Browsing by Author "Ozturk, Mehmet Ali"
Now showing items 1-7 of 7
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Intuitionistic fuzzy sets in gamma-semigroups
Uckun, Mustafa; Ozturk, Mehmet Ali; Jun, Young Bae (KOREAN MATHEMATICAL SOC, 2007)The notion of a fuzzy set in a set was introduced by L. A. Zadeh [10], and since then this concept has been applied to various algebraic structures. K. T. Atanassov [1] defined the notion of an intuitionistic fuzzy set, ... -
Modules over the generalized centroid of semi-prime gamma rings
Ozturk, Mehmet Ali; Yazarli, Hasret (KOREAN MATHEMATICAL SOC, 2007)The aim of this paper is to introduce modules over the generalized centroid of a semi-prime Gamma-ring. -
A NEW VIEW OF FUZZY GAMMA RINGS
Ozturk, Mehmet Ali; Jun, Young Bae; Yazarli, Hasret (HACETTEPE UNIV, FAC SCI, 2010)The aim of this paper is to define a new kind of fuzzy gamma ring. So the concepts of fuzzy gamma ring, fuzzy ideal, fuzzy quotient gamma ring, and fuzzy gamma homomorphism are introduced. -
A NOTE ON DERIVATIONS IN SUBTRACTION ALGEBRAS
Ozturk, Mehmet Ali; Yazarli, Hasret; Uckun, Mustafa (CHARLES BABBAGE RES CTR, 2016)The aim of this paper is to introduce the notions of f-derivation and symmetric bi-derivation in c-subtraction algebras and to study some properties of these derivations. -
On the centroid of prime semirings
Yazarli, Hasret; Ozturk, Mehmet Ali (SCIENTIFIC TECHNICAL RESEARCH COUNCIL TURKEY-TUBITAK, 2013)We define and study the extended centroid of a prime semiring. We show that the extended centroid is a semifield and give some properties of the centroid of a right multiplicatively cancellable prime semiring. -
PERMUTING TRI-DERIVATIONS IN LATTICES
Ozturk, Mehmet Ali; Yazarli, Hasret; Kim, Kyung Ho (NATL INQUIRY SERVICES CENTRE PTY LTD, 2009)The aim of this paper is to introduce the notion of permuting tri-derivations in lattices and to study some properties of permuting tri-derivations. -
SOME RESULTS ON SYMMETRIC BI-(sigma, tau)- DERIVATIONS IN NEAR-RINGS
Ozturk, Mehmet Ali; Yazarli, Hasret (UNIV MISKOLC INST MATH, 2010)The aim of this paper is to investigate certain results on 3-prime near-rings and generalize these results on near-rings to semi-group ideals of 3-prime near-rings.