Open Access
Issue |
RAIRO-Oper. Res.
Volume 55, Number 3, May-June 2021
|
|
---|---|---|
Page(s) | 1757 - 1765 | |
DOI | https://doi.org/10.1051/ro/2021085 | |
Published online | 22 June 2021 |
- M. Aouchiche and P. Hansen, Distance spectra of graphs: a survey. Linear Algebra App. 458 (2014) 301–386. [Google Scholar]
- S.S. Bose, M. Nath and S. Paul, Distance spectral radius of graphs with r pendent vertices. Linear Algebra App. 435 (2011) 2828–2836. [Google Scholar]
- S.S. Bose, M. Nath and S. Paul, On the distance spectral radius of cacti. Linear Algebra App. 437 (2012) 2128–2141. [Google Scholar]
- Y. Deng, D. Li, H. Lin and B. Zhou, Distance spectral radius of series-reduced trees with parameters. RAIRO: OR 55 (2021) S2561–S2574. [Google Scholar]
- R.L. Graham and H.O. Pollack, On the addressing problem for loop switching. Bell Syst. Tech. J. 50 (1971) 2495–2519. [Google Scholar]
- F. Harary and G. Prins, The number of homeomorphically irreducible trees, and other spices. Acta Math. 101 (1959) 141–162. [Google Scholar]
- A. Ilić, Distance spetral radius of trees with given matching number. Discrete Appl. Math. 158 (2010) 1799–1806. [Google Scholar]
- H. Lin and B. Zhou, Distance spectral radius of trees with given number of segments. Linear Algebra App. 600 (2020) 40–59. [Google Scholar]
- W. Lin, Y. Zhang, Q. Chen, J. Chen, C. Ma and J. Chen, Ordering trees by their distance spectral radii. Discrete Appl. Math. 203 (2016) 106–110. [Google Scholar]
- H. Minc, Nonnegative Matrices. John Wiley & Sons, New York (1988). [Google Scholar]
- M. Nath and S. Paul, On the distance spectral radius of bipartite graphs. Linear Algebra App. 436 (2012) 1285–1296. [Google Scholar]
- S.N. Ruzieh and D.L. Powers, The distance spectrum of the path Pn and the first distance eigenvector of connected graphs. Linear Multilinear Algebra 28 (1990) 75–81. [Google Scholar]
- D. Stevanović and A. Ilić, Distance spectral radius of trees with fixed maximum degree. Electron. J. Linear Algebra 20 (2010) 168–179. [Google Scholar]
- Y. Wang and B. Zhou, On distance spectral radius of graphs. Linear Algebra App. 438 (2013) 3490–3503. [Google Scholar]
- R. Xing, B. Zhou and F. Dong, The effect of a graft transformation on distance spectral radius. Linear Algebra App. 457 (2014) 261–275. [Google Scholar]
- G. Yu, Y. Wu, Y. Zhang and J. Shu, Some graft transformations and its application on a distance spectrum. Discrete Math. 311 (2011) 2117–2123. [Google Scholar]
- B. Zelinka, Medians and peripherians of trees. Arch. Math. (Brno) 4 (1968) 87–95. [Google Scholar]
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