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Main Authors: Li, Jingwei, Robertazzi, Thomas G.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.03495
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author Li, Jingwei
Robertazzi, Thomas G.
author_facet Li, Jingwei
Robertazzi, Thomas G.
contents This paper explores the distribution of indistinguishable balls into distinct urns with varying capacity constraints, a foundational issue in combinatorial mathematics with applications across various disciplines. We present a comprehensive theoretical framework that addresses both upper and lower capacity constraints under different distribution conditions, elaborating on the combinatorial implications of such variations. Through rigorous analysis, we derive analytical solutions that cater to different constrained environments, providing a robust theoretical basis for future empirical and theoretical investigations. These solutions are pivotal for advancing research in fields that rely on precise distribution strategies, such as physics and parallel processing. The paper not only generalizes classical distribution problems but also introduces novel methodologies for tackling capacity variations, thereby broadening the utility and applicability of distribution theory in practical and theoretical contexts.
format Preprint
id arxiv_https___arxiv_org_abs_2502_03495
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Capacity Constraints in Ball and Urn Distribution Problems
Li, Jingwei
Robertazzi, Thomas G.
Probability
Methodology
05A15(Primary), 60C05(Secondary)
This paper explores the distribution of indistinguishable balls into distinct urns with varying capacity constraints, a foundational issue in combinatorial mathematics with applications across various disciplines. We present a comprehensive theoretical framework that addresses both upper and lower capacity constraints under different distribution conditions, elaborating on the combinatorial implications of such variations. Through rigorous analysis, we derive analytical solutions that cater to different constrained environments, providing a robust theoretical basis for future empirical and theoretical investigations. These solutions are pivotal for advancing research in fields that rely on precise distribution strategies, such as physics and parallel processing. The paper not only generalizes classical distribution problems but also introduces novel methodologies for tackling capacity variations, thereby broadening the utility and applicability of distribution theory in practical and theoretical contexts.
title Capacity Constraints in Ball and Urn Distribution Problems
topic Probability
Methodology
05A15(Primary), 60C05(Secondary)
url https://arxiv.org/abs/2502.03495