Title of article
Cardinality-restricted chains and antichains in partially ordered sets Original Research Article
Author/Authors
Henry Shum، نويسنده , , L.E. Trotter Jr، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1995
Pages
19
From page
421
To page
439
Abstract
For a given poset and positive integer κ, four problems are considered. Covering: Determine a minimum cardinality cover of the poset elements by chains (antichains), each of length (width) at most κ. Optimization: Given also weights on the poset elements, find a chain (antichain) of maximum total weight among those of length (width) at most κ. It is shown that the chain covering problem is NP-complete, while chain optimization is polynomial-time solvable. Several classes of facets are derived for the polytope generated by incidence vectors of antichains of width at most κ. Certain of these facets are then used to develop a polyhedral combinatorial algorithm for the antichain optimization problem. Computational results are given for the algorithm on randomly generated posets with up to 1005 elements and 4 ⩽ κ ⩽ 30.
Journal title
Discrete Applied Mathematics
Serial Year
1995
Journal title
Discrete Applied Mathematics
Record number
884357
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