Individual Information
Erhan Pişkin
Assistant Professor
Dicle University
Educational Qualification
From 2007 to 2009, Master Thesis , Turkey
From 2009 to 2013, PhD Thesis , Turkey
Research Interests
Partial Differential Equations
Analysis of Nonlinear Partial Differential Equations
Existence and Uniqueness
Asymptotic Behavior
Work Experience
From 2008 to 2013, Research Assistant , Dicle University
From 2013 to 2014, Assistant Prof , Dicle University
Selected Publications
From 2007 to 2009, Master Thesis , Turkey
From 2009 to 2013, PhD Thesis , Turkey
Research Interests
Partial Differential Equations
Analysis of Nonlinear Partial Differential Equations
Existence and Uniqueness
Asymptotic Behavior
Work Experience
From 2008 to 2013, Research Assistant , Dicle University
From 2013 to 2014, Assistant Prof , Dicle University
Selected Publications
Books
Journal Articles
Conference Papers
| 1. |
Ordinary Differential Equatins (in Turkish) |
| 1. |
Asymptotic behavior of solution of Cauchy problem for the generalized damped multidimensional Boussinesq equation, Applied Mathematics Letters, 25 (2012) 1871-1874. |
| 2. |
Global existence, decay and blow up solutions for coupled nonlinear wave equations with damping and source terms, Turkish Journal of Mathematics, 37(4) (2013) 633-651. |
| 3. |
Existence and asymptotic behavior of solution of Cauchy problem for the damped sixth-order Boussinesq equation, Acta Mathematicae Applicatae Sinica, English Series, Doi: 10.1007/s10255-012-0174-2. |
| 4. |
Blow up of a Solution for a System of Nonlinear Higher-OrderWave Equations with Strong Damping Terms, AIP (American Institute of Physics) Conf. Proc. 1470, pp. 203-206 |
| 5. |
Asymptotic behavior of solution of Cauchy problem for the generalized damped double dispersion equation, International Mathematical Forum, Vol. 7, no. 3, (2012) 145-151. |
| 6. |
On the decay of solutions for a nonlinear higher-order Kirchhoff-type hyperbolic equation, J. Adv. Res. Appl. Math., Vol.5, no.2 (2013) 107-116. |
| 7. |
Blow up for coupled nonlinear wave equations with weak damping terms, International Journal of Differential Equations and Applications (IJDEA) 12 (4) (2013) 131-137. |
| 8. |
Blow up of solutions for the Cauchy problem of the damped sixth-order Boussinesq equation, Theoretical Mathematics & Applications, vol. 4, no. 3 (2013) 61-71. |
| 9. |
Blow up of Solutions for a System of Nonlinear Higher-order Kirchhoff-type Equations, Mathematics and Statistics Vol. 2, no.6 (2014) 219-229. |
| 10. |
Blow-up result in a Cauchy problem for the nonlinear viscoelastic Petrovsky equation, International Journal of Advanced Mathematical Sciences, 3(1) (2015) 1-5. |
| 1. |
Exponential decay of solutions to an initial boundary value problem for a class of damped nonlinear wave equations, International Conference On Applied Analysis and Algebra (ICAAA 2011), 29th June- 2nd July 2011, Y?ld?z Technical University, Istanbul - TURKEY, pp 106-107. |
| 2. |
, On the decay and blow up of solutions for coupled wave equations of Kirchhoff type with nonlinear damping and source terms, The 11th International Workshop on Dynamical Systems and Applications, 26-28 June 2012, ?ankaya University, Ankara – TURKEY, pp 21. |
| 3. |
Blow up of a solution for a system of nonlinear higher-order wave equations with strong damping, First International Conference an Analysis and Applied Mathematics (ICAAM 2012), 18- 21 October 2012, Gümü?hane University, Gümü?hane – TURKEY, pp 107. |
| 4. |
Existence, asymptotic behavior and blow up of solutions for the Timoshenko equation, Caucasian Mathematics Conference (CMCI), 5-6 September 2014, Tbilisi, GEORGIA, pp 152. |
| 5. |
Existence of solutions to Cauchy problem for Boussinesq equations, Caucasian Mathematics Conference (CMCI), 5-6 September 2014, Tbilisi, GEORGIA, pp 153. |