SIGNED GRAPHS FROM PROPER
COLORING OF GRAPHS
Divya Antoney*
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
divya.antoney@res.christuniversity.in
Tabitha Agnes Mangam
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
tabitha.rajashekar@christuniversity.in
Mukti Acharya
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
mukti1948@gmail.com
Reception: 29/03/2023 Acceptance: 22/05/2023 Publication: 12/06/2023
Suggested citation:
Antoney, D., Mangam, T. A. and Acharya, M. (2023). Signed graphs from
proper coloring of graphs. 3C Tecnología. Glosas de innovación aplicada a
la pyme, 12(2), 148-161. https://doi.org/10.17993/3ctecno.2023.v12n2e44.148-161
https://doi.org/10.17993/3ctecno.2023.v12n2e44.148-161
3C Tecnología. Glosas de innovación aplicadas a la pyme. ISSN: 2254-4143
Ed.44 | Iss.12 | N.2 April - June 2023
148
SIGNED GRAPHS FROM PROPER
COLORING OF GRAPHS
Divya Antoney*
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
divya.antoney@res.christuniversity.in
Tabitha Agnes Mangam
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
tabitha.rajashekar@christuniversity.in
Mukti Acharya
Department of Mathematics CHRIST (Deemed to be University) Bengaluru, India.
mukti1948@gmail.com
Reception: 29/03/2023 Acceptance: 22/05/2023 Publication: 12/06/2023
Suggested citation:
Antoney, D., Mangam, T. A. and Acharya, M. (2023). Signed graphs from
proper coloring of graphs. 3C Tecnología. Glosas de innovación aplicada a
la pyme, 12(2), 148-161. https://doi.org/10.17993/3ctecno.2023.v12n2e44.148-161
https://doi.org/10.17993/3ctecno.2023.v12n2e44.148-161
ABSTRACT
Let denote the chromatic number of a graph . Under the proper coloring of a
graph G with
colors, we define a signed graph from it. The obtained signed
graph is defined as parity colored signed graph and denoted as
. The signs of
edges of are defined from the colors of the vertices as if the colors on the
adjacent vertices are of the same (opposite) parity. In this paper, we initiate a study on
. We further investigate the chromatic rna number of some classes of graphs
concerning proper coloring.
KEYWORDS
Signed graph, parity colored signed graph of a graph, chromatic rna number.
INDEX
χ(G)
G
χ(G)
Sc
G
+( −)
Sc
ABSTRACT
KEYWORDS
1. INTRODUCTION
1.1. Preliminaries
2. RESULTS ON Sc
3. CHARACTERIZATION OF Sc
4. CHROMATIC rna NUMBER
5. CONCLUSION
6. ACKNOWLEDGMENT
REFERENCES
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3C Tecnología. Glosas de innovación aplicadas a la pyme. ISSN: 2254-4143
Ed.44 | Iss.12 | N.2 April - June 2023
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1. INTRODUCTION
In this paper, we consider simple connected graphs. The smallest positive integer
such that such that whenever ab is an edge in
is called the chromatic number of and it is denoted by .
In [7], the concept of a signed graph has been introduced. Let
be a
signed graph with the signature of , where
is the
underlying graph of . The edges of receiving sign are called the positive
(negative) edges of . A signed graph is all positive (negative) if all the edges of are
positive (negative). A homogeneous signed graph is a signed graph in which either all
the edges are positive or all negative and heterogeneous, otherwise.
denotes the negative (positive) edge set of the signed graph and
is the edge set. In [2], by the negation, we mean a signed
graph obtained by reversing the sign of every edge . By we
mean the number of negative (positive) edges incident to
and
. The positive (negative) edges in
are represented by solid
(dashed) line segments as shown in Figure 1. The negative section of a signed is
the maximal connected edge-induced subgraph in
consisting of only the negative
edges as defined in [2].
Motivated by the definition of rna number
[3], we initiate the concept of
chromatic rna of . For a detailed study of the rna number, we refer to [4,9–11]. The
signed graphs and are isomorphic if there exists a one-to-
one correspondence between the vertex sets which preserves adjacency and signs
on it.
A triangular Snake graph is obtained from a path on vertices in which
every edge is replaced by a triangle. The sign of a cycle (path) in a signed graph is
the product of the signs of its edges. A cycle is said to be positive if the product of the
signs of the edges is positive or the cycle has an even number of negative edges. A
signed graph is said to be balanced if all the cycles in are positive [7]. Therefore,
acyclic signed graphs are always balanced. Two vertices and of
are of the
same parity if their colors and are both odd or both even and of opposite
parity otherwise [4].
Motivated by the concept of set coloring in signed graphs [1] and induced signed
graphs [5], we initiate a study on of a graph. We refer to [6,8,12,13] for our study.
Throughout the paper, by we mean parity colored signed graph of a graph.
1.1. PRELIMINARIES
Definition 1.1. Let be a set of colors and be
an onto function. Then parity colored signed graph of a graph (
, in short) is
defined by taking the signature function for every edge in as:
k
f:V(G)→{1,2,…, k}
f(a)≠f(b)
G
G
χ(G)
S= (G,σ)
σ:E(G)→{+,−}
G
G
S
G
+( −)
S
S
E−(S)(E+(S))
E(S)=E−(S)∪E+(S)
η(S)
S
S
d−(v)(d+(v))
v
d(v) = d−(v)+d+(v)
S
S
S
S
σ−(G)
G
S= (G,σ)
S′ =(H,σ′
)
TS(L)
L+ 1
S
S
u
v
Sc
c(u)
c(v)
Sc
Sc
A= {1,2,…, χ(G)}
c:V(G)→A
G
Sc
uv
G
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150
1. INTRODUCTION
In this paper, we consider simple connected graphs. The smallest positive integer
such that such that whenever ab is an edge in
is called the chromatic number of and it is denoted by .
In [7], the concept of a signed graph has been introduced. Let be a
signed graph with the signature of , where is the
underlying graph of . The edges of receiving sign are called the positive
(negative) edges of . A signed graph is all positive (negative) if all the edges of are
positive (negative). A homogeneous signed graph is a signed graph in which either all
the edges are positive or all negative and heterogeneous, otherwise.
denotes the negative (positive) edge set of the signed graph and
is the edge set. In [2], by the negation, we mean a signed
graph obtained by reversing the sign of every edge . By we
mean the number of negative (positive) edges incident to and
. The positive (negative) edges in are represented by solid
(dashed) line segments as shown in Figure 1. The negative section of a signed is
the maximal connected edge-induced subgraph in consisting of only the negative
edges as defined in [2].
Motivated by the definition of rna number [3], we initiate the concept of
chromatic rna of . For a detailed study of the rna number, we refer to [4,9–11]. The
signed graphs and are isomorphic if there exists a one-to-
one correspondence between the vertex sets which preserves adjacency and signs
on it.
A triangular Snake graph is obtained from a path on vertices in which
every edge is replaced by a triangle. The sign of a cycle (path) in a signed graph is
the product of the signs of its edges. A cycle is said to be positive if the product of the
signs of the edges is positive or the cycle has an even number of negative edges. A
signed graph is said to be balanced if all the cycles in are positive [7]. Therefore,
acyclic signed graphs are always balanced. Two vertices and of are of the
same parity if their colors and are both odd or both even and of opposite
parity otherwise [4].
Motivated by the concept of set coloring in signed graphs [1] and induced signed
graphs [5], we initiate a study on of a graph. We refer to [6,8,12,13] for our study.
Throughout the paper, by we mean parity colored signed graph of a graph.
1.1. PRELIMINARIES
Definition 1.1. Let be a set of colors and be
an onto function. Then parity colored signed graph of a graph ( , in short) is
defined by taking the signature function for every edge in as:
k
f:V(G)→{1,2,…, k}
f(a)≠f(b)
G
G
χ(G)
S= (G,σ)
σ:E(G)→{+,−}
G
G
S
G
+( −)
S
S
E−(S)(E+(S))
E(S)=E−(S)∪E+(S)
η(S)
S
S
d−(v)(d+(v))
v
d(v) = d−(v)+d+(v)
S
S
S
S
σ−(G)
G
S= (G,σ)
S′ =(H,σ′
)
TS(L)
L+ 1
S
S
u
v
Sc
c(u)
c(v)
Sc
Sc
A= {1,2,…, χ(G)}
c:V(G)→A
G
Sc
uv
G
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Example 1. In Figure 1(a) we show a proper coloring of a graph and in Figure 1(b)
its .
Figure 1. A graph with its Sc
Definition 1.2. The chromatic rna number of a graph , denoted by , is the
smallest number of negative edges in with respect to any proper coloring of .
2. RESULTS ON Sc
Now we investigate some properties of .
Observation 2.1. is positive homogeneous if
.
From the definition of , we can see that it is not unique. Does there exist a graph
whose Sc is unique? The answer is yes as shown below.
Proposition 2.2. on a complete graph is unique up to isomorphism.
Proof. The chromatic number of is n with as the
vertex coloring. Since is uniquely colored under , there is exactly one on up
to isomorphism.
Theorem 2.3. Every non-trivial of order will have at least one negative edge.
Proof. Let G be a non-trivial graph with and .
Therefore, . If , then there exist at least two vertices colored
with and . Therefore, will have a negative edge between these two vertices. So
let . Under the proper coloring of the graph, there exists a vertex
colored with which is adjacent to vertices colored with .
If the vertex is colored with an odd (even) number, then the edge between and the
vertex colored with is a negative edge in . Hence the result follows.
σ
c(uv) =
{+ , c(u)
and
c(v)
are both odd or both even
−,
Otherwise.
Sc
G
σ−
c(G)
Sc
G
Sc
Sc
∀vi∈V(Sc),c(vi)≡1(mod2)
(c(vi)≡0(mod2))
Sc
Sc
Kn
c:V(Kn)→{1,2,…, n}
Kn
c
Sc
Kn
Sc
n
χ(G)=k≤n
|V(G)|≥2
χ(G)=k≥2
χ(G)=2
1
2
Sc
χ(G)=k> 2
vi
m
{1,2,…m−1,m+ 1,…k}
vi
vi
2(1)
Sc
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The following theorem gives the balanced nature of .
Theorem 2.4. of graph is balanced.
Proof. Consider of and let
represent the colors with odd (even) positive
numbers. If is acyclic, then obviously is balanced. Assume that
contains at
least one cycle. Consider an arbitrary cycle in . Without loss of generality, let
be the cycle on the vertices . Consider a path on the vertices
of the cycle . Then, there are two cases:
Case 1: Under the function , if the end vertices of
are colored with numbers of
the same parity, then of
will have an even number of negative edges, and the
edge between and
will receive a positive sign. We can observe that when
vertices of opposite colors are adjacent in a cycle, it will always induce two negative
edges as seen in Figure 2. Therefore the cycle has an even number of negative
edges.
Figure 2. on
Case 2: Under the function , if the end vertices of
are colored with numbers of
opposite parity, then of
will have an odd number of negative edges and the edge
between and will receive a negative sign as seen in Figure 3.
Figure 3. on
In both cases, any cycle in has an even number of negative edges. Therefore,
is always balanced.
The converse need not be true as we know that positive homogeneous signed
graphs are always balanced. However,
can never be a positive homogeneous
signed graph. This observation leads to the next result.
Sc
Sc
G
Sc
G
oi(ei)
G
Sc
Sc
Ck
G
Ck
v1v2…vkv1
Pk
v1v2…vk
Ck
c
Pk
Sc
Pk
v1
vk
Sc
C7
c
Pk
Sc
Pk
v1
vk
Sc
C7
Sc
Sc
Sc
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The following theorem gives the balanced nature of .
Theorem 2.4. of graph is balanced.
Proof. Consider of and let represent the colors with odd (even) positive
numbers. If is acyclic, then obviously is balanced. Assume that contains at
least one cycle. Consider an arbitrary cycle in . Without loss of generality, let
be the cycle on the vertices . Consider a path on the vertices
of the cycle . Then, there are two cases:
Case 1: Under the function , if the end vertices of are colored with numbers of
the same parity, then of will have an even number of negative edges, and the
edge between and will receive a positive sign. We can observe that when
vertices of opposite colors are adjacent in a cycle, it will always induce two negative
edges as seen in Figure 2. Therefore the cycle has an even number of negative
edges.
Figure 2. on
Case 2: Under the function , if the end vertices of are colored with numbers of
opposite parity, then of will have an odd number of negative edges and the edge
between and will receive a negative sign as seen in Figure 3.
Figure 3. on
In both cases, any cycle in has an even number of negative edges. Therefore,
is always balanced.
The converse need not be true as we know that positive homogeneous signed
graphs are always balanced. However, can never be a positive homogeneous
signed graph. This observation leads to the next result.
Sc
Sc
G
Sc
G
oi(ei)
G
Sc
Sc
Ck
G
Ck
v1v2…vkv1
Pk
v1v2…vk
Ck
c
Pk
Sc
Pk
v1
vk
Sc
C7
c
Pk
Sc
Pk
v1
vk
Sc
C7
Sc
Sc
Sc
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Theorem 2.5. The negation of
is balanced if and only if the underlying graph of
is bipartite.
Proof. Let and
be the parity-colored signed graph and its negation
respectively. Assume that is balanced. Therefore, every cycle in
contains an even number of negative edges. This implies Sc contains an even number
of positive edges. From Theorem 2.4, every cycle in
contains an even number of
negative edges. Now, every cycle of
has an even number of negative and positive
edges. Therefore, the underlying graph of is bipartite.
Assume is a bipartite graph. Therefore, every cycle in
is of even length. From
Theorem 2.4, every cycle in
contains an even number of negative edges. Hence
is balanced.
Remark 1. A subsigned graph of need not be .
Figure 4
The underlying graph of the signed graph in Figure 4(a) has chromatic number 3.
Therefore, the
in Figure 4(a) has at least one positive edge. Furthermore, the
underlying graph of the signed graph in Figure 4(b) has chromatic number 2.
Therefore, the
of Figure 4(b) is negative homogeneous. In Figure 4(a), the edges
and will receive a positive sign. However, the subsigned graph with the same
vertices will receive negative signs only since its chromatic number is 2. Therefore,
the subsigned graph of need not be .
Remark 2. The parity-colored signed graphs of graph need not be isomorphic.
The parity-colored signed graphs of Figure 5(a) are shown in Figure 5(b) and
Figure 5(c). We can observe that they are not isomorphic to each other.
Sc
Sc
Sc
η(Sc)
η(Sc)
η(Sc)
Sc
Sc
Sc
G
G
Sc
η(Sc)
Sc
Sc
Sc
Sc
v3v4
v4v6
Sc
Sc
G
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153
Figure 5
3. CHARACTERIZATION OF Sc
In this section, we will characterize
of some classes of graphs like bipartite
graphs, cycles, and wheels. We also explore the ’chromatic rna’ number of some
classes of graphs concerning proper coloring.
We have already noted that there exists at least one negative edge in .
Therefore, it is impossible to have a positive homogeneous . So we aim at finding a
negative homogeneous .
Theorem 3.1.
is negatively homogeneous if and only if its underlying graph is
bipartite.
Proof. Assume that is negatively homogeneous. From the balanced nature of ,
its vertices can be partitioned into two subsets such that the edges between them are
negative. Therefore, the vertices can be colored with two colors. This implies that the
underlying graph of is bipartite.
The converse is easy to see as is bipartite and we need only two colors to color
its vertices and get a negative homogeneous signed graph. Hence the result.
Corollary 3.2. of is negative homogeneous if and only if is and
being or bipartite graph.
Corollary 3.3. of is negative homogenous if and only if is and
being .
We have seen that
is balanced. Next, we discuss the nature of a negative
section in of a cycle.
Proposition 3.4. The negative section in of a cycle is always of even length
or a whole cycle of even length.
Proof. We know that , when k is even (odd). Therefore, there exists
at least one vertex colored with in . In the proper coloring of
, the vertex
colored with is adjacent to the vertex colored with or
. This will give negative
edges between the vertices colored with and or and . Therefore, the negative
Sc
Sc
Sc
Sc
Sc
Sc
Sc
Sc
G
Sc
G1∘G2
G2
Kn
G1
Km
Sc
G1+G2
G1
Kn
G2
Km
Sc
Sc
Sc
Ck
χ(Ck)= 2(3)
2
Ck
Ck
2
1
3
1
2
2
3
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154
Figure 5
3. CHARACTERIZATION OF Sc
In this section, we will characterize of some classes of graphs like bipartite
graphs, cycles, and wheels. We also explore the ’chromatic rna’ number of some
classes of graphs concerning proper coloring.
We have already noted that there exists at least one negative edge in .
Therefore, it is impossible to have a positive homogeneous . So we aim at finding a
negative homogeneous .
Theorem 3.1. is negatively homogeneous if and only if its underlying graph is
bipartite.
Proof. Assume that is negatively homogeneous. From the balanced nature of ,
its vertices can be partitioned into two subsets such that the edges between them are
negative. Therefore, the vertices can be colored with two colors. This implies that the
underlying graph of is bipartite.
The converse is easy to see as is bipartite and we need only two colors to color
its vertices and get a negative homogeneous signed graph. Hence the result.
Corollary 3.2. of is negative homogeneous if and only if is and
being or bipartite graph.
Corollary 3.3. of is negative homogenous if and only if is and
being .
We have seen that is balanced. Next, we discuss the nature of a negative
section in of a cycle.
Proposition 3.4. The negative section in of a cycle is always of even length
or a whole cycle of even length.
Proof. We know that , when k is even (odd). Therefore, there exists
at least one vertex colored with in . In the proper coloring of , the vertex
colored with is adjacent to the vertex colored with or . This will give negative
edges between the vertices colored with and or and . Therefore, the negative
Sc
Sc
Sc
Sc
Sc
Sc
Sc
Sc
G
Sc
G1∘G2
G2
Kn
G1
Km
Sc
G1+G2
G1
Kn
G2
Km
Sc
Sc
Sc
Ck
χ(Ck)= 2(3)
2
Ck
Ck
2
1
3
1
2
2
3
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section of is of even length and when k is even the cycle will have all negative
edges.
The next theorem gives the characterization of the signed cycle which is the Sc of
its underlying graph.
Theorem 3.5. A signed cycle on k vertices is if and only if satisfies any
one of the following:
(i) is negatively homogeneous for even .
(ii) is heterogeneous for odd with length of each negative section even.
Proof. In , the number of negative sections is equal to the number of positive
sections. Let , be the negative (positive) sections in a signed
cycle.
Case 1: For even , is a bipartite graph. From Theorem 3.1, of is negative
homogeneous. Hence (i) follows.
Case 2: For odd , is heterogeneous. From Proposition 3.4, the length of each
negative section is even. Hence (ii) follows.
Figure 6. of and
Sufficiency is easy to see in Figure 6.
The next theorem gives the characterization of
on a wheel having an odd
number of vertices.
Theorem 3.6. A signed wheel for an odd integer is if and
only if satisfies any one of the following:
Ck
Ck
Sc
Ck
Ck
k
Ck
k
Ck
l
ni
(
lpi
)
,1 ≤i≤
⌊k
2⌋
k
Ck
Sc
Ck
k
Ck
Sc
C4
C7
Sc
Wn=Cn−1+K1
n
Sc
Wn
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(i) is positive homogeneous and .
(ii) is negative homogeneous, and
the distance between the vertices which are the end vertices of the positive
edge lying on the Cn−1 is two.
Proof. We know that ( is odd). The vertices of can be colored in
two ways such that the edges of are either positive (negative) homogeneous. If
the vertices on the cycle are colored with 1 and 3 (1 and 2 or 2 and 3), then is
positive (negative) homogeneous respectively.
Case 1: If is positive homogeneous, the vertex of will be colored with 2
only and the edges joining K1 to all the vertices of are negative.
Therefore, . Thus (i) holds.
Case 2: If is negative homogeneous, then the vertex of can be colored
with 1 or 3. Then the edges joining to all the vertices of are negative (positive)
depending upon the colors on the and it is easy to see that the distance between
any two vertices lying on which have a positive edge incident on them is two. We
can observe that and .
Therefore, . Thus (ii) holds.
Figure 7. of
Sufficiency part is easy to see in Figure 7.
Cn
E−
(
Wn
)
=E+
(
Wn
)
Cn−1
E−
(
Wn
)
|−|E+
(
Wn
)
=n−
1
χ(Wn)= 3
n
Cn−1
Cn−1
Cn−1
Cn−1
K1
Cn−1
E
−(
Wn
)
=E
+(
Wn
)
Cn−1
K1
K1
Cn−1
Cn−1
Cn−1
E−
(
Wn
)
=n−1 +
n−1
2
E+
(
Wn
)
=
n−1
2
E−
(
Wn
)
|−|E+
(
Wn
)
=n−
1
Sc
W7
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156
(i) is positive homogeneous and .
(ii) is negative homogeneous, and
the distance between the vertices which are the end vertices of the positive
edge lying on the Cn−1 is two.
Proof. We know that ( is odd). The vertices of can be colored in
two ways such that the edges of are either positive (negative) homogeneous. If
the vertices on the cycle are colored with 1 and 3 (1 and 2 or 2 and 3), then is
positive (negative) homogeneous respectively.
Case 1: If is positive homogeneous, the vertex of will be colored with 2
only and the edges joining K1 to all the vertices of are negative.
Therefore, . Thus (i) holds.
Case 2: If is negative homogeneous, then the vertex of can be colored
with 1 or 3. Then the edges joining to all the vertices of are negative (positive)
depending upon the colors on the and it is easy to see that the distance between
any two vertices lying on which have a positive edge incident on them is two. We
can observe that and .
Therefore, . Thus (ii) holds.
Figure 7. of
Sufficiency part is easy to see in Figure 7.
Cn
E−(Wn)=E+(Wn)
Cn−1
E−(Wn)|−|E+(Wn)=n−1
χ(Wn)= 3
n
Cn−1
Cn−1
Cn−1
Cn−1
K1
Cn−1
E−(Wn)=E+(Wn)
Cn−1
K1
K1
Cn−1
Cn−1
Cn−1
E−(Wn)=n−1 + n−1
2
E+(Wn)=n−1
2
E−(Wn)|−|E+(Wn)=n−1
Sc
W7
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Theorem 3.7. A signed graph on is if and only if the following conditions
hold:
(i) Every cycle in has exactly two negative edges and
(ii) For a vertex whose , its
is either 4 or 2, and
is due to two negative edges incident at lying in two adjacent
triangles.
Proof. Assume that is . We know that . From the definition
of , each triangle of will have 2 negative edges. Hence (i) follows.
Now we prove (ii), let vertex whose has . That
is, there is an edge in a triangle whose end vertices receive same color. This is a
contradiction. Similarly we can show that and . Therefore,
can be or . In other words, or . If and two negative edges
lie in the same triangle then the adjacent triangle will have exactly one negative edge,
which is not possible. Thus
is due to the negative edges lying in two
adjacent triangles. When , the proof is easy to see. Thus (ii) follows.
Figure 8. of
Further sufficiency is easy to see. of
is shown in Figure 8. Hence the
proof.
4. CHROMATIC RNA NUMBER
Definition 4.1. The chromatic rna number of a graph , denoted by , is the
smallest number of negative edges in with respect to any proper coloring of .
We investigate the ‘chromatic rna’ number of bipartite graphs, complete graphs,
multipartite graphs, and cycle-related graphs.
Proposition 4.2. For any bipartite graph .
Proof. From Theorem 3.1,
of a bipartite graph is negative homogeneous.
Therefore, .
Proposition 4.3. For any complete graph ,
TS(L)
Sc
TS(L)
v∈V(TS(L))
d(v) = 4
d−(v)
d(v)=2
v
TS(L)
Sc
χ(TS(L)) = 3
Sc
TS(L)
v∈V(TS(L))
d(v) = 4
d+(v) = 4
d+(v)≠3
d+(v)≠1
d+(v)
2
0
d−(v)=2
4
d−(v)=2
d−(v)=2
d−(v) = 4
Sc
TS(3)
Sc
TS(3)
G
σ−
c(G)
Sc
G
B,σ−
c(B)=|E(B)|
Sc
σ−
c(B)=|E(B)|
Kn
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Proof. From Proposition 2.2, the of a complete graph, is unique up to
isomorphism. We know that . Let be the set of vertices colored with
even (odd) positive integers from the set . The edges of that occur
across the set receive a negative sign. That is, the total number of negative
edges is .
Case 1: When is even, . Hence, .
Therefore, .
Case 2: When is odd, . Hence, .
Therefore, . Hence de proof
Proposition 4.4. For any complete r-partite graph ,
Proof. From Proposition 2.2, the Sc of a complete r-partite graph, is unique
up to isomorphism and its chromatic number is . Let be the set of vertices
colored with even (odd) positive integers from the set . The edges of
will receive a negative sign if and only if they occur between the sets and
. Since each set has n elements, the total number of negative edges is .
Case 1: When is even, . Hence, .
Therefore, .
Case 2: When is odd, . Hence, .
Therefore, . Hence the proof.
We observe that the chromatic rna number of bipartite graphs, complete graphs,
and complete multipartite graphs with respect to proper coloring is equal to the
number of negative edges in them respectively. Next, we discuss a class of graphs for
which it does not hold true.
Proposition 4.5. For any cycle ,
σ
−
c(Kn)=
n2
4,n is even.
n2−1
4
,n
is odd
Sc
Kn
χ(Kn)=n
X(Y)
{1,2,…, n}
Kn
X(Y)
|X∥Y|
n
|
X|=|Y|=
n
2
|
X∥Y|=
n2
4
σ
−
c(Kn)=
n2
4
n
|
X|=
n−1
2
,|Y|=
n+ 1
2
|
X||Y|=
n2−1
4
σ
−
c(Kn)=
n2−1
4
Kn,n,…,n
σ
−
c(Kn,n,…n)=
r2
4n2,r is even
r2−1
4
n2,r
is odd
Kn,n,…,n
r
X(Y)
{1,2,…, r}
Kn,n,…,n
X
Y
|X∥Y|n2
r
|
X|=|Y|=
r
2
|
X∥Y|=
r2
4
σ
−
c(Kn,n,…n)=
r2
4
n
2
r
|
X|=
r−1
2
,|Y|=
r+ 1
2
|
X∥Y|=
r2−1
4
σ
−
c(Kn,n,…nn)
r2−1
4
n
2
Ck
σ
−
c(Ck)=
{k,k is even.
2, k is odd.
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Proof. From Proposition 2.2, the of a complete graph, is unique up to
isomorphism. We know that . Let be the set of vertices colored with
even (odd) positive integers from the set . The edges of that occur
across the set receive a negative sign. That is, the total number of negative
edges is .
Case 1: When is even, . Hence, .
Therefore, .
Case 2: When is odd, . Hence, .
Therefore, . Hence de proof
Proposition 4.4. For any complete r-partite graph ,
Proof. From Proposition 2.2, the Sc of a complete r-partite graph, is unique
up to isomorphism and its chromatic number is . Let be the set of vertices
colored with even (odd) positive integers from the set . The edges of
will receive a negative sign if and only if they occur between the sets and
. Since each set has n elements, the total number of negative edges is .
Case 1: When is even, . Hence, .
Therefore, .
Case 2: When is odd, . Hence, .
Therefore, . Hence the proof.
We observe that the chromatic rna number of bipartite graphs, complete graphs,
and complete multipartite graphs with respect to proper coloring is equal to the
number of negative edges in them respectively. Next, we discuss a class of graphs for
which it does not hold true.
Proposition 4.5. For any cycle ,
σ−
c(Kn)=
n2
4,n is even.
n2−1
4,n is odd
Sc
Kn
χ(Kn)=n
X(Y)
{1,2,…, n}
Kn
X(Y)
|X∥Y|
n
|X|=|Y|=n
2
|X∥Y|=n2
4
σ−
c(Kn)=n2
4
n
|X|=n−1
2,|Y|=n+ 1
2
|X||Y|=n2−1
4
σ−
c(Kn)=n2−1
4
Kn,n,…,n
σ−
c(Kn,n,…n)=
r2
4n2,r is even
r2−1
4n2,r is odd
Kn,n,…,n
r
X(Y)
{1,2,…, r}
Kn,n,…,n
X
Y
|X∥Y|n2
r
|X|=|Y|=r
2
|X∥Y|=r2
4
σ−
c(Kn,n,…n)=r2
4n2
r
|X|=r−1
2,|Y|=r+ 1
2
|X∥Y|=r2−1
4
σ−
c(Kn,n,…nn)r2−1
4n2
Ck
σ−
c(Ck)={k,k is even.
2, k is odd.
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Proof. For any cycle , we have the following two cases:
Case 1: The cycle on the even number of vertices is a bipartite graph. From
Theorem 3.5, the of the cycle is negatively homogeneous.
Therefore, ( is even).
Case 2: Let the vertices of the cycle be vi such that and
. From Theorem 2.3 and Theorem 2.4, is balanced,
and will have at least one negative edge. Therefore, at least two negative edges
exist in . Let the edges be v1vk, and . Since the chromatic number of the
odd cycle is three, let be the vertex coloring function.
Consider the following coloring.
The vertices are colored with . The vertices are
colored with , and the vertex is colored with . This coloring gives two negative
edges in the . Therefore, ( is odd).
Proposition 4.6. Le is a graph having k cycles with exactly one vertex in
common and the length of each cycle is greater than or equal to . If m cycles are of
odd length and the remaining cycles are of even length then,
Proof. Consider a graph having k cycles with exactly one vertex in common. We
arrange the cycles in such a way that the first m cycles are of odd length and the
remaining cycles are of even length.
Case 1: If contains cycles only on an even number of vertices, then is a
bipartite graph. From Theorem 3.5, .
Case 2: If contains cycles only on the odd number of vertices, then .
From Theorem 3.5, cycles on the odd number of vertices will have a minimum of two
negative edges. From Proposition 4.5, .
Case 3: If contains cycles on odd and even numbers of vertices, then clearly
. In this case cycles on even number vertices can be colored with 1 and 3
such that they have zero negative edges. From Proposition 4.5, cycles on the odd
number of vertices will have a minimum of two negative edges. Therefore,
. Hence the proof.
Proposition 4.7. For a triangular snake graph .
The following result gives the characterization of a graph with respect to a specific
rna number associated with it.
Ck
Sc
σ−
c(Ck)=k
k
vivi+1 ∈E(Ck)
vkv1∈E(Ck)∀i,1 ≤i<k
Ck
Ck
Ck
vk−1vk
C:V(Ck)→{1,2,3}
v1,v3, …vk−2
1
v2,v4, …vk−1
3
vk
2
Ck
σ−
c(Ck)= 2
k
G
3
σ
−
c(G) =
|E(G)|,
If all cycles are even.
2k, If all cycles are odd.
2
m
,
otherwise
G
G
G
σ−
c(G)=|E(G)|
G
χ(G)=3
σ−
c(G)=2k
G
χ(G)=3
σ−
c(G)=2m
TS(L), σ−
c(TS(L)) = 2L
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159
Proposition 4.8. if and only if is .
We know that there exists more than one graph whose rna number is , for
. Is it possible to construct with a given rna number? The answer is yes.
Theorem 4.9. There exists for every natural number n such that σc−(G) = n.
Proof. For every n ∈ N, consider a path on vertices. From Theorem 3.1,
the path is always negative homogeneous. Therefore, there exists with a given rna
number.
We also have some other graphs such as with fixed rna numbers.
5. CONCLUSION
In the paper, we have initiated a study on . We have given the characterization of
on some classes of graphs. We have investigated the rna number with respect to
the proper coloring of some classes of graphs and we have also shown the existence
of graphs with a given rna number.
6. ACKNOWLEDGMENT
We thank the referees and express gratitude for their valuable suggestions.
REFERENCES
(1)
Acharya, B. D. (2012). Set-valuations of a signed digraph. Journal of
Combinatorics, Information & System Sciences, 37, 145-167.
(2) Acharya, M. (2017). C- Cordial coloring in Signed Graphs. Electronics Notes of
Discrete Mathematics, 63, 11-22.
(3) Acharya, M., & Kureethara, J. V. (2021). Parity coloring in Signed Graphs. J.
Prime Research in Math., 17(2), 1-7.
(4) Acharya, M., Kureethara, J. V., & Zaslavasky, T. (2021). Characterizations of
some parity signed graphs. Australasian Journal of Combinatorics, 81(1),
89-100.
(5) Aniyan, A., & Sudev, N. K. (2020). Induced Signed Graphs of some classes of
Graphs. Proceedings of the Jangjeon Mathematical Society, 2, 283–291.
(6) Chartrand, G., & Zang, P. (2011). Chromatic Graph Theory. Chapman and Hall/
CRC Press.
(7) Harary, F. (1953). On the notion of balance of a signed graph. Michigan Math. J.,
2(6), 143-146.
(8) Jensen, T. R., & Toft, B. (2011). Graph Coloring Problems. John Wiley and Sons.
(9) Kureethara, J. V. (2020). New developments in the study of parity signed graphs.
AIP Conference Proceedings, 2261(1), 020001.
σ−
c(G)=1
G
P2
n∈ ℕ
n≥2
Sc
Sc
Pn+1
n+ 1
Sc
K1,n
Sc
Sc
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160
Proposition 4.8. if and only if is .
We know that there exists more than one graph whose rna number is , for
. Is it possible to construct with a given rna number? The answer is yes.
Theorem 4.9. There exists for every natural number n such that σc−(G) = n.
Proof. For every n ∈ N, consider a path on vertices. From Theorem 3.1,
the path is always negative homogeneous. Therefore, there exists with a given rna
number.
We also have some other graphs such as with fixed rna numbers.
5. CONCLUSION
In the paper, we have initiated a study on . We have given the characterization of
on some classes of graphs. We have investigated the rna number with respect to
the proper coloring of some classes of graphs and we have also shown the existence
of graphs with a given rna number.
6. ACKNOWLEDGMENT
We thank the referees and express gratitude for their valuable suggestions.
REFERENCES
(1) Acharya, B. D. (2012). Set-valuations of a signed digraph. Journal of
Combinatorics, Information & System Sciences, 37, 145-167.
(2) Acharya, M. (2017). C- Cordial coloring in Signed Graphs. Electronics Notes of
Discrete Mathematics, 63, 11-22.
(3) Acharya, M., & Kureethara, J. V. (2021). Parity coloring in Signed Graphs. J.
Prime Research in Math., 17(2), 1-7.
(4) Acharya, M., Kureethara, J. V., & Zaslavasky, T. (2021). Characterizations of
some parity signed graphs. Australasian Journal of Combinatorics, 81(1),
89-100.
(5) Aniyan, A., & Sudev, N. K. (2020). Induced Signed Graphs of some classes of
Graphs. Proceedings of the Jangjeon Mathematical Society, 2, 283–291.
(6) Chartrand, G., & Zang, P. (2011). Chromatic Graph Theory. Chapman and Hall/
CRC Press.
(7) Harary, F. (1953). On the notion of balance of a signed graph. Michigan Math. J.,
2(6), 143-146.
(8) Jensen, T. R., & Toft, B. (2011). Graph Coloring Problems. John Wiley and Sons.
(9) Kureethara, J. V. (2020). New developments in the study of parity signed graphs.
AIP Conference Proceedings, 2261(1), 020001.
σ−
c(G)=1
G
P2
n∈ ℕ
n≥2
Sc
Sc
Pn+1
n+ 1
Sc
K1,n
Sc
Sc
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(10)
Reshma, R., Gayathri, H., & Rajendran, S. (2021). On some parameters of parity
signed graphs. Turkish Journal of Computer and Mathematics Education, 12(13),
1992-1998.
(11)
Sehrawat, D., & Bhattacharjya, B. (accepted). rna number of some parity signed
generalized Peterson graphs. Communications in Combinatorics and
Optimization.
(12) West, D. B. (1999). Introduction to Graph Theory. Prentice Hall of India.
(13) Zaslavsky, T. (1982). Signed Graphs. Discrete Applied Mathematics, 4(1), 47-74.
https://doi.org/10.17993/3ctecno.2023.v12n2e44.148-161
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Ed.44 | Iss.12 | N.2 April - June 2023
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