Title of article
Combinatorial flexibility problems and their computational complexity
Author/Authors
Aguilera، نويسنده , , Néstor E. and Leoni، نويسنده , , Valeria A. and Nasini، نويسنده , , Graciela L.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
6
From page
303
To page
308
Abstract
The concept of flexibility—originated in the context of heat exchanger networks—is associated with a substructure which guarantees the performance of the original structure, in a given range of possible states. We extend this concept to combinatorial optimization problems, and prove several computational complexity results in this new framework.
some monotonicity conditions, we prove that a combinatorial optimization problem polynomially transforms to its associated flexibility problem, but that the converse need not be true.
er to obtain polynomial flexibility problems, we have to restrict ourselves to combinatorial optimization problems on matroids. We also prove that, when relaxing in different ways the matroid structure, the flexibility problems become NP-complete. This fact is shown by proving the NP-completeness of the flexibility problems associated with the Shortest Path, Minimum Cut and Weighted Matching problems.
Keywords
computational complexity , Combinatorial problems , Flexibility
Journal title
Electronic Notes in Discrete Mathematics
Serial Year
2008
Journal title
Electronic Notes in Discrete Mathematics
Record number
1454881
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