CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH
For a graph G = (V,E), a binary labeling (coloring) f : V (G)-> Z2 , is said to be friendly if the diference between the number of vertices labeled 0 and vertices labeled 1 is at most 1. The friendly labeling f : V (G)-> Z2 induces an edge labeling f͓ :E(G)->Z2 defined by fU...
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id-itb.:206712017-09-27T11:43:13ZCORDIAL INDEX OF HONEYCOMB NETWORK GRAPH SHOFY ADIANTO (10111020), ABDURRAHMAN Indonesia Final Project INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/20671 For a graph G = (V,E), a binary labeling (coloring) f : V (G)-> Z2 , is said to be friendly if the diference between the number of vertices labeled 0 and vertices labeled 1 is at most 1. The friendly labeling f : V (G)-> Z2 induces an edge labeling f͓ :E(G)->Z2 defined by f͓(xy) = |f(x)-f(y)|; Vxy € E(G). Let ef (i) = |f͓-1(i)| be the number of edges labeled i. The value N(f) = |ef (1)- ef (0)| is called as the cordial index for labelling f of graph G. The cordial set of the graph G, denoted by C(G), is defined by <br /> <br /> <br /> <br /> <br /> <br /> C(G) = {N(f) : f is a friendly vertex labeling of G} <br /> <br /> <br /> <br /> <br /> <br /> A graph G is said to be cordial if the value 0 or 1 is a member of C (G) <br /> <br /> <br /> <br /> <br /> <br /> A honeycomb network graph HC(n) is defined as follows: HC(1) is a hexagon. For n > 1, HC(n) is obtained from HC(n - 1) by adding a layer of hexagons around the boundary of HC(n - 1). In this thesis, we show that HC(n) with n > 1 is a cordial graph. We also characterize all values of cordial index of HC(n) for n > 1. text |
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For a graph G = (V,E), a binary labeling (coloring) f : V (G)-> Z2 , is said to be friendly if the diference between the number of vertices labeled 0 and vertices labeled 1 is at most 1. The friendly labeling f : V (G)-> Z2 induces an edge labeling f͓ :E(G)->Z2 defined by f͓(xy) = |f(x)-f(y)|; Vxy € E(G). Let ef (i) = |f͓-1(i)| be the number of edges labeled i. The value N(f) = |ef (1)- ef (0)| is called as the cordial index for labelling f of graph G. The cordial set of the graph G, denoted by C(G), is defined by <br />
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C(G) = {N(f) : f is a friendly vertex labeling of G} <br />
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A graph G is said to be cordial if the value 0 or 1 is a member of C (G) <br />
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A honeycomb network graph HC(n) is defined as follows: HC(1) is a hexagon. For n > 1, HC(n) is obtained from HC(n - 1) by adding a layer of hexagons around the boundary of HC(n - 1). In this thesis, we show that HC(n) with n > 1 is a cordial graph. We also characterize all values of cordial index of HC(n) for n > 1. |
| format |
Final Project |
| author |
SHOFY ADIANTO (10111020), ABDURRAHMAN |
| spellingShingle |
SHOFY ADIANTO (10111020), ABDURRAHMAN CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| author_facet |
SHOFY ADIANTO (10111020), ABDURRAHMAN |
| author_sort |
SHOFY ADIANTO (10111020), ABDURRAHMAN |
| title |
CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| title_short |
CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| title_full |
CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| title_fullStr |
CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| title_full_unstemmed |
CORDIAL INDEX OF HONEYCOMB NETWORK GRAPH |
| title_sort |
cordial index of honeycomb network graph |
| url |
https://digilib.itb.ac.id/gdl/view/20671 |
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1821120228711464960 |