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
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 ... Read MorePair mean cordial labeling of graphs
Volume 54, Issue 1 , June 2022, , Pages 1-10
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. Read More$4$-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
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 ... Read MoreA generalization of zero-divisor graphs
Volume 51, Issue 2 , December 2019, , Pages 35-45
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 Read More$k$-Total prime cordial labeling of graphs
Volume 50, Issue 1 , June 2018, , Pages 143-149
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 ... Read Morek-Remainder Cordial Graphs
Volume 49, Issue 2 , December 2017, , Pages 41-52
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. Read MoreRemainder Cordial Labeling of Graphs
Volume 49, Issue 1 , June 2017, , Pages 17-30
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 ... Read More3-difference cordial labeling of some cycle related graphs
Volume 47, Issue 1 , June 2016, , Pages 1-10
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 ... Read MoreFurther results on total mean cordial labeling of graphs
Volume 46, Issue 1 , December 2015, , Pages 73-83