Add to ORKGThis paper proposes three new analytical lower bounds on the clique number of a graph and compares these bounds with those previously established in the literature. Two proposed bounds are derived from the well-known Motzkin–Straus quadratic programming formulation for the maximum clique problem. Theoretical results on the comparison of various bounds are established. Computational experiments are performed on random graph models such as the Erdös-Rényi model for uniform graphs and the generalized random graph model for power-law graphs that simulate graphs with different densities and assortativity coefficients. Computational results suggest that the proposed new analytical bounds improve the existing ones on many graph instances
This paper examines methods for predicting and estimating the number of maximal cliques in a random ...
We prove that for k ≪4n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi gr...
Introduction We introduce a method to give upper estimates for the clique size of intermediately la...
AbstractThe paper reviews some of the existing exact bounds to the maximum clique of a graph and suc...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Given a graph G whose adjacency matrix is A, the Motzkin-Strauss formulation of the Maximum-Clique P...
AbstractConsider a graph G with the property that any set of p vertices in G contains a q-clique. Fa...
AbstractConsider a graph G with the property that any set of p vertices in G contains a q-clique. Fa...
AbstractWe consider the problem of determining the size of a maximum clique in a graph, also known a...
This project is for students interested in applying algebra and computa-tion to an important problem...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
Abstract. Finding the maximum clique is a known NP-Complete problem and it is also hard to approxima...
This paper examines methods for predicting and estimating the number of maximal cliques in a random ...
We prove that for k ≪4n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi gr...
Introduction We introduce a method to give upper estimates for the clique size of intermediately la...
AbstractThe paper reviews some of the existing exact bounds to the maximum clique of a graph and suc...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Many computer vision and patter recognition problems are intimately related to the maximum clique pr...
Given a graph G whose adjacency matrix is A, the Motzkin-Strauss formulation of the Maximum-Clique P...
AbstractConsider a graph G with the property that any set of p vertices in G contains a q-clique. Fa...
AbstractConsider a graph G with the property that any set of p vertices in G contains a q-clique. Fa...
AbstractWe consider the problem of determining the size of a maximum clique in a graph, also known a...
This project is for students interested in applying algebra and computa-tion to an important problem...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
We prove that for k ≪4√n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi g...
Abstract. Finding the maximum clique is a known NP-Complete problem and it is also hard to approxima...
This paper examines methods for predicting and estimating the number of maximal cliques in a random ...
We prove that for k ≪4n regular resolution requires length nΩ(k) to establish that an Erdős–Rényi gr...
Introduction We introduce a method to give upper estimates for the clique size of intermediately la...