Cengiz Çinar

According to our database1, Cengiz Çinar authored at least 11 papers between 2004 and 2011.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of five.

Timeline

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Bibliography

2011
On the behavior of positive solutions of the system of rational difference equations x<sub>n+1</sub> = x<sub>n-1</sub>/(y<sub>n</sub>x<sub>n-1</sub>+1), y<sub>n+1</sub> = y<sub>n-1</sub>/(x<sub>n</sub>y<sub>n-1</sub>+1).
Math. Comput. Model., 2011

On the dynamics of the recursive sequence x<sub>n-1</sub> = αx<sub>n-1</sub> / β + γΣ<sup>l</sup><sub>k=1</sub>x<sub>n-2k</sub>Π<sup>l</sup><sub>k=1</sub>x<sub>n-2k</sub>.
Math. Comput. Model., 2011

On the dynamics of the recursive sequence x<sub>n+1</sub> = (x<sub>n-1</sub> / β+γx<sup>2</sup><sub>n-2</sub>x<sub>n-4</sub>+γx<sub>n-2</sub>x<sup>2</sup><sub>n-4</sub>).
Comput. Math. Appl., 2011

2010
On the asymptotic behavior and periodic nature of a difference equation with maximum.
Comput. Math. Appl., 2010

The Dynamics Of The Difference Equation x<sub>n+1</sub>={α x<sub>n-k</sub>}/{β +γ x<sup>p_{n-(k+1)}</sup>.
Ars Comb., 2010

2008
On the asymptotic stability of x<sub>n+1</sub>=(a+x<sub>n</sub>x<sub>n-k</sub>)/(x<sub>n</sub>+x<sub>n-k</sub>).
Comput. Math. Appl., 2008

2004
On the positive solutions of the difference equation x<sub>n+1</sub> = (ax<sub>n-1</sub>) / (1+bn<sub>n</sub>x<sub>n-1</sub>).
Appl. Math. Comput., 2004

On the difference equation x<sub>n+1</sub> = x<sub>n-1</sub> / (-1+x<sub>n</sub>x<sub>n-1</sub>).
Appl. Math. Comput., 2004

On the positive solutions of the difference equation x<sub>n+1</sub> = x<sub>n-1</sub> / (1+ax<sub>n</sub>x<sub>n-1</sub>).
Appl. Math. Comput., 2004

On the solutions of the difference equation x<sub>n+1</sub> = x<sub>n-1</sub>/-1+ax<sub>n</sub>x<sub>n-1</sub>.
Appl. Math. Comput., 2004

On the positive solutions of the difference equation system x<sub>n+1</sub> = 1/y<sub>n</sub>, y<sub>n+1</sub> = y<sub>n</sub>/x<sub>n-1</sub>y<sub>n-1</sub>.
Appl. Math. Comput., 2004


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