On Positive Solutions of the Difference Equation xn= xn− 5 R Karatas, C Cinar, D Simsek Int. J. Contemp. Math. Sci 1 (10), 495-500, 2006 | 91 | 2006 |
On the recursive sequence X(n+1)=x(n-5)/(1+X(n-1)X(n-3)) D Simsek, C Cinar, R Karatas International Journal of Pure and Applied Mathematics 28 (1), 117-124, 2006 | 38* | 2006 |
A note on the periodicity of the Lyness max equation A Gelisken, C Cinar, R Karatas Advances in Difference Equations 2008, 1-5, 2007 | 30 | 2007 |
Global behavior of a higher order difference equation K Ramazan Computers and Mathematics with Applications 60, 830-839, 2010 | 25 | 2010 |
ON THE RECURSİVE SEQUENCE X (N1)= X (N-5)/(1X (N-2) C ÇİNAR, R KARATAŞ international journal of pure and applied mathematics 27 (4), 2006 | 21 | 2006 |
On solutions of the difference equation C Cinar, R Karatas, I Yalçınkaya Mathematica Bohemica 132 (3), 257-261, 2007 | 20 | 2007 |
Global behavior of a higher order difference equation R Karataş PERGAMON-ELSEVIER SCIENCE LTD, 2010 | 16 | 2010 |
Qualitative behavior of a rational difference equation R Karatas, A Gelisken CHARLES BABBAGE RES CTR, 2011 | 15 | 2011 |
On the Solutions of the Difference Equation R Karatas, C Cinar Int. J. Contemp. Math. Sciences 2 (31), 1505-1509, 2007 | 12 | 2007 |
On the positive solutions of the difference equation system./=,/= 1 1 1 1--++ n n n n n n yxpy yym x C Cinar, I Yalçinkaya, R Karatas J. Inst. Math. Comp. Sci 18, 135-136, 2005 | 9 | 2005 |
On the solutions of the recursive sequence xx+ 1=...[wzór] R Karatas Fasciculi Mathematici, 37-45, 2010 | 8 | 2010 |
A Solution Form of A Higher Order difference Equation R Karataş, A Gelişken Korunalp Journal Of Mathematics 9 (2), 316-323, 2021 | 4 | 2021 |
On the Solutions of the Recursive Sequence $ x_ {n+ 1}=\frac {ax_ {nk}}{a-\prod\limits_ {i= 0}^{k} x_ {ni}} $ S Ergin, R Karataş Thai Journal of Mathematics 14 (2), 391-397, 2014 | 4* | 2014 |
On solutions of the difference equation x_ {n+ 1}=(((-1)? x_ {n-4})/(1+(-1)? x_ {n} x_ {n-1} x_ {n-2} x_ {n-3} x_ {n-4})) R Karataş Selcuk University Research Center of Applied Mathematics, 2007 | 4 | 2007 |
On a solvable difference equation with sequence coefficients A Gelişken, R Karataş Advances and Applications in Discrete Mathematics, 27-33, 2022 | 3 | 2022 |
Global behavior of a rational recursive sequence K Ramazan Ars Combinatoria 97, 421-428, 2010 | 3 | 2010 |
On the dynamics of a recursive sequence A Ergin, R Karatas Ars Combinatoria 109, 353-360, 2013 | 2 | 2013 |
On the recursive sequence D Şimsek, C Çınar, İ Yalçınkaya, R Karataş Int. J. Pure Appl. Math 28, 117-124, 0 | 2 | |
A Solution Form of a Rational Difference Equation R KARATAŞ Konuralp Journal of Mathematics 11 (1), 20-23, 2023 | | 2023 |
THE DYNAMICAL BEHAVIOR OF A HIGHER ORDER DIFFERENCE EQUATION. R Karataş Advances & Applications in Discrete Mathematics 35 (1), 2022 | | 2022 |