Bowen Zhou, Bing Xiang, et al.
SSST 2008
We study the Boolean Quadric Forest Polytope, namely, the convex hull of the "extended" edge incidence-vectors of forests of a complete graph - extended by the usual linearization of the quadratic terms. Our motivation is to provide a mathematical foundation for attacking the minimum quadratic-cost forest problem via branch-and-cut methods of integer programming. We determine several families of facets of the Boolean Quadric Forest Polytope and relate them to the Boolean Quadric Polytope as well as the Forest Polytope. We give polynomial-time separation procedures for some of the families of facets.
Bowen Zhou, Bing Xiang, et al.
SSST 2008
G. Ramalingam
Theoretical Computer Science
Rolf Clauberg
IBM J. Res. Dev
Hang-Yip Liu, Steffen Schulze, et al.
Proceedings of SPIE - The International Society for Optical Engineering