The integration of discrete choice models in Mixed Integer Linear Programming (MILP) models provides a better understanding of customers' preferences to operators while planning for their systems. However, the formulations associated with the choice models are highly nonlinear and non convex. In order to overcome this limitation, we propose a linear formulation of a general discrete choice model that can be embedded in any MILP model by relying on simulation. We characterize a demand-based benefit maximization problem to illustrate the use of this approach. Despite the clear advantages of this integration, the size of the resulting formulation is high, which makes it computationally expensive. We consider Lagrangian relaxation to decompose ...
Given a discrete maximization problem with a linear objective function where the coefficients are ch...
In this paper, we propose a flexible class of discrete choice models. These models are flexible in t...
Lagrangian relaxation is commonly used in combinatorial optimization to generate lower bounds for a ...
The integration of discrete choice models in Mixed Integer Linear Programming (MILP) models provides...
The integration of discrete choice models in Mixed Integer Linear Programming (MILP) models provides...
The integration of discrete choice models in mixed integer linear programming (MILP) is appealing to...
The integration of discrete choice models in optimization is appealing to operators and policy maker...
The objective of this thesis is to develop a general methodology to incorporate a disaggregate deman...
Choice-based optimization problems are the family of optimization problems that incorporate the stoc...
Discrete choice models are the state-of-the-art for the mathematical modeling of demand. Based on th...
The choice network revenue management (RM) model incorporates customer purchase behavior as customer...
Discrete-choice network revenue management (DC-NRM) captures both customer behaviorand the resource-...
We propose a methodological framework to include a wide variety of discrete choice models in (mixed)...
We study a generic minimization problem with separable non-convex piecewise linear costs, showing th...
Mixed-Integer Linear Programming (MILP) plays an important role across a range of scientific discipl...
Given a discrete maximization problem with a linear objective function where the coefficients are ch...
In this paper, we propose a flexible class of discrete choice models. These models are flexible in t...
Lagrangian relaxation is commonly used in combinatorial optimization to generate lower bounds for a ...
The integration of discrete choice models in Mixed Integer Linear Programming (MILP) models provides...
The integration of discrete choice models in Mixed Integer Linear Programming (MILP) models provides...
The integration of discrete choice models in mixed integer linear programming (MILP) is appealing to...
The integration of discrete choice models in optimization is appealing to operators and policy maker...
The objective of this thesis is to develop a general methodology to incorporate a disaggregate deman...
Choice-based optimization problems are the family of optimization problems that incorporate the stoc...
Discrete choice models are the state-of-the-art for the mathematical modeling of demand. Based on th...
The choice network revenue management (RM) model incorporates customer purchase behavior as customer...
Discrete-choice network revenue management (DC-NRM) captures both customer behaviorand the resource-...
We propose a methodological framework to include a wide variety of discrete choice models in (mixed)...
We study a generic minimization problem with separable non-convex piecewise linear costs, showing th...
Mixed-Integer Linear Programming (MILP) plays an important role across a range of scientific discipl...
Given a discrete maximization problem with a linear objective function where the coefficients are ch...
In this paper, we propose a flexible class of discrete choice models. These models are flexible in t...
Lagrangian relaxation is commonly used in combinatorial optimization to generate lower bounds for a ...