We define a weakly threshold sequence to be a degree sequence d = (d1, ⋯, dn) of a graph having the property that Σi≤kdi ≥ k(k - 1) + Σi\u3ek min {k, di} - 1 for all positive k ≤ max {i : di ≥ i - 1}. The weakly threshold graphs are the realizations of the weakly threshold sequences. The weakly threshold graphs properly include the threshold graphs and satisfy pleasing extensions of many properties of threshold graphs. We demonstrate a majorization property of weakly threshold sequences and an iterative construction algorithm for weakly threshold graphs, as well as a forbidden induced subgraph characterization. We conclude by exactly enumerating weakly threshold sequences and graphs
The antiregular connected graph on vertices is defined as the connected graph whose vertex degrees ...
[[abstract]]A connected graph is said to be unoriented Laplacian maximizing if the spectral radius o...
AbstractA connected graph is said to be unoriented Laplacian maximizing if the spectral radius of it...
We define a weakly threshold sequence to be a degree sequence d = (d1, ⋯, dn) of a graph having the ...
A digraph whose degree sequence has a unique vertex labeled realization is called threshold. In this...
AbstractA classical result concerning majorization is: given two nonnegative integer sequences a and...
AbstractA nonnegative integer sequence (d1,d2,…,dn) is called a degree sequence if there exists a si...
During the last three decades, different types of decompositions have been processed in the field of...
In this paper we study the class of weakly quasi-threshold graphs that are obtained from a vertex by...
A graph G on n vertices is a threshold graph if there exist real numbers $$a:1,a_2, \ldots, a_n$$ an...
AbstractIn this paper we consider threshold graphs (also called nested split graphs) and investigate...
The majorization relation orders the degree sequences of simple graphs into posets called dominance ...
A graph $G$ on $n$ vertices is a \emph{threshold graph} if there exist real numbers $a_1,a_2, \ldots...
A graph G=(V, E) is a threshold tolerance if it is possible to associate weights and tolerances with...
ABSTRACT During the last three decades, different types of decompositions have been processed in th...
The antiregular connected graph on vertices is defined as the connected graph whose vertex degrees ...
[[abstract]]A connected graph is said to be unoriented Laplacian maximizing if the spectral radius o...
AbstractA connected graph is said to be unoriented Laplacian maximizing if the spectral radius of it...
We define a weakly threshold sequence to be a degree sequence d = (d1, ⋯, dn) of a graph having the ...
A digraph whose degree sequence has a unique vertex labeled realization is called threshold. In this...
AbstractA classical result concerning majorization is: given two nonnegative integer sequences a and...
AbstractA nonnegative integer sequence (d1,d2,…,dn) is called a degree sequence if there exists a si...
During the last three decades, different types of decompositions have been processed in the field of...
In this paper we study the class of weakly quasi-threshold graphs that are obtained from a vertex by...
A graph G on n vertices is a threshold graph if there exist real numbers $$a:1,a_2, \ldots, a_n$$ an...
AbstractIn this paper we consider threshold graphs (also called nested split graphs) and investigate...
The majorization relation orders the degree sequences of simple graphs into posets called dominance ...
A graph $G$ on $n$ vertices is a \emph{threshold graph} if there exist real numbers $a_1,a_2, \ldots...
A graph G=(V, E) is a threshold tolerance if it is possible to associate weights and tolerances with...
ABSTRACT During the last three decades, different types of decompositions have been processed in th...
The antiregular connected graph on vertices is defined as the connected graph whose vertex degrees ...
[[abstract]]A connected graph is said to be unoriented Laplacian maximizing if the spectral radius o...
AbstractA connected graph is said to be unoriented Laplacian maximizing if the spectral radius of it...