IDEAL DIFERENSIAL DAN HOMOMORFISMA DIFERENSIAL
Abstract
Ideal differential is the ideal of differential ring that satisfies if for each a I, and every , (a) I, whereas the differential homomorphism is a commutative homomorphism of rings against each derivation. This paper is presented the properties of differential ideal and differential homomorphism.
Keywords
differential ring, differential ideal, and differential homomorphism.
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Adkins, A.W. and S.H Weintraub, 1992, Algebra: An Approach via Module Theory, Springer-Verlag, New York.
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DOI: https://doi.org/10.20527/epsilon.v6i2.84
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