Title of article
On the hardness of recognizing triangular line graphs
Author/Authors
Anand، نويسنده , , Pranav and Escuadro، نويسنده , , Henry and Gera، نويسنده , , Ralucca and Hartke، نويسنده , , Stephen G. and Stolee، نويسنده , , Derrick، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2012
Pages
12
From page
2627
To page
2638
Abstract
Given a graph G , its triangular line graph is the graph T ( G ) with vertex set consisting of the edges of G and adjacencies between edges that are incident in G as well as being within a common triangle. Graphs with a representation as the triangular line graph of some graph G are triangular line graphs, which have been studied under many names including anti-Gallai graphs, 2-in-3 graphs, and link graphs. While closely related to line graphs, triangular line graphs have been difficult to understand and characterize. Van Bang Le asked if recognizing triangular line graphs has an efficient algorithm or is computationally complex. We answer this question by proving that the complexity of recognizing triangular line graphs is NP-complete via a reduction from 3-SAT.
Keywords
Triangular line graph , H -line graph , NP-complete , Line graph
Journal title
Discrete Mathematics
Serial Year
2012
Journal title
Discrete Mathematics
Record number
1600071
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