this work, we propose an algorithmic approach to improve mixed-integer models that are origina...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
This research effort focuses on the acquisition of polyhedral outer-approximations to the convex hul...
International audienceAn extension of the reduced Reformulation-Linearization Technique constraints ...
The Reformulation-Linearization Technique (RLT), due to Sherali and Adams, can be used to construct ...
This paper introduces constructing convex-relaxed programs for nonconvex optimization problems. Bran...
In this paper we consider a semi-infinite relaxation of mixed integer linear programs. We show that ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
The Perspective Reformulation (PR) of a Mixed-Integer NonLinear Program with semi-continuous variabl...
AbstractIn this paper, we consider the reformulation-linearization technique (RLT) of Sherali and Ad...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
AbstractWe present a linearization strategy for mixed 0-1 quadratic programs that produces small for...
Many combinatorial optimization problems can be formulated as the minimization of a 0?1 quadratic fu...
AbstractIn this paper we introduce DRL*, a new hierarchy of linear relaxations for 0–1 mixed integer...
Reduced RLT constraints are a special class of Reformulation- Linearization Technique (RLT) constrai...
<p>In this work, we propose an algorithmic approach to improve mixed-integer models that are origina...
Abstract. Many combinatorial optimization problems can be formulated as the minimization of a 0-1 qu...
This research effort focuses on the acquisition of polyhedral outer-approximations to the convex hul...
International audienceAn extension of the reduced Reformulation-Linearization Technique constraints ...
The Reformulation-Linearization Technique (RLT), due to Sherali and Adams, can be used to construct ...
This paper introduces constructing convex-relaxed programs for nonconvex optimization problems. Bran...
In this paper we consider a semi-infinite relaxation of mixed integer linear programs. We show that ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
The Perspective Reformulation (PR) of a Mixed-Integer NonLinear Program with semi-continuous variabl...