Graceful Labeling and Skolem Graceful Labeling on the U-star Graph and It’s Application in Cryptography

Graceful Labeling on graph G=(V, E) is an injective function f from the set of the vertex V(G) to the set of numbers {0,1,2,...,|E(G)|} which induces bijective function f from the set of edges E(G) to the set of numbers {1,2,...,|E(G)|} such that for each edge uv e E(G) with u,v e V(G) in effect f(uv)=|f(u)-f(v)|. Meanwhile, the Skolem graceful labeling is a modification of the Graceful labeling. The graph has graceful labeling or Skolem graceful labeling is called graceful graph or Skolem graceful labeling graph. The graph used in this study is the U-star graph, which is denoted by U(Sn). The purpose of this research is to determine the pattern of the graceful labeling and Skolem graceful labeling on graph U(Sn) apply it to cryptography polyalphabetic cipher. The research begins by forming a graph U(Sn) and they are labeling it with graceful labeling and Skolem graceful labeling. Then, the labeling results are applied to the cryptographic polyalphabetic cipher. In this study, it is found that the U(Sn) graph is a graceful graph and a Skolem graceful graph, and the labeling pattern is obtained. Besides, the labeling results on a graph it U(Sn) can be used to form a table U(Sn) polyalphabetic cipher. The table is used as a key to encrypt messages.

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Graceful labeling on torch graph

Indonesian Journal of Combinatorics ◽

10.19184/ijc.2018.2.1.2 ◽

2018 ◽

Vol 2 (1) ◽

pp. 14

Author(s):

Jona Martinus Manulang ◽

Kiki A. Sugeng

Keyword(s):

Graceful Labeling ◽

Injective Function ◽

Vertex Set

Let G be a graph with vertex set V=V(G) and edge set E=E(G). An injective function f:V --> {0,1,2,...,|E|} is called graceful labeling if f induces a function f*(uv)=|f(u)-f(v)| which is a bijection from E(G) to the set {1,2,3,...,|E|}. A graph which admits a graceful labeling is called a graceful graph. In this paper, we show that torch graph On is a graceful graph.

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PELABELAN GRACEFUL GANJIL PADA GRAF DUPLIKASI DAN SPLIT BINTANG

JURNAL ILMIAH MATEMATIKA DAN TERAPAN ◽

10.22487/2540766x.2018.v15.i1.10193 ◽

2018 ◽

Vol 15 (1) ◽

pp. 28-35

Author(s):

J A Bantara ◽

I W Sudarsana ◽

S Musdalifah

Keyword(s):

Star Graph ◽

Graceful Labeling ◽

Set Point ◽

Side Edge ◽

Point Vertex

Graph is not an empty a finite of the objects that called point (vertex) with the couple was not that is the side (edge). The set point denoted by , while the set edge denoted by . Odd graceful labeling on graph with side is a function injective from so that induced function such that in label with so label sides would be different. A graph that have an odd graceful labeling is called odd graceful graph. The result showed that duplicate star graph for and split star graph for , for even satisfie odd graceful labeling.

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FIBONACCI AND SUPER FIBONACCI GRACEFUL LABELLINGS OF SOME TYPES OF GRAPHS

Journal of Automation and Information sciences ◽

10.34229/0572-2691-2021-1-10 ◽

2021 ◽

Vol 1 ◽

pp. 105-121

Author(s):

Marina F. Semenyuta ◽

Keyword(s):

Sufficient Conditions ◽

Necessary And Sufficient Conditions ◽

Cyclic Structure ◽

Injective Function ◽

Eulerian Graphs ◽

Enumeration Problems ◽

Bijective Function ◽

Necessary And Sufficient

We consider the basic theoretical information regarding the Fibonacci graceful graphs. An injective function is said a Fibonacci graceful labelling of a graph of a size , if it induces a bijective function on the set of edges , where by the rule , for any adjacent vertices A graph that allows such labelling is called Fibonacci graceful. In this paper, we introduce the concept of super Fibonacci graceful labelling, narrowing the set of vertex labels, i.e. Four types of problems to be studied are selected. In the problem of the first type, the following question is raised: is there a graph that allows a certain kind of labelling, and under what conditions does this take place? The problem of the second type is the problem of construction: it is necessary, for a given system of requirements for the graph, to construct (at least one) its labelling that would satisfy this system. The following two types of problems relate to enumeration problems: for a given graph, determine the number of different Fibonacci and / or super Fibonacci graceful labellings; build all the different labellings of a given kind. As a result of solving these problems, functions were found that generate Fibonacci and super Fibonacci graceful labellings for graphs of cyclic structure; necessary and sufficient conditions for the existence of Fibonacci graceful labelling for disjunctive union of cycles, super Fibonacci graceful labelling for cycles, Eulerian graphs are obtained; the number of non-equivalent labellings of the cycle is determined; conditions for the existence of a super Fibonacci graceful labelling of a one-point connection of arbitrary connected super Fibonacci graceful graphs … …, are presented

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Fibonacci Cordial Labeling of Some Special Graphs

Oriental journal of computer science and technology ◽

10.13005/ojcst/10.04.18 ◽

2017 ◽

Vol 10 (04) ◽

pp. 824-828

Author(s):

A. H. Rokad

Keyword(s):

Fibonacci Number ◽

Star Graph ◽

Injective Function

An injective function g:V(G)→{F0,F1,F2,...,Fn+1},where Fjis the jth Fibonacci number(j=0,1,...,n+1), is said to be Fibonacci cordial labeling if the induced functiong∗: E(G) →{0,1}defined by g ∗(xy)=(f(x)+f(y)) (mod2) satisfies the condition |eg(1)−eg(0)|≤1. A graph having Fibonacci cordial labeling is called Fibonacci cordialgraph. In this paper, i inspect the existence of Fibonacci Cordial Labeling of DS(Pn),DS(DFn),EdgeduplicationinK1, n,Jointsum ofGl(n),DFn⊕K1,nand ring sum of star graph with cycle with one chord and cycle with two chords respectively.

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Triangular fuzzy graceful labeling on star graph

Journal of Physics Conference Series ◽

10.1088/1742-6596/1377/1/012023 ◽

2019 ◽

Vol 1377 ◽

pp. 012023

Author(s):

N Sujatha ◽

C Dharuman ◽

K Thirusangu

Keyword(s):

Star Graph ◽

Graceful Labeling

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Computation of Even-Odd Harmonious Labeling of Certain Family of Acyclic Graphs

International Journal of Engineering and Advanced Technology - Regular Issue ◽

10.35940/ijeat.a1075.1291s319 ◽

2019 ◽

Vol 9 (1S3) ◽

pp. 414-419

Keyword(s):

Injective Function ◽

Acyclic Graphs ◽

Edge Function ◽

Bijective Function ◽

Harmonious Labeling

Let G V E  ,  be a graph with p number of vertices and q number of edges. An injective function f V p : 1,3,5, ,2 1      is called an even-odd harmonious labeling of the graph G if there exists an induced edge function : 0,2, ,2 1       * f E q such that i) * f is bijective function ii)           2  * f e uv f u f v mod q The graph obtained from this labeling is called even-odd harmonious graph.

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Prime Graceful Labeling

International Journal of Engineering & Technology ◽

10.14419/ijet.v7i4.36.24234 ◽

2018 ◽

Vol 7 (4.36) ◽

pp. 750

Author(s):

T. Hameed Hassan ◽

R. Mohammad Abbas

Keyword(s):

Graceful Labeling ◽

Injective Function

A graph G with m vertices and n edges, is said to be prime graceful labeling, if there is an injection from the vertices of G to {1, 2, ..., k} where k = min {2m, 2n} such that gcd ( ( ), ( )=1 and the induced injective function from the edges of G to {1, 2, ..., k − 1} defined by ( ) = | ( ) − ( ) | , the resulting edge labels are distinct. In this paper path , cycle Cn , star K1,n , friendship graph Fn , bistar Bn,n, C4 ∪ Pn , Km,2 and Km,2 ∪ Pn are shown to be Prime Graceful Labeling .

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Triangular fuzzy labeling on Bistagraph

International Journal of Engineering and Advanced Technology - Regular Issue ◽

10.35940/ijeat.a2296.109119 ◽

2019 ◽

Vol 9 (1) ◽

pp. 7573-7581

Keyword(s):

Star Graph ◽

Graceful Labeling

In this paper, we present an algorithm to find triangular fuzzy bi star graph Bn,n atmost 451 edges. We prove that it admits triangular fuzzy labeling. We show that it satisfies triangular fuzzy graceful labeling . .

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Some methods for constructing some classes of graceful uniform trees

Indonesian Journal of Combinatorics ◽

10.19184/ijc.2018.2.2.7 ◽

2018 ◽

Vol 2 (2) ◽

pp. 123

Author(s):

I Nengah Suparta ◽

I Dewa Made Agus Ariawan

Keyword(s):

Injective Function ◽

Vertex Set ◽

Bijective Function

A tree T(V, E) is graceful if there exists an injective function f from the vertex set V(T) into the set {0, 1, 2, ..., ∣V∣ − 1} which induces a bijective function fʹ from the edge set E(T) onto the set {1, 2, ..., ∣E∣}, with fʹ(uv) = ∣f(u) − f(v)∣ for every edge {u, v} ∈ E. Motivated by the conjecture of Alexander Rosa (see) saying that all trees are graceful, a lot of works have addressed gracefulness of some trees. In this paper we show that some uniform trees are graceful. This results will extend the list of graceful trees.

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PELABELAN SELIMUT TOTAL SUPER (a,d)-H ANTIMAGIC PADA GRAPH LOBSTER BERATURAN L_n (q,r)

E-Jurnal Matematika ◽

10.24843/mtk.2017.v06.i02.p159 ◽

2017 ◽

Vol 6 (2) ◽

pp. 143

Author(s):

TIRA CATUR ROSALIA ◽

LUH PUTU IDA HARINI ◽

KARTIKA SARI

Keyword(s):

Connected Graph ◽

Literature Study ◽

Injective Function ◽

Graph Labelling ◽

Bijective Function ◽

Positive Integers

Graph labelling is a function that maps graph elements to positive integers. A covering of graph is family subgraph from , for with integer k. Graph admits covering if for every subgraph is isomorphic to a graph . A connected graph is an - antimagic if there are positive integers and bijective function such that there are injective function , defined by with . The purpose of this research is to determine a total super antimagic covering on lobster graph . The method of this research is literature study method. It is obtained that there are a total super antimagic covering for on lobster graph with integer and even number .

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