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Toplam kayıt 7, listelenen: 1-7
Notes On Especial Continued Fraction Expansions and Real Quadratic Number Fields
(2016-06)
The primary purpose of this paper is to classify real quadratic fields Q(?d) which include the form of specific continued fraction expansion of integral basis element ???????????? for arbitrary period length ? = ?(??????) ...
On The Some Particular Sets
(2016-12)
For t an integer, a Pt set is defined as a set of m positive integers with the property that the product of its any two distinct element increased by t is a perfect square integer. In this study, the certain special P-5, ...
NOTES ON ESPECIAL CONTINUED FRACTION EXPANSIONS AND REAL QUADRATIC NUMBER FIELDS
(Kırklareli Üniversitesi, 2016)
The primary purpose of this paper is to classify real quadratic fields Q(?d) whichinclude the form of specific continued fraction expansion of integral basis element ???? forarbitrary period length ? = ?(??) where d ? ...
ON THE SOME PARTICULAR SETS
(Kırklareli Üniversitesi, 2016)
For ?? an integer, a ???? set is defined as a set of ?? positive integers with the property that the product of its any two distinct element increased by ?? is a perfect square integer.In this study, the certain special ...
Common Fixed Point in C*-Algebra b-Valued Metric Space
(Amer Inst Physics, 2016)
In this present paper, we establish the existence and uniqueness of the common fixed point theorem for self-maps in C*-algebra valued b-metric spaces. Besides, we give example to illustrate our theorem. Findings obtained ...
SOME RESULTS ON SPECIAL CONTINUED FRACTION EXPANSIONS IN REAL QUADRATIC NUMBER FIELDS
(Univ Prishtines, 2016)
The aim of this paper is to determine and investigate the continued fractions expansions of wd for the real quadratic number fields Q(root d) for which the period has constant elements that are completely equal to 2 (except ...
A Note on the Fundamental Unit in Some Types of the Real Quadratic Number Fields
(Amer Inst Physics, 2016)
Let k = Q(root d) be a real quadratic numbefield where d > 0 is a positive square-free integer. The map d -> Q(root d) is a bijection from the set off all square-free integers d # 0,1 to the set of all quadratic fields ...