The characteristic equation and Wiener index of a compressed zero divisor graph
The Zero divisor Graph of a commutative ring $R$, denoted by $\Gamma[R]$, is a graph whose vertices are non-zero zero divisors of R and two vertices are adjacent if their product is zero. The compressed zero divisor graph $\Gamma_E[R]$ is the (undirected) graph whose vertices are the equivalence cla...
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| creator | Reddy, B. Surendranath Jain, Rupali S Laxmikanth, N |
| description | The Zero divisor Graph of a commutative ring $R$, denoted by $\Gamma[R]$, is
a graph whose vertices are non-zero zero divisors of R and two vertices are
adjacent if their product is zero. The compressed zero divisor graph
$\Gamma_E[R]$ is the (undirected) graph whose vertices are the equivalence
classes such that distinct vertices [r] and [s] are adjacent if and only if rs
= 0. In this paper we derive the characteristic polynomial and Wiener index of
the Compressed zero divisor graph $\Gamma_{E}[\mathbb{Z}_m]$ where $m=p^n$ with
prime $p$. |
| doi_str_mv | 10.48550/arxiv.2001.01218 |
| format | Article |
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a graph whose vertices are non-zero zero divisors of R and two vertices are
adjacent if their product is zero. The compressed zero divisor graph
$\Gamma_E[R]$ is the (undirected) graph whose vertices are the equivalence
classes such that distinct vertices [r] and [s] are adjacent if and only if rs
= 0. In this paper we derive the characteristic polynomial and Wiener index of
the Compressed zero divisor graph $\Gamma_{E}[\mathbb{Z}_m]$ where $m=p^n$ with
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a graph whose vertices are non-zero zero divisors of R and two vertices are
adjacent if their product is zero. The compressed zero divisor graph
$\Gamma_E[R]$ is the (undirected) graph whose vertices are the equivalence
classes such that distinct vertices [r] and [s] are adjacent if and only if rs
= 0. In this paper we derive the characteristic polynomial and Wiener index of
the Compressed zero divisor graph $\Gamma_{E}[\mathbb{Z}_m]$ where $m=p^n$ with
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a graph whose vertices are non-zero zero divisors of R and two vertices are
adjacent if their product is zero. The compressed zero divisor graph
$\Gamma_E[R]$ is the (undirected) graph whose vertices are the equivalence
classes such that distinct vertices [r] and [s] are adjacent if and only if rs
= 0. In this paper we derive the characteristic polynomial and Wiener index of
the Compressed zero divisor graph $\Gamma_{E}[\mathbb{Z}_m]$ where $m=p^n$ with
prime $p$.</abstract><doi>10.48550/arxiv.2001.01218</doi><oa>free_for_read</oa></addata></record> |
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| subjects | Mathematics - Rings and Algebras |
| title | The characteristic equation and Wiener index of a compressed zero divisor graph |
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