Determining the Number of Disconnected Vertices Labeled Graphs of Order Six with the Maximum Number Twenty Parallel Edges and Containing No Loops

Determining the Number of Disconnected Vertices Labeled Graphs of Order Six with the Maximum Number Twenty Parallel Edges and Containing No Loops

If there exist two vertices on a given graph that are not connected by a path, then we call that graph is disconnected. Given a graph with n vertices and m edges, then a lot of graphs can be constructed. In this paper, we discuss the number of disconnected vertices labeled graphs of order six (n = 6...

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Veröffentlicht in:Journal of physics. Conference series 2021-01, Vol.1751 (1), p.12024
Hauptverfasser: Putri, D, Wamiliana, Fitriani, Faisol, A, Dewi, K S
Format: Artikel
Sprache:eng
Schlagworte:
Apexes
counting graph
disconnected graph
Graph theory
Graphs
Physics
vertices labelled graph
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Zusammenfassung:If there exist two vertices on a given graph that are not connected by a path, then we call that graph is disconnected. Given a graph with n vertices and m edges, then a lot of graphs can be constructed. In this paper, we discuss the number of disconnected vertices labeled graphs of order six (n = 6) with the maximum number of parallel edges is twenty. Moreover, a maximum number of edges that connect different pair of vertices is ten (parallel edges are counted as one) and containing no loops (isomorphic graphs are counted as one).
ISSN:1742-6588
1742-6596
DOI:10.1088/1742-6596/1751/1/012024