Title of article :
Indecomposable laplacian integral graphs Original Research Article
Author/Authors :
Robert Grone، نويسنده , , Russell Merris، نويسنده ,
Issue Information :
روزنامه با شماره پیاپی سال 2008
Abstract :
A graph that can be constructed from isolated vertices by the operations of union and complement is decomposable. Every decomposable graph is Laplacian integral. i.e., its Laplacian spectrum consists entirely of integers. An indecomposable graph is not decomposable. The main purpose of this note is to demonstrate the existence of infinitely many indecomposable Laplacian integral graphs.
Keywords :
Laplacian matrix , Self-complementary graph , Cograph , Decomposable graph , eigenvalue , Graph join , graph product , Isospectral , Kronecker product , Laplacian integral graph , Spectrum
Journal title :
Linear Algebra and its Applications
Journal title :
Linear Algebra and its Applications
