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CO-SEGREGATED POLYNOMIAL OF GRAPHS
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A graph $G$ is co-segregated if $\text{deg}_G(x)=\text{deg}_G(y),$ then $xy \in E(G)$. The co-segregated polynomial of a graph $G$ of order $n$ is given by $CoS(G,x)=\sum_{k=1}^{n}C(k)x^k$, where $C(k)$ is the number of co-segregated subgraphs of $G$ of order $k$. We characterize a co-segregated subgraph of a graph and also of a graph under some binary operations. Using these characterizations, we obtain co-segregated polynomials of such graphs.
Pushpa Publishing House
Title: CO-SEGREGATED POLYNOMIAL OF GRAPHS
Description:
A graph $G$ is co-segregated if $\text{deg}_G(x)=\text{deg}_G(y),$ then $xy \in E(G)$.
The co-segregated polynomial of a graph $G$ of order $n$ is given by $CoS(G,x)=\sum_{k=1}^{n}C(k)x^k$, where $C(k)$ is the number of co-segregated subgraphs of $G$ of order $k$.
We characterize a co-segregated subgraph of a graph and also of a graph under some binary operations.
Using these characterizations, we obtain co-segregated polynomials of such graphs.
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