Matroid embedding

In combinatorics, a matroid embedding is a set system (F, E), where F is a collection of feasible sets, that satisfies the following properties:

  1. (Accessibility Property) Every non-empty feasible set X contains an element x such that X\{x} is feasible;
  2. (Extensibility Property) For every feasible subset X of a basis (i.e., maximal feasible set) B, some element in B but not in X belongs to the extension ext(X) of X, where ext(X) is the set of all elements e not in X such that X∪{e} is feasible;
  3. (Closure-Congruence Property) For every superset A of a feasible set X disjoint from ext(X), A∪{e} is contained in some feasible set for either all or no e in ext(X);
  4. The collection of all subsets of feasible sets forms a matroid.

Matroid embedding was introduced by Helman, Moret & Shapiro (1993) to characterize problems that can be optimized by a greedy algorithm.

References

  • Helman, Paul; Moret, Bernard M. E.; Shapiro, Henry D. (1993), "An exact characterization of greedy structures", SIAM Journal on Discrete Mathematics, 6 (2): 274–283, CiteSeerX 10.1.1.37.1825, doi:10.1137/0406021, MR 1215233
This article is issued from Wikipedia. The text is licensed under Creative Commons - Attribution - Sharealike. Additional terms may apply for the media files.