Generalization of Dilworth's Theorem on Minimal Chain Decomposition

The decomposition of a finite partially ordered set of elements as a union of chains was considered by Dilworth [2]. Dantzig and Hoffman [1] formulated this problem as a linear programming problem and obtained Dilworth's theorem from duality theory. For some practical applications and for a method to obtain a minimal decomposition see Ford and Fulkerson [3]. In this paper we generalize this problem to the case when the set is not necessarily partially ordered and obtain a method of finding a minimal chain decomposition of the set.

MoreLess

Year of publication:	1970
Authors:	Raghavachari, M. ; Mote, V. L.
Published in:	Management Science. - Institute for Operations Research and the Management Sciences - INFORMS, ISSN 0025-1909. - Vol. 16.1970, 7, p. 508-511
Publisher:	Institute for Operations Research and the Management Sciences - INFORMS

More details

Extent:	application/pdf
Type of publication:	Article
Other identifiers:	10.1287/mnsc.16.7.508 [DOI]
Source:	RePEc - Research Papers in Economics

Persistent link: https://www.econbiz.de/10009190232