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Journal of Combinatorics, Information & System Sciences : (A Quarterly International Scientific Journal)

Published in Association with Forum for Interdisciplinary Mathematics

Current Volume: 47 (2022 )

ISSN: 0250-9628

e-ISSN: 0976-3473

Periodicity: Quarterly

Month(s) of Publication: March, June, September & December

Subject: Mathematics

DOI: 10.32381/JCISS

Online Access is free for all life members of JCISS.

400

Prime Correspondence Between a Graded Semiring R And Its Identity Component R1

By : Rosy Joseph , Ram Parkash Sharma

Page No: 41-52

Abstract
The generalization of the results of group theory and ring theory to semirings is a very desirable feature in the domain of mathematics. The analogy between rings graded by a finite group G and rings on which G acts as automorphism has been observed by a number of mathematicians. The results of M. Lorenz and D.S. Passman [3], M. Lorenz, S. Montgomery and L.W. Small [4] proved for the rings with finite groups acting on them were extended by M. Cohen and S. Montgomery [1] for the group graded rings. Motivated by the analogy between the rings graded by a finite group G and rings on which G acts as automorphisms, we have derived certain results for a group graded semiring R, its ring of differences R? , and the smash product R # K[G]*, where R is a Ksemialgebra over a commutative semiring K in [7]. In this paper, we study some fundamental properties of subtractive, prime ideals of a Group graded semiring R and its identity component R1. We establish the existence of fuzzy ideals of R1 corresponding to the fuzzy ideals of R which enables us to settle many results for fuzzy ideals of R and R1.

Authors :
Rosy Joseph :
Department of Mathematics Stella Maris College, 17, Cathedral Road, Chennai
Ram Parkash Sharma : Department of Mathematics, Himachal Pradesh University, Summer Hill, Shimla, India
 

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