Department of Mathematics, DDE, Madurai Kamaraj University, India. International Journal of Computer Science (IJCS Journal) Published by SK Research Group of Companies (SKRGC) Scholarly Peer Reviewed Research Journals

Format: Volume 6, Issue 1, No 4, 2018

Copyright: All Rights Reserved ©2018

Year of Publication: 2018

Author: K. Shanmuga Priya, M. Mullai


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Algebra acts as one of the building block for mathematics today. In this paper, the concept of Polynomials on SP-Ring has been introduced. The definition of SP-Polynomial, degree of SP-polynomial, primitive SP-Polynomial, irreducible SP-Polynomial, content of SP-Polynomial, some theorems, Gauss lemma and the Eisenstein Criterion are also defined and established.


[1] Iseki. K, An On BCI-Algebra,Math Seminar Notes,8(1980), 125-130.

[2] Iseki. T and Tanaka. S, An Introduction to theBCK-Algebra , Math Japonica 23(1978).

[3] T. B. Jun, E. H Roh and H.S. Kim, On BH-Algebra, Scietiae Mathematicae 1, No.3(1998), 347-354.

[4] Mulai. M and Shanmuga Priya. K, A Note On SP-Algebra, International Conference On Mathematical Modelling and Computational Methods in Science and Engineering Feb-2017.

[5] K. Shanmuga Priya and M. Mullai, SP-Ring and its Properties.


SP-Polynomial, Primitive, Content, Gauss lemma, Eisenstein criterion..

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