Add to ORKGWe study deviations by a group of agents in the three main types of matching markets: the house allocation, the marriage, and the roommates models. For a given instance, we call a matching $k$-stable if no other matching exists that is more beneficial to at least $k$ out of the $n$ agents. The concept generalizes the recently studied majority stability. We prove that whereas the verification of $k$-stability for a given matching is polynomial-time solvable in all three models, the complexity of deciding whether a $k$-stable matching exists depends on $\frac{k}{n}$ and is characteristic to each model.Comment: SAGT 202
Stable matching is a widely studied problem in social choice theory. For the basiccentralized case, ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
This thesis is a study of a number of matching problems that seek to match together pairs or groups ...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
When computing stable matchings, it is usually assumed that the preferences of the agents in the mat...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
When computing stable matchings, it is usually assumed that the preferences of the agents in the mat...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
The classic Stable Roommates problem (the non-bipartite generalization of the well-known Stable Marr...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
The Stable Marriage Problem (SMP) is concerned with the follow scenario: suppose we have two disjoin...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
Stable matching is a widely studied problem in social choice theory. For the basiccentralized case, ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
This thesis is a study of a number of matching problems that seek to match together pairs or groups ...
We study deviations by a group of agents in the three main types of matching markets: the house allo...
When computing stable matchings, it is usually assumed that the preferences of the agents in the mat...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
When computing stable matchings, it is usually assumed that the preferences of the agents in the mat...
In the Stable Marriage problem, when the preference lists are complete, all agents of the smaller si...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
Many important stable matching problems are known to be NP-hard, even when strong restrictions are p...
The classic Stable Roommates problem (the non-bipartite generalization of the well-known Stable Marr...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
The Stable Marriage Problem (SMP) is concerned with the follow scenario: suppose we have two disjoin...
Given an instance I of the classical Stable Marriage problem with Incomplete preference lists (smi),...
Stable matching is a widely studied problem in social choice theory. For the basiccentralized case, ...
The Stable Marriage Problem and its many variants have been widely studied in the literature (Gusfie...
This thesis is a study of a number of matching problems that seek to match together pairs or groups ...