Mixed integer programming (MIP) is commonly used to model indicator constraints, i.e., constraints that either hold or are relaxed depending on the value of a binary variable. Unfortunately, those models tend to lead to weak continuous relaxations and turn out to be unsolvable in practice; this is what happens, for e.g., in the case of Classification problems with Ramp Loss functions that represent an important application in this context. In this paper we show the computational evidence that a relevant class of these Classification instances can be solved far more efficiently if a nonlinear, nonconvex reformulation of the indicator constraints is used instead of the linear one. Inspired by this empirical and surprising observation, we show...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
A new method of sensitivity analysis for mixed integer/linear programming (MILP) is derived from the...
Many decision problems in industry, logistics, and telecommunications can be viewed as satisfiabilit...
Mixed integer programming (MIP) is commonly used to model indicator constraints, i.e., constraints t...
Mixed-integer programs (MIPs) involving logical implications modeled through big-M coefficients are ...
<p>Mixed-integer programming (MIP) is often a practitioner’s primary approach when tackling hard dis...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
We propose an exact penalty approach for solving mixed integer nonlinear programming (MINLP) problem...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
In response to the needs of researchers for access to challenging mixed integer programs, Bixby et a...
Many optimisation problems contain substructures involving constraints on sequences of decision vari...
Abstract. Many optimization problems involve integer and continuous variables that can be modeled as...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
A new method of sensitivity analysis for mixed integer/linear programming (MILP) is derived from the...
Many decision problems in industry, logistics, and telecommunications can be viewed as satisfiabilit...
Mixed integer programming (MIP) is commonly used to model indicator constraints, i.e., constraints t...
Mixed-integer programs (MIPs) involving logical implications modeled through big-M coefficients are ...
<p>Mixed-integer programming (MIP) is often a practitioner’s primary approach when tackling hard dis...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
We propose an exact penalty approach for solving mixed integer nonlinear programming (MINLP) problem...
A recent development in the field of discrete optimization is the combined use of (binary) decision ...
Thesis: Ph. D., Massachusetts Institute of Technology, Sloan School of Management, Operations Resear...
In response to the needs of researchers for access to challenging mixed integer programs, Bixby et a...
Many optimisation problems contain substructures involving constraints on sequences of decision vari...
Abstract. Many optimization problems involve integer and continuous variables that can be modeled as...
Disjunctive cuts for Mixed-Integer Linear Programs (MIPs) were introduced by Egon Balas in the late ...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
A separation heuristic for mixed integer programs is presented that theoretically allows one to deri...
A new method of sensitivity analysis for mixed integer/linear programming (MILP) is derived from the...
Many decision problems in industry, logistics, and telecommunications can be viewed as satisfiabilit...