This thesis focuses on two central classes of problems in discrete optimization: matching and scheduling. Matching problems lie at the intersection of different areas of mathematics, computer science, and economics. In two-sided markets, Gale and Shapley's model has been widely used and generalized to assign, e.g., students to schools and interns to hospitals. The goal is to find a matching that respects a certain concept of fairness called stability. This model has been generalized in many ways. Relaxing the stability condition to popularity allows to overcome one of the main drawbacks of stable matchings: the fact that two individuals (a blocking pair) can prevent the matching from being much larger. The first part of this thesis is devot...
AbstractIn this paper we consider the problem of computing an “optimal” popular matching. We assume ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...
We study dynamic matching problems in graphs among agents with preferences. Agents and/or edges of t...
This thesis focuses on two central classes of problems in discrete optimization: matching and schedu...
This thesis studies two discrete optimization problems: ordering problems in optimal stopping theory...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
Matching problems involve a set of participants, where each participant has a capacity and a subset ...
Let G be a bipartite graph where every node has a strict ranking of its neighbors. For any node, its...
We consider a matching problem in a bipartite graph G = (A ? B, E) where vertices have strict prefer...
AbstractWe consider the problem of matching people to items, where each person ranks a subset of ite...
We consider a matching problem in a bipartite graph $G=(A\cup B,E)$ where nodes in $A$ are agents ha...
Contemporary research in building optimization models and designing algorithms has become more data-...
Our input is a bipartite graph G=(Acup B,E) where each vertex in Acup B has a preference list strict...
An instance of the popular matching problem (POP-M) consists of a set of applicants and a set of pos...
Resource allocation and subset selection are two relevant classes of problems in the core of combina...
AbstractIn this paper we consider the problem of computing an “optimal” popular matching. We assume ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...
We study dynamic matching problems in graphs among agents with preferences. Agents and/or edges of t...
This thesis focuses on two central classes of problems in discrete optimization: matching and schedu...
This thesis studies two discrete optimization problems: ordering problems in optimal stopping theory...
Matching under preferences involves matching agents to one another, subject to various optimality cr...
Matching problems involve a set of participants, where each participant has a capacity and a subset ...
Let G be a bipartite graph where every node has a strict ranking of its neighbors. For any node, its...
We consider a matching problem in a bipartite graph G = (A ? B, E) where vertices have strict prefer...
AbstractWe consider the problem of matching people to items, where each person ranks a subset of ite...
We consider a matching problem in a bipartite graph $G=(A\cup B,E)$ where nodes in $A$ are agents ha...
Contemporary research in building optimization models and designing algorithms has become more data-...
Our input is a bipartite graph G=(Acup B,E) where each vertex in Acup B has a preference list strict...
An instance of the popular matching problem (POP-M) consists of a set of applicants and a set of pos...
Resource allocation and subset selection are two relevant classes of problems in the core of combina...
AbstractIn this paper we consider the problem of computing an “optimal” popular matching. We assume ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, Operations Resea...
We study dynamic matching problems in graphs among agents with preferences. Agents and/or edges of t...