During the last three decades, different types of decompositions have been processed in the field of graph theory. Among these we mention: decompositions based on the additivity of some characteristics of the graph, decompositions where the adjacency law between the subsets of the partition is known, decompositions where the subgraph induced by every subset of the partition must have predeterminate properties, as well as combinations of such decompositions. In this paper we characterize threshold graphs using the weakly decomposition, determine: density and stability number, Wiener index and Wiener polynomial for threshold graphs
AbstractThe astral index of a graph is defined as the smallest number of astral graphs (also known a...
The astral index of a graph is defined as the smallest number of astral graphs (also known as thresh...
AbstractWe show that the cubicity of a connected threshold graph is equal to ⌈log2α⌉, where α is its...
ABSTRACT During the last three decades, different types of decompositions have been processed in th...
AbstractWe study the structure of the networks in which connectedness and disconnectedness can be ex...
Abstract. We motivate and discuss four open problems in polyhedral combinatorics related to threshol...
We define a weakly threshold sequence to be a degree sequence d = (d1, ⋯, dn) of a graph having the ...
Wiener and Randić indices have long been studied in chemical graph theory as connection strength mea...
summary:The Wiener index of a connected graph is defined as the sum of the distances between all uno...
Abstract. We consider Schrodinger operators on threshold graphs and prove a formula for the Colin de...
We show that the cubicity of a connected threshold graph is equal to inverted right perpendicularlog...
Given an undirected graph G = (V,E) and two positive integers k and d, we are interested in finding ...
AbstractThis paper deals with three generalizations of threshold graphs to hypergraphs proposed by M...
AbstractWe deduce a set of known characterizations of threshold graphs (Theorem 3) from a set of cha...
AbstractA threshold graph (respectively domishold graph) is a graph for which the independent sets (...
AbstractThe astral index of a graph is defined as the smallest number of astral graphs (also known a...
The astral index of a graph is defined as the smallest number of astral graphs (also known as thresh...
AbstractWe show that the cubicity of a connected threshold graph is equal to ⌈log2α⌉, where α is its...
ABSTRACT During the last three decades, different types of decompositions have been processed in th...
AbstractWe study the structure of the networks in which connectedness and disconnectedness can be ex...
Abstract. We motivate and discuss four open problems in polyhedral combinatorics related to threshol...
We define a weakly threshold sequence to be a degree sequence d = (d1, ⋯, dn) of a graph having the ...
Wiener and Randić indices have long been studied in chemical graph theory as connection strength mea...
summary:The Wiener index of a connected graph is defined as the sum of the distances between all uno...
Abstract. We consider Schrodinger operators on threshold graphs and prove a formula for the Colin de...
We show that the cubicity of a connected threshold graph is equal to inverted right perpendicularlog...
Given an undirected graph G = (V,E) and two positive integers k and d, we are interested in finding ...
AbstractThis paper deals with three generalizations of threshold graphs to hypergraphs proposed by M...
AbstractWe deduce a set of known characterizations of threshold graphs (Theorem 3) from a set of cha...
AbstractA threshold graph (respectively domishold graph) is a graph for which the independent sets (...
AbstractThe astral index of a graph is defined as the smallest number of astral graphs (also known a...
The astral index of a graph is defined as the smallest number of astral graphs (also known as thresh...
AbstractWe show that the cubicity of a connected threshold graph is equal to ⌈log2α⌉, where α is its...