H- and H<sub>2</sub>-Cordial Labeling of Some Graphs

doi:10.4236/ojdm.2012.24030

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Open Journal of Discrete Mathematics, 2012, 2, 149-155

http://dx.doi.org/10.4236/ojdm.2012.24030 Published Online October 2012 (http://www.SciRP.org/journal/ojdm)

H- and H2-Cordial Labeling of Some Graphs

Freeda Selvanayagom, Robinson S. Chellathurai

Department of Mathematics, Scott Christian College, Nagercoil, India

Email: freedasam1969@gmail.com, robinchel@rediffmail.com

Received July 31, 2012; revised September 3, 2012; accepted September 25, 2012

ABSTRACT

In this paper we prove that the join of two path graphs, two cycle graphs, Ladder graph and the tensor product 2n



are H2-cordial labeling . Fur ther w e prov e that the join of two wheel graphs Wn and Wm, admits a H-

cordial labeling.



0mod4nm



0,1

Keywords: H-Cordial; H2-Cordial; Join of Two Graphs

1. Introduction

All graphs considered here are finite, simple and undi-

rected. The origin of graph labelings can be attributed to

Rosa. Several types of graph labeling have been investi-

gated both from a purely combinatorial perspective as

well as from an application point of view. Any graph

labeling will have the following three common charac-

teristics. A set of numbers from which vertex labels are

chosen, number of vertices of G having label i

under f. = number of edges of G having label i

under f*.



The concept of cordial labeling was introduced by I.

Cahit, who called a graph G is cordial if there is a vertex

labeling such that the induced label-

 

:fvG

 



ing defined by

:fEG



 

xyf xfy

, for all edges





yEG and

with the following inequalities holding

 

vv1 and

 

ee1.

In [1] introduced the co ncept of H-cordial labelin g. [1]

calls a graph H-cordial if it is possible to label the edges

with the numbers from the set





1, 1 in such a way that,

for some k, at each vertex v the sum of the labels on the

edges incident with v is either k or –k and the inequalities

 

vk vk and





ee1 are also

satisfied where







and e(j) are respectively, the

number of vertices labeled with i and the number of

edges labeled with j. He calls a graph Hn-cordial if it is

possible to label the edges with the numbers from the set

in such a way that at each vertex v, the

sum of the labels on the edges incid ent with v is in the set

and the inequalities



1, 2,,n 



1, 2,,n 







vi vi

and

 

1i

1in



.

In [1]roved that is H-Cordial if and only if n >

2 p,nn

nd and “n” is even; a,,

kmn is H-cordial if and

only if





1mod4n, m is even and m > 2, n > 2.

In [2] provn is H-Cordial if and only if 0n

ed that k







3mod4 and 3n



Wordial if and only if n is odd. kn

Hn is H-cis not

2-cordial if





1mod4n. Also [2] proved that every

wheel has an H-corling.

In [3] several variations of graph labeling such as

gra

1 1

dial labe

ceful, bigraceful, harmonious, cordial, equitable, hum-

ming etc. have been introduced by several authors. For

definitions and terminologies in graph theory we refer to

[4].

1.1. Definition: The j oin G = G1 + G2 of grap h G1 and

G2 with disjoint point sets V1 and V2 and edge sets E1 and

E2 denoted by G = G1 + G2 is the graph union 12

GG

together with all the edges joining v1, v2. If G1 is (p,q)

graph and G2 is (p2,q2) graph then G1 + G2 is (p1 + p2, q1

+ q2 + p1 + p2).

1.2. Definition: Let G1 = (V1, E1) and G2 = (V2, E2) be

two graphs. The Cartesian product of G1 and G2 which is

denoted by 12



is the graph with vertex set v = v1 ×

v2 consisting of vertices









12 12

,, ,Vuuuvvvu 

and v are adjacent in 1



wheuv and u2

adjacent to v2 or u1 adjacent to v1 and



uv.

1.3. Definition: The tensor product 1

GG G of

gr ith disjoint point

never = 1

and

aphs G1 and G2 w sets

edge sets E1 and E2 is the graph with vertex set 12

v1 and v2



such that (u1, u2) is adjacent to (v1, v2) whenever





11 1

,uv E



and





22 2

,uv E. If 1 is (p1, q1

G) gra ph

and G2 is (paph, then

in of tw

2, q2) gr12

G is a (P1P2, 2q1q2).

pesults on

stigated somIn this par we have invee re H-

and H2-cordial labeling for joo graphs, Cartesian

 are also satisfied for each i with ei e

S. FREEDA, R. S. CHELLATHURAI

150

oin of two path graphs P and Pm

beling whe.

he ee

The edge matrix of Pn + Pm is givenn Table 1.

In view of the above labeling pattern we give the poof

h graphs P3 and P2.

the edge label matrix of P3 + P is given by

oduct and tensor product of some graphs.

2. Main Results 1

2.1. Theorem: The j

admits a H-cordial lan



1, 2mod4nm

Proof: Let 12

, ,,n

vv v and 12

, , ,m

uu u are the

two vertex sets of the path graphsdg Pn and Pm. T

of Pn and Pm

t E1 and E2 iunion together

with all the edges joining the vertex sets vi and ui,

1, 2 ,,in.

Define the edge labeling

s the graph



:fEG

 

1,

follows:

1) When



1mod4nm

Consider the join of two pat

Using Table 12

1 1













with respect to the above labeling total number of verti-

ces labeled with



1,1,2



 and 2



 are given by



vn,



vn,



vn and



vn







1122

fff f

vvv v 1, differ by one.

The total number of edges labeled with 1,1,2





and 2



 are given by

  

1, 1, 2(2)

ee ee



 0



 





1122

eefeef 1, differ byne.

Hence the join of two path graphs P3

H2-cordial labeling.

graphs P4 and P2.

U, the edge label maix of P + P is given by

vvv

and P2 admits a

2) When



2mod4nm

Consider the join of two path

sing Table 1tr 4 2

Table 1. Edge matrix of Pn + Pm.



uu u

11 12 1

21 222

1212 231

nn n

vu vu vu

vu vuvu

uuuu uuuu











 



12 23

vv vv





1 1































In view of the above labeling pattern the total number

of edges labeled with







1,1,2





 and 2



 are given

















12,12,220

enene 0,e

ff f

 

















1122

fff f

eee e0 by zero.

The total number of vertices labeled with

, differ



1,1,2







and 2





are given by













14,14,25

ff f

nvnv nv



  and







.













11220

fff f

v vvv



 

, differ by zo.

Thus in each cases we have













11221

fff f

vv vv



  and













11221

fff f

eee e



 .

Hence the jo of two path graphs P4 and P2 admits a

H2-cordial labeling of graphs.

In Figure 1 illustrates the H-cordial lab

Ages receive the label +1

and the other six edges receive the . The in-

duced vertex labels are given in the figure.

2.2. Theorem: The join of two cycle graphs Cn and Cm

mong the twelve edges, six edeling on P4 + P2.

label 1

mits a H2-cordial labeling when

1 -1 -

-1 1 2 -1 -2 -1 -1

-1

-1 1

-1

-1 1

Figure 1. H2-cordial labeling on P4 + P2.

S. FREEDA, R. S. CHELLATHURAI 151



1, 3mod 4,,3nm nm 

Proof: Let and are the

vertex set of cmedge sets

E1 and E2of cnwith all

the edges joi and

We note that

, ,,n

vv v

ycles cn and c

is the graph union

ning the vert

, , ,m

uu u

respectively. The

and cm together

ex sets 12

, ,vv,n

, , ,m

uu u.



VGp p and



12 12

.EGq qpp

Define 1

The edge matrix table of

 

:1,fEG.



is given in Table 2.

In view of the above labelin we give the proof

as follows.

Case (1) when

Consid.

Using Table 2 the edge lable matrix of c3 and c4 is



11

f the above labeling pattern the total number

g pattern



3mod4,, 3nm nm .

er the join of two cycle graphs c3 and c4

ven by

1234

1 1 1 1

uuuu









v 1







1 1 1

11 11 11 11





 



In view o

edges labeled with 1,1,2





nd 2



 a re given by

   

1, 1, 20, 20.

ff ff

ee ee



 

 





11ee er 221

fff f

e e , diffby one.

The total number vertices labeled with 1,1,2





and 2



 are given by

 





15,15,2

ff f

vnvnv n 5 and



vn.







1122

fff f

vvv v 1, diffeby one.

Thus in each cases we have







1122

fff f

vvv v 1 and







11221

fff f

eee e .

Hence the join of traphs cd c4 admits a



wo cycle g3 an

H2-cordial labeling.

Table 2. Edge matrix of cn +

v





12 1

vv vv

cm.

11 31

21222 32

12 1122311

, ,,

nn nm

vu vuvu

uu uuuu uuuuuu











 





123

11 12

uuu u

vu vu



nnn

vv v v





12 23

vv vv

Case (2) when





4, ,3nm1modnm



.

Consider the d c4.

Using Table 2 the edge label matrix of + c4 is give n by

join of two cycle graphs c5 an

1234

uuuu







1 1 1

1 1 1 1



 





11 11 11 11





1 1 1 1





















 

In view of the above labeling pattern the total number

of edges labeled with



11

1,1,2





 and 2



 a re given by

   

11nn

1 ,20.

ee ee

 















11220

fff f

eee e



 , differ by zero.

1,1,2





 The total number of vertices labeled with

and 2





are given by









17,1

vnv n7













26,2

vnv n7

















1122

fff f

vvv v1



 , differ by one.

Thus in each cases we have













1122

fff f

vvv v1



  and













11 21

ee e2

f f



 .

Hence the join of two cycle graphs c5 and c4 admits a

H2-cordial labeling.

In Figure 2 illustrates the H2-cordial

Ce the label

ourteen edges receive the label

labeling on C5 +

4. Among the 29 edges, fifteen edges receiv

+1 and the remaining f



. The induced vertex labels are given in the figure.

2.3. Theorem : The join of two wheel graphs W and

Wm admits a H-cordial labeling whenn





0mod4nm

,u are the ver-

Proof: Let and

tex set of thph W

an gether with all

the edges joinivertex set d

, ,,n

vv v

e wheel gra

ng the

u. We note th

, ,uu

n and Wm.

n and Wm to

, ,vv



The edge set E1

d E2 is the graph union of W,n

v an

, , ,uu12

VGp p and





12 1

EGq qpp 2

Define









:1,1fEG

The edge matrix is given in.

In the view of the above labeling pattern we give the

proof as follows:

when

Tabl e 3





0mod4nm

Consider the join of two wheel graphs W and W. U

4 4

g Table 3 the edge label matrix of W4 + W4 is given by

S. FREEDA, R. S. CHELLATHURAI

152

-1 -1

1-1 1

-1 -1 11

-1

-2 2-2

1-1 1-1

-1

-1 1

-1 -1

-1

-1 1

1-1

Figure 2. H2-cordial labeling on C5 + C4.

Table 3. Edge matrix of Wn + Wm.

v1213 1

,, n

vvv vvv



11 121

21 222

12 13112231121

nn nm

mmmm

uuu

vu vu vu

vu vuvu

vu vu vu

uu, uuuuuuu uuu uuuuuu











 





12 2 32

121

nnn

vvv vv

vv vvv v









S. FREEDA, R. S. CHELLATHURAI 153

1

In view of the above labeling pattern we give the proof

as follows.

The total number of edges labeled with

123

1 1 1 1

111

uuuu



















 111 111 1 11 

1 1

111







 and 1





are given by



en,





en

 

ee0, differ by zero. Thtal num

of vertices labeled with

e tober

 and 1



 are gien by v



vn and



vn

 

110

, differ by

vv zer

Thus in each cases we have



vv1 and

 

111

e.

Hence the join of two wheel graphs w4 and w4 admits a

H-

rin 4 +

he twenty

ceive the label +1 an

figure.

2.4 Theorem: known as ladder

gra .

where n is

and

cordial labeling.

In Figure 3 illustrates the H-codial labelg on W

W4. Among trtee eight edges, foun edges re-

d the other fourteen edges receive

the label 1. The induced vertex labels are shown in the

PP (also

ven n

ph) is H2-Cordial labeling for e

Proof: Let G be the graph even

i2n

PP

and



1, 2

VG Vnj  be the

vertices of G.





1, 2,,

We note that



2VGn and



32EG n.

Define

 

:1,1fEG as follows

Case (1) When



0mod4n

For 1, 1n ik



fvv 

For 1,nikn



1fvv 

For 1,ik

1n



2, 2

fv v

For n1,ik

2) when



2, 2

fv v

For 11in 



fvv 

For 1ni



fvv 

Case (

For



2mod4n

2n1,ik



fvv 

-1

1-1

-1

-1 1

-1

-1 -1

-1

-1 1

-1

-1 -11

-1 1

-1-1

-1 -111

Figure 3. H-cordial labeling on W4 + W4.





fv v



For n2,nik









fvv









fv v





12in



 For





fvv





S. FREEDA, R. S. CHELLATHURAI

154

For n

In view of the above defined labeling pattern we give

the proof as follo ws.

The total number of edges labeled with

2,ni



fvv 

1,1,2







and 2



 are given by





en



en ,

 



 



 





1122

fff f

e e 

The total number of vertices labeled with

, differ by zero.

ee

and 1





 and 2



 are given by















1 142;

242,24

vv n

vnvn



  







1122

fff f

vvv v 0

differ by zero.

Thus in each cases we have

 





1122

fff f

vvv v  1

  

1122

fff f

eee e  1

Hence the ladder graph 2n



admits a H2- cordia

labeling.

In Fig ling on

. Among the ten edges, five edges receive the la-

nd otherfive edges receive the label

ure 4 illustrates the H2-cordial labe



bel +1 a

PP 1



. The

in vertex labels are shown in the figure.

2.5 Theorem: The tensor product is H2-cor-

dial labeling.

Proof: Let G be e graph and

be the verti-

ote that

duced

PP

th 2n

PP

and 1j



,G



1 2,,,2

Vuv in

ces of G.

We n



2VGn and



22EGn

ne 1

two cases are to be con-

sidere

Defi 



 

:1,fE

-1

11 12

-1

-2 -2

-1 -1

-1 -

242

Case

Figure 4. H-cordial labeling on P × P.

(1). When n is even

For 1in





1,if1mod 2i







112

,1, if1 mod

vuv i

 





For 1in









1,if1mod 2

,1, if2

uv i



 











When n is odd



1 mod

Case (2)

For 1in



For



112

1,if1, 3mod4

,1,if0,2mod 4

fuvuv i









 





1in



In view of the above defined labeling pattern we give

the proof as follo ws.

The total number of edges labeled with



211

1,if1, 3mod 4

,1,if0,2 mod4

fuvuv i



 











1,1,2







are given by



en



en

and 2













220

















1122

fff f

e e0ee



 

The total number of vertices labeled with

, differ by zero.

1 ,1 ,2







and 2





are given by













 

1 182;

242,24

vv n

vnvn



  2.

-1

-2 2

-2

-2 2

Figure 5. Hrdial labeling on P P2.

-1 UV

1-1

2-co

4

S. FREEDA, R. S. CHELLATHURAI

155







1122

fff f

vvv v  0differ by zero.

Thus in each cases we have

 





112

ff f

vv v 21

v 

  

11221

fff f

eee e 

Hence the tensor product 2n

PP admits a H2-cordial

beling.

In Figure 5 illustrates the H2-cordial labeling on

. Among the eight edges four edges receive the

nd the other four edges receive the label

PP

label +1 a1



The induced vertex labels are shown in the figure.

3. Concluding Remarks

Here we investigate H- and H2-cordial labeling for join

of path graphs, cycle graphs, wheel graphs, Cartesian

product and tensor product. Similar re

riv and in the context of dif-

fere opn area of research.

REFERENCES

[1] hs,” Bu

inatorics and Its Applications, Vol. 18, 1996, pp.

[2] M

[3] J. A. Gallian, “A Dynamic Survey of Graph Labeling,”

ombinations, Vol. 18, 2011.

sults can be de-

ed for other graph families

nt graph labeling problem is ane

I. Cahit, “H-Cordial Graplletin of the Institute of

Comb

87-101.

. Ghebleh and R. Khoeilar, “A Note on ‘H-Cordial

Graphs,’” Bulletin of the Institute of Combinatorics and

Its Applications, Vol. 31, 2001, pp. 60-68.

The Electronics Journal of C

[4] D. B. West, “Introduction to Graph Theory,” Prentice-

Hall of India Pvt. Ltd., Delhi, 2001.