BibTex Citation Data :
@article{JM623, author = {Isnaini R}, title = {BILANGAN KROMATIK UNTUK GRAF FUZZY LENGKAP DAN GRAF FUZZY BIPARTISI LENGKAP}, journal = {MATEMATIKA}, volume = {12}, number = {2}, year = {2010}, keywords = {}, abstract = { A fuzzy graph G( V , σ , μ ) is a graph which consist of a set of fuzzy nodes σ : V ® [0,1] and a set of fuzzy edges µ: E ® [0,1], so that μ ( uv ) ≤ σ ( u ) Ù σ ( v ) \" u , v Î V. A fuzzy graph G = ( V , σ , μ ) is called complete if μ ( uv ) = min\{ σ ( u ), σ ( v )\} \" u , v Î V. A fuzzy graph G = ( V , σ , μ ) is called a bipartite fuzzy graph if set of nodes V can divide into two disjoint sets V 1 and V 2 so that μ ( v 1 v 2 ) = 0 if v 1 ,v 2 Î V 1 or v 1 ,v 2 Î V 2 . If on a bipartite fuzzy graph G, satisfy μ ( uv ) = min\{ σ ( u ), σ ( v )\} for all u Î V 1 and v Î V 2 , then G is called a complete bipartite fuzzy graph. A k -colouring on a fuzzy graph G ( V , σ , μ ) is a family of fuzzy sets on V: G = \{ g 1 , g 2 , g 3 ,…, g k \} which satisfy the following conditions : i) Ú G = σ ; ii) g i Ù g j = 0, for all pair of nodes u, v, which adjacent in a fuzzy graph G and min\{ g i(u), g i(v)\} = 0 (1 ≤ i ≤ k ). The smallest positive integer k on k -colouring of a fuzzy graph G is called chromatic number of G. Then can be proved that the chromatic number of a complete fuzzy graph with n nodes is c F (K σ ) = n and the chromatic number of a complete bipartite fuzzy graph is c F (K σ 1, σ 2 ) = 2. }, url = {https://ejournal.undip.ac.id/index.php/matematika/article/view/623} }
Refworks Citation Data :
A fuzzy graph G(V,σ,μ) is a graph which consist of a set of fuzzy nodes σ : V ® [0,1] and a set of fuzzy edges µ: E® [0,1], so that μ(uv) ≤ σ (u) Ùσ (v) "u,vÎV. A fuzzy graph G = (V,σ,μ) is called complete if μ(uv) = min{σ(u),σ (v)} "u,vÎV. A fuzzy graph G = (V,σ,μ) is called a bipartite fuzzy graph if set of nodes V can divide into two disjoint sets V1 and V2 so that μ(v1v2) = 0 if v1,v2ÎV1 or v1,v2ÎV2. If on a bipartite fuzzy graph G, satisfy μ(uv) = min{σ (u),σ(v)} for all uÎV1 and vÎV2, then G is called a complete bipartite fuzzy graph. A k-colouring on a fuzzy graph G(V,σ,μ) is a family of fuzzy sets on V: G = {g1, g2, g3,…, gk} which satisfy the following conditions : i) Ú G = σ; ii) gi Ù gj = 0, for all pair of nodes u, v, which adjacent in a fuzzy graph G and min{gi(u),gi(v)} = 0 (1 ≤ i ≤ k). The smallest positive integer k on k-colouring of a fuzzy graph G is called chromatic number of G. Then can be proved that the chromatic number of a complete fuzzy graph with n nodes is cF(Kσ) = n and the chromatic number of a complete bipartite fuzzy graph is cF(Kσ1,σ2) = 2.
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