Your search keyword '"cospectral mate"' showing total 3 results

1. Spectra of Subdivision Vertex-Edge Join of Three Graphs

Author

Fei Wen, You Zhang, and Muchun Li

Subjects

subdivision vertex-edge join, cospectral mate, spanning tree, Kirchhoff index, Kemeny’s constant, Mathematics, QA1-939

Abstract

In this paper, we introduce a new graph operation called subdivision vertex-edge join (denoted by G 1 S ▹ ( G 2 V ∪ G 3 E ) for short), and then the adjacency spectrum, the Laplacian spectrum and the signless Laplacian spectrum of G 1 S ▹ ( G 2 V ∪ G 3 E ) are respectively determined in terms of the corresponding spectra for a regular graph G 1 and two arbitrary graphs G 2 and G 3 . All the above can be viewed as the generalizations of the main results in [X. Liu, Z. Zhang, Bull. Malays. Math. Sci. Soc., 2017:1⁻17]. Furthermore, we also determine the normalized Laplacian spectrum of G 1 S ▹ ( G 2 V ∪ G 3 E ) whenever G i are regular graphs for each index i = 1 , 2 , 3 . As applications, we construct infinitely many pairs of A-cospectral mates, L-cospectral mates, Q-cospectral mates and L -cospectral mates. Finally, we give the number of spanning trees, the (degree-)Kirchhoff index and the Kemeny’s constant of G 1 S ▹ ( G 2 V ∪ G 3 E ) , respectively.

Published

2019

2. Spectra of Subdivision Vertex-Edge Join of Three Graphs

Author

Muchun Li, You Zhang, and Fei Wen

Subjects

Vertex (graph theory), General Mathematics, Kirchhoff index, 010103 numerical & computational mathematics, 01 natural sciences, Spectral line, Combinatorics, subdivision vertex-edge join, Computer Science (miscellaneous), 0101 mathematics, cospectral mate, Engineering (miscellaneous), Mathematics, Subdivision, spanning tree, Spanning tree, business.industry, lcsh:Mathematics, 010102 general mathematics, lcsh:QA1-939, Graph, Kemeny’s constant, Adjacency list, Regular graph, business

Abstract

In this paper, we introduce a new graph operation called subdivision vertex-edge join (denoted by G 1 S ▹ ( G 2 V ∪ G 3 E ) for short), and then the adjacency spectrum, the Laplacian spectrum and the signless Laplacian spectrum of G 1 S ▹ ( G 2 V ∪ G 3 E ) are respectively determined in terms of the corresponding spectra for a regular graph G 1 and two arbitrary graphs G 2 and G 3 . All the above can be viewed as the generalizations of the main results in [X. Liu, Z. Zhang, Bull. Malays. Math. Sci. Soc., 2017:1⁻17]. Furthermore, we also determine the normalized Laplacian spectrum of G 1 S ▹ ( G 2 V ∪ G 3 E ) whenever G i are regular graphs for each index i = 1 , 2 , 3 . As applications, we construct infinitely many pairs of A-cospectral mates, L-cospectral mates, Q-cospectral mates and L -cospectral mates. Finally, we give the number of spanning trees, the (degree-)Kirchhoff index and the Kemeny’s constant of G 1 S ▹ ( G 2 V ∪ G 3 E ) , respectively.

Published

2019

3. Spectra of Subdivision Vertex-Edge Join of Three Graphs.

Author

Wen, Fei, Zhang, You, and Li, Muchun

Subjects

*REGULAR graphs, *GEOMETRIC vertices, *SPANNING trees, *MATHEMATICS

Abstract

In this paper, we introduce a new graph operation called subdivision vertex-edge join (denoted by G 1 S ▹ (G 2 V ∪ G 3 E) for short), and then the adjacency spectrum, the Laplacian spectrum and the signless Laplacian spectrum of G 1 S ▹ (G 2 V ∪ G 3 E) are respectively determined in terms of the corresponding spectra for a regular graph G 1 and two arbitrary graphs G 2 and G 3 . All the above can be viewed as the generalizations of the main results in [X. Liu, Z. Zhang, Bull. Malays. Math. Sci. Soc., 2017:1–17]. Furthermore, we also determine the normalized Laplacian spectrum of G 1 S ▹ (G 2 V ∪ G 3 E) whenever G i are regular graphs for each index i = 1 , 2 , 3 . As applications, we construct infinitely many pairs of A-cospectral mates, L-cospectral mates, Q-cospectral mates and L -cospectral mates. Finally, we give the number of spanning trees, the (degree-)Kirchhoff index and the Kemeny's constant of G 1 S ▹ (G 2 V ∪ G 3 E) , respectively. [ABSTRACT FROM AUTHOR]

Published

2019