An extended formulation for the 1‐wheel inequalities of the stable set polytope
Networks. Bd. 75. H. 1. Wiley 2019 S. 86 - 94
Erscheinungsjahr: 2019
Publikationstyp: Zeitschriftenaufsatz
Sprache: Englisch
Doi/URN: 10.1002/net.21906
Inhaltszusammenfassung
The 1-wheel inequalities for the stable set polytope were introduced by Cheng and Cunningham. In general, there is an exponential number of these inequalities. We present a new polynomial size extended formulation of the stable set relaxation that includes the odd cycle and 1-wheel inequalities. This compact formulation allows one to polynomially optimize over a polyhedron instead of handling the separation problem for 1-wheel inequalities by solving many shortest walk problems and relying on...The 1-wheel inequalities for the stable set polytope were introduced by Cheng and Cunningham. In general, there is an exponential number of these inequalities. We present a new polynomial size extended formulation of the stable set relaxation that includes the odd cycle and 1-wheel inequalities. This compact formulation allows one to polynomially optimize over a polyhedron instead of handling the separation problem for 1-wheel inequalities by solving many shortest walk problems and relying on the ellipsoid method.» weiterlesen» einklappen
Autoren
Klassifikation
DFG Fachgebiet:
Mathematik
DDC Sachgruppe:
Mathematik
