**Volume 55 (2023)**

**Volume 54 (2022)**

**Volume 53 (2021)**

**Volume 52 (2020)**

**Volume 51 (2019)**

**Volume 50 (2018)**

**Volume 49 (2017)**

**Volume 48 (2016)**

**Volume 47 (2016)**

**Volume 46 (2015)**

**Volume 45 (2014)**

**Volume 44 (2013)**

**Volume 43 (2009)**

**Volume 42 (2008)**

**Volume 41 (2007)**

#### Keywords = cycle

Number of Articles: 9

##### Pair Difference Cordial Labeling of $m-$ copies of Path, Cycle, Star, and Ladder Graphs

*Volume 54, Issue 2 , December 2022, , Pages 37-47*

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**Abstract **

In this paper, we consider only finite, undirected, and simple graphs. The concept of cordial labeling was introduced by Cahit[4]. Different types of cordial-related labeling were studied in [1, 2, 3, 5, 16]. In a similar line, the notion of pair difference cordial labeling of a graph was introduced ...
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##### Pair mean cordial labeling of graphs

*Volume 54, Issue 1 , June 2022, , Pages 1-10*

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**Abstract **

In this paper, we introduce a new graph labeling called pair mean cordial labeling of graphs. Also, we investigate the pair mean cordiality of some graphs like path, cycle, complete graph, star, wheel, ladder, and comb.
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##### $4$-total mean cordial labeling of union of some graphs with the complete bipartite graph $K_{2,n}$

*Volume 54, Issue 1 , June 2022, , Pages 35-46*

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**Abstract **

Let $G$ be a graph. Let $f:V\left(G\right)\rightarrow \left\{0,1,2,\ldots,k-1\right\}$ be a function where $k\in \mathbb{N}$ and $k>1$. For each edge $uv$, assign the label $f\left(uv\right)=\left\lceil \frac{f\left(u\right)+f\left(v\right)}{2}\right\rceil$. $f$ is called $k$-total mean cordial labeling ...
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##### A generalization of zero-divisor graphs

*Volume 51, Issue 2 , December 2019, , Pages 35-45*

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**Abstract **

In this paper, we introduce a family of graphs which is a generalization of zero-divisor graphs and compute an upper-bound for the diameter of such graphs. We also investigate their cycles and cores
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##### $k$-Total prime cordial labeling of graphs

*Volume 50, Issue 1 , June 2018, , Pages 143-149*

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**Abstract **

In this paper we introduce a new graph labeling method called $k$-Total prime cordial. Let $G$ be a $(p,q)$ graph. Let $f:V(G)\to\{1,2, \ldots, k\}$ be a map where $k \in \mathbb{N}$ and $k>1$. For each edge $uv$, assign the label $gcd(f(u),f(v))$. $f$ is called $k$-Total prime cordial labeling of ...
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##### k-Remainder Cordial Graphs

*Volume 49, Issue 2 , December 2017, , Pages 41-52*

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**Abstract **

In this paper we generalize the remainder cordial labeling, called $k$-remainder cordial labeling and investigate the $4$-remainder cordial labeling behavior of certain graphs.
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##### Remainder Cordial Labeling of Graphs

*Volume 49, Issue 1 , June 2017, , Pages 17-30*

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**Abstract **

In this paper we introduce remainder cordial labeling of graphs. Let $G$ be a $(p,q)$ graph. Let $f:V(G)\rightarrow \{1,2,...,p\}$ be a $1-1$ map. For each edge $uv$ assign the label $r$ where $r$ is the remainder when $f(u)$ is divided by $f(v)$ or $f(v)$ is divided by $f(u)$ according as $f(u)\geq ...
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##### 3-difference cordial labeling of some cycle related graphs

*Volume 47, Issue 1 , June 2016, , Pages 1-10*

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**Abstract **

Let G be a (p, q) graph. Let k be an integer with 2 ≤ k ≤ p and f from V (G) to the set {1, 2, . . . , k} be a map. For each edge uv, assign the label |f(u) − f(v)|. The function f is called a k-difference cordial labeling of G if |νf (i) − vf (j)| ≤ 1 and ...
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##### Further results on total mean cordial labeling of graphs

*Volume 46, Issue 1 , December 2015, , Pages 73-83*