Assignment games with population monotonic allocation schemes

Assignment games with population monotonic allocation schemes

We characterize the assignment games which admit a population monotonic allocation scheme (PMAS) in terms of efficiently verifiable structural properties of the nonnegative matrix that induces the game. We prove that an assignment game is PMAS-admissible if and only if the positive elements of the u...

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Veröffentlicht in:Social choice and welfare 2024-02, Vol.62 (1), p.67-88
1. Verfasser: Solymosi, Tamás
Format: Artikel
Sprache:eng
Schlagworte:
Allocation
Allokation
Assignment
Decision making
Economic Theory/Quantitative Economics/Mathematical Methods
Economics
Economics and Finance
Game Theory
Games
International Political Economy
Kooperatives Spiel
Original Paper
Population-based studies
Property
Public Finance
Social and Behav. Sciences
Social Policy
Social services
Spieltheorie
Vetoes
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Beschreibung
Zusammenfassung:We characterize the assignment games which admit a population monotonic allocation scheme (PMAS) in terms of efficiently verifiable structural properties of the nonnegative matrix that induces the game. We prove that an assignment game is PMAS-admissible if and only if the positive elements of the underlying nonnegative matrix form orthogonal submatrices of three special types. In game theoretic terms it means that an assignment game is PMAS-admissible if and only if it contains either a veto player or a dominant veto mixed pair, or the game is a composition of these two types of special assignment games. We also show that in PMAS-admissible assignment games all core allocations can be extended to a PMAS, and the nucleolus coincides with the tau-value.
ISSN:0176-1714
1432-217X
DOI:10.1007/s00355-023-01477-z