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Starlike tree

From Wikipedia, the free encyclopedia

In the area of mathematics known as graph theory, a tree is said to be starlike if it has exactly one vertex of degree greater than 2. This high-degree vertex is the root and a starlike tree is obtained by attaching at least three linear graphs to this central vertex.

Properties

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Two finite starlike trees are isospectral, i.e. their graph Laplacians have the same spectra, if and only if they are isomorphic.[1] The graph Laplacian has always only one eigenvalue equal or greater than 4.[2]

References

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  1. ^ M. Lepovic, I. Gutman (2001). No starlike trees are cospectral.
  2. ^ Nakatsukasa, Yuji; Saito, Naoki; Woei, Ernest (April 2013). "Mysteries around the Graph Laplacian Eigenvalue 4". Linear Algebra and Its Applications. 438 (8): 3231–46. arXiv:1112.4526. doi:10.1016/j.laa.2012.12.012.
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