2,504 research outputs found
Upward-closed hereditary families in the dominance order
The majorization relation orders the degree sequences of simple graphs into
posets called dominance orders. As shown by Hammer et al. and Merris, the
degree sequences of threshold and split graphs form upward-closed sets within
the dominance orders they belong to, i.e., any degree sequence majorizing a
split or threshold sequence must itself be split or threshold, respectively.
Motivated by the fact that threshold graphs and split graphs have
characterizations in terms of forbidden induced subgraphs, we define a class
of graphs to be dominance monotone if whenever no realization of
contains an element as an induced subgraph, and majorizes
, then no realization of induces an element of . We present
conditions necessary for a set of graphs to be dominance monotone, and we
identify the dominance monotone sets of order at most 3.Comment: 15 pages, 6 figure
On the Threshold of Intractability
We study the computational complexity of the graph modification problems
Threshold Editing and Chain Editing, adding and deleting as few edges as
possible to transform the input into a threshold (or chain) graph. In this
article, we show that both problems are NP-complete, resolving a conjecture by
Natanzon, Shamir, and Sharan (Discrete Applied Mathematics, 113(1):109--128,
2001). On the positive side, we show the problem admits a quadratic vertex
kernel. Furthermore, we give a subexponential time parameterized algorithm
solving Threshold Editing in time,
making it one of relatively few natural problems in this complexity class on
general graphs. These results are of broader interest to the field of social
network analysis, where recent work of Brandes (ISAAC, 2014) posits that the
minimum edit distance to a threshold graph gives a good measure of consistency
for node centralities. Finally, we show that all our positive results extend to
the related problem of Chain Editing, as well as the completion and deletion
variants of both problems
The Maximum Order of Adjacency Matrices With a Given Rank
AMS Subject Classification: 05B20, 05C50.Graph;Adjacency matrix
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