We investigate a hierarchy of semidefinite bounds $\vartheta^{(r)}(G)$ for the stability number $\alpha (G)$ of a graph $G$, based on its copositive programming formulation and introduced by de Klerk and Pasechnik [SIAM J. Optim., 12 (2002), pp. 875--892], who conjectured convergence to $\alpha (G)$ in $r = \alpha(G)-1$ steps. Even the weaker conjecture claiming finite convergence is still open. We establish links between this hierarchy and sum-of-squares hierarchies based on the Motzkin--Straus formulation of $\alpha(G)$, which we use to show finite convergence when $G$ is acritical, i.e., when $\alpha(G\setminus e)=\alpha(G)$ for all edges $e$ of $G$. This relies, in particular, on understanding the structure of the minimizers of the Motz...
We study the Sum-of-Squares semidefinite programming hierarchy via the lens of average-case problems...
In previous works an upper bound on the stability number $\alpha(G)$ of a graph G based on convex qu...
AbstractWei discovered that the stability number, α(G), of a graph, G, with degree sequence d1, d2,…...
We investigate a hierarchy of semidefinite bounds $\vartheta^{(r)}(G)$ for the stability number $\al...
Lovász and Schrijver [SIAM J. Optim., 1 (1991), pp. 166–190] showed how to formulate increasingly ti...
In the last decade, copositive formulations have been proposed for a variety of combinatorial optimi...
It has been shown that the stable set problem in an infinite compact graph, and particularly the kis...
This chapter investigates the cone of copositive matrices, with a focus on the design and analysis o...
A general problem in Extremal Combinatorics asks about the maximum size of a collection of finite ob...
De Klerk and Pasechnik introduced in 2002 semidefinite bounds ϑ(r)(G)(r≥0) for the stability number ...
The stability number for a given graph G is the size of a maximum stable set in G. The Lovasz theta ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
It has been shown that the maximum stable set problem in some infinite graphs, and the kissing numbe...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
In 1995, Reznick showed an important variant of the obvious fact that any positive semidefinite (rea...
We study the Sum-of-Squares semidefinite programming hierarchy via the lens of average-case problems...
In previous works an upper bound on the stability number $\alpha(G)$ of a graph G based on convex qu...
AbstractWei discovered that the stability number, α(G), of a graph, G, with degree sequence d1, d2,…...
We investigate a hierarchy of semidefinite bounds $\vartheta^{(r)}(G)$ for the stability number $\al...
Lovász and Schrijver [SIAM J. Optim., 1 (1991), pp. 166–190] showed how to formulate increasingly ti...
In the last decade, copositive formulations have been proposed for a variety of combinatorial optimi...
It has been shown that the stable set problem in an infinite compact graph, and particularly the kis...
This chapter investigates the cone of copositive matrices, with a focus on the design and analysis o...
A general problem in Extremal Combinatorics asks about the maximum size of a collection of finite ob...
De Klerk and Pasechnik introduced in 2002 semidefinite bounds ϑ(r)(G)(r≥0) for the stability number ...
The stability number for a given graph G is the size of a maximum stable set in G. The Lovasz theta ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
It has been shown that the maximum stable set problem in some infinite graphs, and the kissing numbe...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
In 1995, Reznick showed an important variant of the obvious fact that any positive semidefinite (rea...
We study the Sum-of-Squares semidefinite programming hierarchy via the lens of average-case problems...
In previous works an upper bound on the stability number $\alpha(G)$ of a graph G based on convex qu...
AbstractWei discovered that the stability number, α(G), of a graph, G, with degree sequence d1, d2,…...