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Erhan Pişkin
Erhan Pişkin
Professor of Mathematics, Dicle University
Verified email at dicle.edu.tr - Homepage
Title
Cited by
Cited by
Year
Qualitative analysis of solutions for the p‐Laplacian hyperbolic equation with logarithmic nonlinearity
E Pişkin, S Boulaaras, N Irkil
Mathematical Methods in the Applied Sciences 44 (6), 4654-4672, 2021
342021
On the decay and blow up of solutions for a quasilinear hyperbolic equations with nonlinear damping and source terms
E Pişkin
Boundary Value Problems 2015, 1-14, 2015
342015
Existence and blow up of solutions for a strongly damped Petrovsky equation with variable-exponent nonlinearities
S Antontsev, J Ferreira, E Piskin
Texas State University, Department of Mathematics, 2021
322021
An Introduction to Sobolev Spaces
E Pişkin, B Okutmuştur
Bentham Science Publishers, 2021
312021
Existence, decay and blow up of solutions for the extensible beam equation with nonlinear damping and source terms
E Pişkin
Open Mathematics 13 (1), 000010151520150040, 2015
312015
Sobolev spaces
E Piskin
Turkey Seçkin, 2017
282017
Global existence, decay and blow up solutions for coupled nonlinear wave equations with damping and source terms
E PİŞKİN, N Polat
Turkish Journal of Mathematics 37 (4), 633-651, 2013
282013
Blow up and asymptotic behavior of solutions for ap (x)-Laplacian equation with delay term and variable exponents
S Antontsev, J Ferreira, E Piskin, H Yuksekkaya, M Shahrouzi
Electronic Journal of Differential Equations 2021 (01-104), 84-20, 2021
272021
Well-posedness results for a sixth-order logarithmic Boussinesq equation
E Pişkin, N Irkıl
Filomat 33 (13), 3985-4000, 2019
262019
On the decay of solutions for a nonlinear Petrovsky equation
E Piskin, N Polat
Mathematical Sciences Letters 3 (1), 43, 2014
242014
Local existence and blow up of solutions for a logarithmic nonlinear viscoelastic wave equation with delay
E Pişkin, H Yuksekkaya
Computational Methods for Differential Equations 9 (2), 623-636, 2021
232021
Finite time blow up of solutions of the Kirchhoff-type equation with variable exponents
E Pişkin
International Journal of Nonlinear Analysis and Applications 11 (1), 37-45, 2020
232020
General decay and blowup of solutions for coupled viscoelastic equation of Kirchhoff type with degenerate damping terms
E Pişkin, F Ekinci
Mathematical Methods in the Applied Sciences 42 (16), 5468-5488, 2019
232019
Blow up of positive initial-energy solutions for coupled nonlinear wave equations with degenerate damping and source terms
E Pişkin
Boundary Value Problems 2015, 1-11, 2015
222015
Existence and non-existence of solutions for Timoshenko-type equations with variable exponents
SN Antontsev, J Ferreira, E Pişkin, SMS Cordeiro
Nonlinear Analysis: Real World Applications 61, 103341, 2021
192021
Nonexistence of global solutions of a delayed wave equation with variable-exponents
E Piskin, H Yüksekkaya
Miskolc Mathematical Notes 22 (2), 841-859, 2021
192021
Non-existence of solutions for a Timoshenko equations with weak dissipation
E Pişkin, H Yüksekkaya
Mathematica Moravica 22 (2), 1-9, 2018
182018
Uniform decay and blow‐up of solutions for coupled nonlinear Klein–Gordon equations with nonlinear damping terms
E Pişkin
Mathematical Methods in the Applied Sciences 37 (18), 3036-3047, 2014
182014
Existence, global nonexistence, and asymptotic behavior of solutions for the Cauchy problem of a multidimensional generalized damped Boussinesq-type equation
E PİŞKİN, N Polat
Turkish Journal of Mathematics 38 (4), 706-727, 2014
182014
Global existence and decay of solutions for a system of viscoelastic wave equations of Kirchhoff type with logarithmic nonlinearity
N Irkıl, E Pişkin, P Agarwal
Mathematical Methods in the Applied Sciences, 2022
162022
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