New Characterization Of (1,2)S_P-Kernel In Bitopological Spaces

New Characterization Of (1,2)S_P-Kernel In Bitopological Spaces

Let J(G)=(V,E) be a jump graph. Let D be a nominal prevailing (dominating) set in a jump graph J(G). If V-D contains a prevailing set D\primeof J(G), then D\prime is called an inverse prevailing set with respect to D. The nominal cardinality of an inverse prevailing set of a jump graph J(G) is calle...

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Bibliographic Details
Main Authors: S Dhanalakshmi, M Maheswari, N Durga Devi
Format: Article
Language:English
Published: Accademia Piceno Aprutina dei Velati 2023-01-01
Series:Ratio Mathematica
Subjects:
(1,2)semi-open, (1,2)pre-open, (1,2)pre-closed, (1,2)s_p-open sets, (1,2)s_p-closed sets, (1,2)s_p-kernel sets, (1,2)s_p-derived sets, (1,2)s_p-shell sets.
Online Access:http://eiris.it/ojs/index.php/ratiomathematica/article/view/991
Description
Summary:Let J(G)=(V,E) be a jump graph. Let D be a nominal prevailing (dominating) set in a jump graph J(G). If V-D contains a prevailing set D\primeof J(G), then D\prime is called an inverse prevailing set with respect to D. The nominal cardinality of an inverse prevailing set of a jump graph J(G) is called inverse domination number of J(G). In this paper, we computed some interconnections betwixt inverse domination number of jump graph for some graphs.
ISSN:1592-7415
2282-8214

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