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Main Authors: Gao, Yuan, Jin, Xi, Khanna, Manshu
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2511.20077
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author Gao, Yuan
Jin, Xi
Khanna, Manshu
author_facet Gao, Yuan
Jin, Xi
Khanna, Manshu
contents We study allocation problems with reserve systems under minimum beneficiary-share guarantees, requirements that targeted matches constitute at least a specified percentage of total matches. While such mandates promote targeted matches, they inherently conflict with maximizing total matches. We characterize the complete non-domination frontier using minimal cycles, where each point represents an allocation that cannot increase targeted matches without sacrificing total matches. Our main results: (i) the frontier exhibits concave structure with monotonically decreasing slope, (ii) traversing from maximum targeted matches to maximum total matches reduces matches by at most half, (iii) the Repeated Hungarian Algorithm computes all frontier points in polynomial time, and (iv) mechanisms with beneficiary-share guarantees can respect category-dependent priority orderings but necessarily violate path-independence. These results enable rigorous evaluation of beneficiary-share policies across diverse allocation contexts.
format Preprint
id arxiv_https___arxiv_org_abs_2511_20077
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Reserve System with Beneficiary-Share Guarantee
Gao, Yuan
Jin, Xi
Khanna, Manshu
Theoretical Economics
We study allocation problems with reserve systems under minimum beneficiary-share guarantees, requirements that targeted matches constitute at least a specified percentage of total matches. While such mandates promote targeted matches, they inherently conflict with maximizing total matches. We characterize the complete non-domination frontier using minimal cycles, where each point represents an allocation that cannot increase targeted matches without sacrificing total matches. Our main results: (i) the frontier exhibits concave structure with monotonically decreasing slope, (ii) traversing from maximum targeted matches to maximum total matches reduces matches by at most half, (iii) the Repeated Hungarian Algorithm computes all frontier points in polynomial time, and (iv) mechanisms with beneficiary-share guarantees can respect category-dependent priority orderings but necessarily violate path-independence. These results enable rigorous evaluation of beneficiary-share policies across diverse allocation contexts.
title Reserve System with Beneficiary-Share Guarantee
topic Theoretical Economics
url https://arxiv.org/abs/2511.20077