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Simple Acyclic Graphoidal Covering Number In A Semigraph

A simple graphoidal cover of a semigraph is a graphoidal cover of such that any two paths in have atmost one end vertex in common. The minimum cardinality of a simple graphoidal cover of is called the simple graphoidal covering number of a semigraph and is denoted by . A simple acyclic graphoidal cover of a semigraph is an acyclic graphoidal cover of such that any two paths in have atmost one end vertex in common. The minimum cardinality of a simple acyclic graphoidal cover of is called the simple acyclic graphoidal covering number of a semigraph and is denoted by . In this paper we find the simple acyclic graphoidal covering number for wheel in a semigraph, unicycle in a semigraph and zero-divisor graph.

Dewspublication

W. Jinesha D. Nidha

Journal of Namibian Studies : History Politics Culture

2023

Title: Simple Acyclic Graphoidal Covering Number In A Semigraph

Description:

A simple graphoidal cover of a semigraph is a graphoidal cover of such that any two paths in have atmost one end vertex in common.

The minimum cardinality of a simple graphoidal cover of is called the simple graphoidal covering number of a semigraph and is denoted by .

A simple acyclic graphoidal cover of a semigraph is an acyclic graphoidal cover of such that any two paths in have atmost one end vertex in common.

The minimum cardinality of a simple acyclic graphoidal cover of is called the simple acyclic graphoidal covering number of a semigraph and is denoted by .

In this paper we find the simple acyclic graphoidal covering number for wheel in a semigraph, unicycle in a semigraph and zero-divisor graph.

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Simple Acyclic Graphoidal Covering Number In A Semigraph

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