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AKCE International Journal of Graphs and Combinatorics Volume 20, 2023 - Issue 2: International Conference on Linear Algebra and its Applications; Guest editors: Ravindra B Bapat, Manjunatha Prasad Karantha,Stephen J Kirkland, Simo Puntanen, S Arumugam
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Research Articles

Generalized inverses in graph theory

Umashankara Kelathayaa Department of Data Science, Prasanna School of Public Health, Manipal Academy of Higher Education, Manipal, Karnataka, India
,
Ravindra B. Bapatb Indian Statististical Institute, Delhi centre, New Delhi, India
&
Manjunatha Prasad Karanthaa Department of Data Science, Prasanna School of Public Health, Manipal Academy of Higher Education, Manipal, Karnataka, IndiaCorrespondence[email protected]
Pages 108-114 | Received 01 Jun 2023, Accepted 02 Jul 2023, Published online: 21 Jul 2023

References

  • Bapat, R. B. (1997). Moore-penrose inverse of the incidence matrix of a tree. Linear Multilinear Algebra. 42: 159–167.
  • Bapat, R. B. (2004). Resistance matrix of a weighted graph. MATCH Commun. Math. Comput. Chem. 50: 73–82.
  • Bapat, R. B. (2014). Graphs and Matrices, 2nd ed. London: Springer-Verlag.
  • Ben-Israel, A., Greville, T. N. E. (1974). Generalized Inverses: Theory and Applications, 2nd ed. New York: Springer.
  • Bhat, K. N., Karantha, M. P., Eagambaram, N. (2021). Inverse complements of a matrix and its applications. J. Algebra Appl. 20(8): 1–12.
  • Bollobás, B. (1998). Modern Graph Theory, 1st ed. New York: Springer-Verlag.
  • Eagambaram, N. (1991). (i,j,…,k)-inverses via bordered matrices. SankhySer. A (1961–2002) 53(3): 298–308.
  • Harary, F. (1969). Graph Theory, 1st ed. Boston, MA: Addison-Wesley.
  • Ijiri, Y. (1965). On the generalized inverse of an incidence matrix. J. Soc. Indust. Appl. Math. 13(3): 827–836.
  • Kelathaya, U., Varkady, S., Karantha, M. P. (2022). Inverse complements and strongly unit regular elements. J. Algebra Appl. 21(10): 1–11.
  • Kirkland, S. J., Neumann, M., Shader, B. L. (1997). Distances in weighted trees and group inverse of Laplacian matrices. SIAM J. Matrix Anal. Appl. 18(4): 827–841.
  • Klein, D. J., and Randić, M. (1993). Resistance distance. J. Math. Chem. 12: 81–95.
  • Nomakuchi, K. (1980). On the characterization of generalized inverses by bordered matrices. Linear Algebra Appl. 33: 1–8.
  • Prasad, K. M. (2012). An introduction to generalized inverse. In: Bapat, R. B., Kirkland, S., Prasad, K. M., Puntanen, S., eds. Lectures on Matrix and Graph Methods. Manipal, India: Manipal University Press, pp. 43–60.
  • Prasad, K. M., Bhaskara Rao, K. P. S. (1996). On bordering of regular matrices. Linear Algebra Appl. 234: 245–259.
  • Rao, C. R., Mitra, S. K. (1971). Generalized Inverses of Matrices and its Applications. New York: Wiley.

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