TY - GEN
T1 - Parameterized Algorithms for Optimal Refugee Resettlement
AU - Chen, Jiehua
AU - Schlotter, Ildikó
AU - Simola, Sofia
N1 - Publisher Copyright:
© 2024 The Authors.
PY - 2024/10/16
Y1 - 2024/10/16
N2 - We study variants of the Optimal Refugee Resettlement problem where a set F of refugee families need to be allocated to a set P of possible places of resettlement in a feasible and optimal way. Feasibility issues emerge from the assumption that each family requires certain services (such as accommodation, school seats, or medical assistance), while there is an upper and, possibly, a lower quota on the number of service units provided at a given place. Besides studying the problem of finding a feasible assignment, we also investigate two natural optimization variants. In the first one, we allow families to express preferences over P, and we aim for a Pareto-optimal assignment. In a more general setting, families can attribute utilities to each place in P, and the task is to find a feasible assignment with maximum total utilities. We study the computational complexity of all three variants in a multivariate fashion using the framework of parameterized complexity. We provide fixed-parameter algorithms for a handful of natural parameterizations, and complement these tractable cases with tight intractability results.
AB - We study variants of the Optimal Refugee Resettlement problem where a set F of refugee families need to be allocated to a set P of possible places of resettlement in a feasible and optimal way. Feasibility issues emerge from the assumption that each family requires certain services (such as accommodation, school seats, or medical assistance), while there is an upper and, possibly, a lower quota on the number of service units provided at a given place. Besides studying the problem of finding a feasible assignment, we also investigate two natural optimization variants. In the first one, we allow families to express preferences over P, and we aim for a Pareto-optimal assignment. In a more general setting, families can attribute utilities to each place in P, and the task is to find a feasible assignment with maximum total utilities. We study the computational complexity of all three variants in a multivariate fashion using the framework of parameterized complexity. We provide fixed-parameter algorithms for a handful of natural parameterizations, and complement these tractable cases with tight intractability results.
UR - http://www.scopus.com/inward/record.url?scp=85216679617&partnerID=8YFLogxK
U2 - 10.3233/FAIA240892
DO - 10.3233/FAIA240892
M3 - Conference contribution
AN - SCOPUS:85216679617
T3 - Frontiers in Artificial Intelligence and Applications
SP - 3413
EP - 3420
BT - ECAI 2024 - 27th European Conference on Artificial Intelligence, Including 13th Conference on Prestigious Applications of Intelligent Systems, PAIS 2024, Proceedings
A2 - Endriss, Ulle
A2 - Melo, Francisco S.
A2 - Bach, Kerstin
A2 - Bugarin-Diz, Alberto
A2 - Alonso-Moral, Jose M.
A2 - Barro, Senen
A2 - Heintz, Fredrik
PB - IOS Press BV
T2 - 27th European Conference on Artificial Intelligence, ECAI 2024
Y2 - 19 October 2024 through 24 October 2024
ER -
