Azari, M., Divanpour, H. (2017). Splices, Links, and their Edge-Degree Distances. Transactions on Combinatorics, 6(4), 29-42. doi: 10.22108/toc.2017.21614

Mahdieh Azari; Hojjatollah Divanpour. "Splices, Links, and their Edge-Degree Distances". Transactions on Combinatorics, 6, 4, 2017, 29-42. doi: 10.22108/toc.2017.21614

Azari, M., Divanpour, H. (2017). 'Splices, Links, and their Edge-Degree Distances', Transactions on Combinatorics, 6(4), pp. 29-42. doi: 10.22108/toc.2017.21614

Azari, M., Divanpour, H. Splices, Links, and their Edge-Degree Distances. Transactions on Combinatorics, 2017; 6(4): 29-42. doi: 10.22108/toc.2017.21614

^{2}Shiraz Technical College, Technical and Vocational University

Abstract

The edge-degree distance of a simple connected graph G is defined as the sum of the terms (d(e|G)+d(f|G))d(e,f|G) over all unordered pairs {e,f} of edges of G, where d(e|G) and d(e,f|G) denote the degree of the edge e in G and the distance between the edges e and f in G, respectively. In this paper, we study the behavior of two versions of the edge-degree distance under two graph products called splice and link.

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