Pages that link to "Item:Q5470766"

The following pages link to A Convex Quadratic Characterization of the Lovász Theta Number (Q5470766):

Displaying 20 items.

• Improving an upper bound on the size of \(k\)-regular induced subgraphs (Q411262) (← links)
• An axiomatic duality framework for the theta body and related convex corners (Q517307) (← links)
• Convexity of quotients of theta functions (Q640975) (← links)
• Approximating the maximum size of a \(k\)-regular induced subgraph by an upper bound on the co-\(k\)-plex number (Q690542) (← links)
• A heuristic for the stability number of a graph based on convex quadratic programming and tabu search (Q844531) (← links)
• Spectral characterizations of the Lovász number and the Delsarte number of a graph (Q1592957) (← links)
• On the Lovász theta function and some variants (Q1751239) (← links)
• Cliques with maximum/minimum edge neighborhood and neighborhood density (Q1762007) (← links)
• The theta number of simplicial complexes (Q2317686) (← links)
• Tightening a copositive relaxation for standard quadratic optimization problems (Q2376121) (← links)
• Extended and discretized formulations for the maximum clique problem (Q2655650) (← links)
• A characterization of the weighted version of McEliece-Rodemich-Rumsey-Schrijver number based on convex quadratic programming (Q2788727) (← links)
• Maximum cut-clique problem: ILS heuristics and a data analysis application (Q2806429) (← links)
• Ellipsoidal Relaxations of the Stable Set Problem: Theory and Algorithms (Q2949518) (← links)
• Bounds on the Stability Number of a Graph via the Inverse Theta Function (Q2973236) (← links)
• Dual Hoffman Bounds for the Stability and Chromatic Numbers Based on Semidefinite Programming (Q5013579) (← links)
• A survey on graphs with convex quadratic stability number (Q5207733) (← links)
• New results for recognizing convex-<i>QP</i> adverse graphs (Q5207738) (← links)
• A proximal bundle method for nonsmooth nonconvex functions with inexact information (Q5963307) (← links)
• A characterization of the weighted Lovász number based on convex quadratic programming (Q5963688) (← links)