Open Access
Issue |
RAIRO-Oper. Res.
Volume 56, Number 5, September-October 2022
|
|
---|---|---|
Page(s) | 3525 - 3543 | |
DOI | https://doi.org/10.1051/ro/2022161 | |
Published online | 21 October 2022 |
- L. Zheng and B. Zhou, On the spectral closeness and residual spectral closeness of graphs. RAIRO: OR 56 (2022) 2651–2668. [CrossRef] [EDP Sciences] [Google Scholar]
- R.B. Bapat, A.K. Lal and S. Pati, A q-analogue of the distance matrix of a tree. Linear Algebra Appl. 416 (2006) 799–814. [CrossRef] [MathSciNet] [Google Scholar]
- W. Yan and Y.-N. Yeh, The determinants of q-distance matrices of trees and two quantities relating to permutations. Adv. Appl. Math. 39 (2007) 311–321. [CrossRef] [MathSciNet] [Google Scholar]
- C. Dangalchev, Residual closeness in networks. Phys. A 365 (2006) 556–564. [CrossRef] [Google Scholar]
- C. Dangalchev, Residual closeness and generalized closeness. Internat. J. Found. Comput. Sci. 22 (2011) 1939–1948. [CrossRef] [MathSciNet] [Google Scholar]
- D. Rupnik Poklukar and J. Žerovnik, Networks with extremal closeness. Fund. Inform. 167 (2019) 219–234. [MathSciNet] [Google Scholar]
- A. Aytac and Z.N. Odabas, Robustness of regular caterpillars. Internat. J. Found. Comput. Sci. 28 (2017) 835–841. [CrossRef] [MathSciNet] [Google Scholar]
- H. Hosoya, On some counting polynomials in chemistry. Discrete Appl. Math. 19 (1988) 239–257. [CrossRef] [MathSciNet] [Google Scholar]
- L. Zheng and B. Zhou, The closeness spectral properties of graphs. Preprint [Google Scholar]
- S. Butler, E. Coper, A. Li, K. Lorenzen and Z. Schopick, Spectral properties of the exponential distance matrix. Preprint arXiv:1910.06373 (2019). [Google Scholar]
- K.J. Lorenzen, Cospectral Constructions and Spectral Properties of Variations of the Distance Matrix. Ph.D. thesis, Iowa State University, USA (2021). [Google Scholar]
- M. Aouchiche and P. Hansen, Two Laplacians for the distance matrix of a graph. Linear Algebra Appl. 439 (2013) 21–33. [CrossRef] [MathSciNet] [Google Scholar]
- R.A. Horn and C.R. Johnson, Matrix Analysis, 2nd ed.. Cambridge University Press, Cambridge (2013). [Google Scholar]
- A. Brouwer and W. Haemers, Spectra of Graphs. Springer, New York (2012). [CrossRef] [Google Scholar]
- H. Guo and B. Zhou, Minimum status of trees with a given degree sequence. Acta Inform. (2022) 10.1007/s00236-022-00416-2. [Google Scholar]
- D. Vukičevića and G. Caporossi, Network descriptors based on betweenness centrality and transmission and their extremal values. Discrete Appl. Math. 161 (2013) 2678–2686. [CrossRef] [MathSciNet] [Google Scholar]
- V. Nikiforov, Merging the A- and Q-spectral theories. Appl. Anal. Discrete Math. 11 (2017) 81–107. [CrossRef] [MathSciNet] [Google Scholar]
Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.
Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.
Initial download of the metrics may take a while.