Enregistré dans:
Détails bibliographiques
Auteur principal: Karzanov, Alexander V.
Format: Preprint
Publié: 2026
Sujets:
Accès en ligne:https://arxiv.org/abs/2603.24433
Tags: Ajouter un tag
Pas de tags, Soyez le premier à ajouter un tag!
_version_ 1866912982221455360
author Karzanov, Alexander V.
author_facet Karzanov, Alexander V.
contents We consider a far generalization of the well-known stable roommates and non-bipartite stable allocation problems. In its setting, one is given a finite non-bipartite graph $G=(V,E)$ with nonnegative integer edge capacities $b(e)\in{\mathbb Z}_+$, $e\in E$, in which for each vertex (``agent'') $v\in V$, the preferences on the set $E_v$ of its incident edges are given via a choice function $C_v$ acting on the vectors in ${\mathbb Z}_+^{E_v}$ bounded by the capacities and obeying the standard axioms of substitutability and size monotonicity. We refer to the related stability problem as the stable partnership problem with integer choice functions, or SPPIC for short. Extending well-known results for particular cases, we give a solvability criterion for SPPIC and develop an algorithm of finding a stable solution, called a stable partnership, or establishing that there is none. Moreover, in general the algorithm constructs a pair $(x,{\cal K})$ such that $x\in {\mathbb Z}_+^E$ and ${\cal K}$ is a set of pairwise edge-disjoint odd cycles in $G$ satisfying the following properties: if ${\cal K}=\emptyset$, then $x$ is a stable partnership, whereas if ${\cal K}$ is nonempty, then a stable partnership does not exist, and in this case, the set ${\cal K}$ is determined canonically. Our constructions essentially use earlier author's results on the corresponding bipartite counterpart of SPPIC. Keywords: stable marriage problem, stable roommates problem, stable partition, stable allocation, choice function
format Preprint
id arxiv_https___arxiv_org_abs_2603_24433
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On a stable partnership problem with integer choice functions
Karzanov, Alexander V.
Combinatorics
91C02, 91C78
We consider a far generalization of the well-known stable roommates and non-bipartite stable allocation problems. In its setting, one is given a finite non-bipartite graph $G=(V,E)$ with nonnegative integer edge capacities $b(e)\in{\mathbb Z}_+$, $e\in E$, in which for each vertex (``agent'') $v\in V$, the preferences on the set $E_v$ of its incident edges are given via a choice function $C_v$ acting on the vectors in ${\mathbb Z}_+^{E_v}$ bounded by the capacities and obeying the standard axioms of substitutability and size monotonicity. We refer to the related stability problem as the stable partnership problem with integer choice functions, or SPPIC for short. Extending well-known results for particular cases, we give a solvability criterion for SPPIC and develop an algorithm of finding a stable solution, called a stable partnership, or establishing that there is none. Moreover, in general the algorithm constructs a pair $(x,{\cal K})$ such that $x\in {\mathbb Z}_+^E$ and ${\cal K}$ is a set of pairwise edge-disjoint odd cycles in $G$ satisfying the following properties: if ${\cal K}=\emptyset$, then $x$ is a stable partnership, whereas if ${\cal K}$ is nonempty, then a stable partnership does not exist, and in this case, the set ${\cal K}$ is determined canonically. Our constructions essentially use earlier author's results on the corresponding bipartite counterpart of SPPIC. Keywords: stable marriage problem, stable roommates problem, stable partition, stable allocation, choice function
title On a stable partnership problem with integer choice functions
topic Combinatorics
91C02, 91C78
url https://arxiv.org/abs/2603.24433