Publications & Works

Articles Published in Journals That Entered SCI, SSCI and AHCI Indexes

S-Semiprime Submodules and S-Reduced Modules

JOURNAL OF MATHEMATICS, vol.2020, 2020 (Journal Indexed in SCI) identifier identifier

ESSENTIAL SUPPLEMENTED LATTICES

MISKOLC MATHEMATICAL NOTES, vol.21, no.2, pp.1013-1018, 2020 (Journal Indexed in SCI) identifier identifier

A GENERALIZATION OF g-SUPPLEMENTED MODULES

MISKOLC MATHEMATICAL NOTES, vol.20, no.1, pp.345-352, 2019 (Journal Indexed in SCI) identifier identifier

Some criteria on invariant values

MAEJO INTERNATIONAL JOURNAL OF SCIENCE AND TECHNOLOGY, vol.12, no.2, pp.101-111, 2018 (Journal Indexed in SCI) identifier identifier

On the transcendence of some power series

ADVANCES IN DIFFERENCE EQUATIONS, 2013 (Journal Indexed in SCI) identifier identifier

Divisibility Criteria for Class Numbers of Imaginary Quadratic Fields Whose Discriminant Has Only Two Prime Factors

ABSTRACT AND APPLIED ANALYSIS, vol.1, pp.1-4, 2012 (Journal Indexed in SCI Expanded)

Articles Published in Other Journals

Amply Essential Supplemented Modules

Journal of Scientific Research and Reports, no.21, pp.1-4, 2018 (Refereed Journals of Other Institutions)

Essential Supplemented Modules

International Journal of Pure and Applied Mathematics, no.120, pp.253-257, 2018 (Refereed Journals of Other Institutions)

An Algorithm for Explicit Form of Fundamental Units of Certain RealQuadratic Fields

J. Analysis & Number Theory, no.4, pp.23-27, 2016 (Journal Indexed in ESCI)

On Class Numbers of Real Quadratic Fields With Certain Fundamental Discriminants

European J. Pure Appl. Math. Vol. 8, no:4, no.8, pp.526-529, 2015 (Journal Indexed in ESCI)

On Class Numbers of Real Quadratic Fields with Certain Fundamental Discriminants

EUROPEAN JOURNAL OF PURE AND APPLIED MATHEMATICS, vol.8, no.4, pp.526-529, 2015 (Journal Indexed in ESCI) identifier

An Algorithm for Explicit Form of Fundamental Units of Certain Real Quadratic Fields and Period Eight

EUROPEAN JOURNAL OF PURE AND APPLIED MATHEMATICS, vol.8, no.3, pp.343-356, 2015 (Journal Indexed in ESCI) identifier

Explicit Form of Fundamental Units of Certain Real Quadratic Fields

EUROPEAN JOURNAL OF PURE AND APPLIED MATHEMATICS, vol.7, pp.55-64, 2014 (Refereed Journals of Other Institutions)

Explicit Form of the Fundamental Units of Certain Real Quadratic Fields

European J. Pure Appl. Math, no.7, pp.55-64, 2014 (Refereed Journals of Other Institutions)

; Class Number Odd Problem for Real Quadratic Fields Fundamental Units with the Negative Norm.

International Journal of Mathematics & Computation,, vol.4, pp.9-13, 2009 (Refereed Journals of Other Institutions)

On Some Solvability Results of Diophantine Equations and the Class Numbers of Certain Real Quadratic Fields,

Int. J. Cont. Math. Sci., no.4, pp.1605-1609, 2009 (Refereed Journals of Other Institutions)

On The Solvability of The Equations $x^2-py^2=\mp4p^e$ and $x^2-py^2=\mpp^e$ for The Positive Rational Integer $p$

International Journal of Algebra, no.3, pp.889-896, 2009 (Refereed Journals of Other Institutions)

, A. Carus; The Some Results on the Class Numbers of the Certain Real Quadratic Fields

JP Journal of Algebra Number Theory and Applications, no.13, pp.41-47, 2009 (Refereed Journals of Other Institutions)

Indivisibility of Class Numbers of Real Quadratic Fields

Acta Mathematica Academiae Paedagogicae Nyíregyháziensis, no.24, pp.267-270, 2008 (Refereed Journals of Other Institutions)

Computational Approximation to the Class Numbers of the Certain Real Quadratic Fields

Int. J. Math Sci. Eng. Appl., no.2, pp.1-9, 2008 (Refereed Journals of Other Institutions)

On Imaginary Quadratic Fields whose Class Numbers are Divisible by 3

Int. J. Contemp. Math. Sciences, no.3, pp.327-329, 2008 (Refereed Journals of Other Institutions)

Continued Fractions of Period Six and Explicit Representations of Fundamental Units of Some Real Quadratic Fields

Journal of the Indian Math. Soc. Vol., no.72, pp.183-194, 2005 (Refereed Journals of Other Institutions)

On the Solvability of the Equation $x^2-py^^2=\mpq$ and the Class Number of $Q(\sqrtp)$ for $p=[(2n+1)q]^2+1.

The Advanced Studies in Contemporary Mathematics, no.2, pp.87-92, 2004 (Refereed Journals of Other Institutions)

Refereed Congress / Symposium Publications in Proceedings

Indivisibility of Class Numbers of Real Quadratic Fields

The Third International Conferences on Mathematical Sciences, Al Ain, United Arab Emirates, 3 - 06 March 2008, pp.15

The New Criterion On Yokoi’s D-Invariant

International Conference on Mathematical Studies and Applications, Kahramanmaraş, Turkey, 3 - 04 October 2018, pp.122

New results on invariant values of cerain real quadratic fields

4th International Conference on Pure and Applied Sciences, İstanbul, Turkey, 23 - 25 November 2017, pp.122

On E Supplemented Modules

4th International Conference on Pure and Applied Sciences, İstanbul, Turkey, 23 - 25 November 2017, pp.129

On the Yokoi’s Invariant Value of Certain Real Quadratic Fields with the Period Eight

VIII Annual International Conference of the Georgian Mathematical Union, Batumi, Georgia, 4 - 08 September 2017, pp.109

Amply Cofinitely e-Supplemented Modules

VIII Annual International Conference of the Georgian Mathematical Union, Batumi, Georgia, 4 - 08 September 2017, pp.122

A divisibility criterion on the class numbers of certain imaginary quadratic fields

International conference mathematics and mathematical science, Abu Dhabi, United Arab Emirates, 26 - 31 December 2012, pp.35

Explicit Form of Fundamental Units of Certain Quadratic Fields and Period Eight

International Conference on Applied Analysis and Algebra, Yıldız Technical University, İstanbul, Turkey, 20 - 24 June 2012, pp.99

Belirli Reel Kuadratik Sayı Cisimlerinin Temel Birimleri

7. Ankara Matematik Günleri, Bilkent Üniversitesi, Ankara, Turkey, 1 - 04 June 2012, pp.43

Explicit Form of Fundamental Units of Certain Quadratic Fields and Period Seven

International Conference on Theory and Applications in Mathematics and Informatics, ICTAMI, Alba Lulia, Romania, 21 - 24 July 2011, pp.57

Continued Fractions of Period Seven and Explicit Represantation of the Fundamental Units of Certain Real Quadratic Fields

International Conference on Applied Analysis and Algebra, Yıldız Technical University, İstanbul, İstanbul, Turkey, 29 June - 02 July 2011, pp.121

Continued Fractions of Period Seven and Explicit Representation of the Fundamental Units of Certain Real Quadratic Fields

International Conference on Applied Analysis and Algebra Yıldız Tech. Univ, İstanbul, Turkey, 29 June - 02 July 2011, pp.121