Now showing items 78-81 of 81

    • Vertex magic total labeling of unions of generalized Petersen graphs and unions of special circulant graphs 

      Silaban, D.R.; Parestu, A.; Herawati, B.N.; Sugeng, Kiki A; Slamin (JCMCC, 2009)
    • Vertex-antimagic total labelings of graphs 

      Baca, M.; Bertault, F.; MacDougall, J.A.; Miller, M.; Simanjuntak, R.; Slamin (Discussiones Mathematicae Graph Theory, 2003)
      In this paper we introduce a new type of graph labeling for a graph G(V;E) called an (a; d)-vertex-antimagic total labeling. In this labeling we assign to the vertices and edges the consecutive integers from 1 to |V| + |E| ...
    • Vertex-magic total labeling of the union of suns 

      Rahim, M. T.; Slamin (Ars Combinatoria, 2012)
      Let $G$ be a graph with vertex set $V=V(G)$ and edge set $E=E(G)$ and let $e=\vert E(G) \vert$ and $v=\vert V(G) \vert$. A one-to-one map $\lambda$ from $V\cup E$ onto the integers $\{ 1,2, ..., v+e \}$ is called {\it ...
    • Vertex-magic total labelings of disconnected graphs 

      Slamin; Prihandoko, A.C.; Setiawan, T.B.; Rosita, Fety; Shaleh, B. (Journal of Prime Research in Mathematics, 2006)
      Let $G$ be a graph with vertex set $V=V(G)$ and edge set $E=E(G)$ and let $e=\vert E(G) \vert$ and $v=\vert V(G) \vert$. A one-to-one map $\lambda$ from $V\cup E$ onto the integers $\{ 1,2, ..., v+e \}$ is called {\it ...