摘要
Consider the problem of partitioning n nonnegative numbers into p parts, where part i can be assigned ni numbers with ni lying in a given range. The goal is to maximize a Schur convex function F whose i th argument is the sum of numbers assigned to part i. The shape of a partition is the vector consisting of the sizes of its parts, further, a shape (without referring to a particular partition) is a vector of nonnegative integers (n 1,..., np) which sum to n. A partition is called size-consecutive if there is a ranking of the parts which is consistent with their sizes, and all elements in a higher-ranked part exceed all elements in the lower-ranked part. We demonstrate that one can restrict attention to size-consecutive partitions with shapes that are nonmajorized, we study these shapes, bound their numbers and develop algorithms to enumerate them. Our study extends the analysis of a previous paper by Hwang and Rothblum which discussed the above problem assuming the existence of a majorizing shape.
原文 | 英語 |
---|---|
頁(從 - 到) | 321-339 |
頁數 | 19 |
期刊 | Journal of Combinatorial Optimization |
卷 | 11 |
發行號 | 3 |
DOIs | |
出版狀態 | 已發佈 - 2006 5月 |
對外發佈 | 是 |
ASJC Scopus subject areas
- 電腦科學應用
- 離散數學和組合
- 控制和優化
- 計算機理論與數學
- 應用數學