POLYNOMIALS ON SP-RING
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
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.
 Iseki. K, An On BCI-Algebra,Math Seminar Notes,8(1980), 125-130.
 Iseki. T and Tanaka. S, An Introduction to theBCK-Algebra , Math Japonica 23(1978).
 T. B. Jun, E. H Roh and H.S. Kim, On BH-Algebra, Scietiae Mathematicae 1, No.3(1998), 347-354.
 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.
 K. Shanmuga Priya and M. Mullai, SP-Ring and its Properties.
SP-Polynomial, Primitive, Content, Gauss lemma, Eisenstein criterion..