An inverse source problem for a one-dimensional space–time fractional diffusion equation S Tatar, S Ulusoy Applicable Analysis 94 (11), 2233-2244, 2015 | 89 | 2015 |
Determination of an unknown source term in a space-time fractional diffusion equation S Tatar, R Tinaztepe, S Ulusoy J. Fract. Calc. Appl 6 (1), 83-90, 2015 | 52 | 2015 |
Simultaneous inversion for the exponents of the fractional time and space derivatives in the space-time fractional diffusion equation SI Tatar, R Tınaztepe, S Ulusoy Applicable Analysis 95 (1), 1-23, 2016 | 49 | 2016 |
A uniqueness result for an inverse problem in a space-time fractional diffusion equation S Tatar, S Ulusoy Electron. J. Differ. Equ 257, 1-9, 2013 | 48 | 2013 |
Tikhonov regularization method for a backward problem for the inhomogeneous time-fractional diffusion equation NH Tuan, LD Long, S Tatar Applicable Analysis 97 (5), 842-863, 2018 | 38 | 2018 |
An inversion method for identification of elastoplastic properties of a beam from torsional experiment A Hasanov, S Tatar International Journal of Non-Linear Mechanics 45 (5), 562-571, 2010 | 24 | 2010 |
Semi-analytic inversion method for the determination of elastoplastic properties of power hardening materials from limited torsional experiment A Hasanov, S Tatar Inverse Problems in Science and Engineering 18 (2), 265-278, 2010 | 18 | 2010 |
An inverse problem for a nonlinear diffusion equation with time-fractional derivative S Tatar, S Ulusoy Journal of Inverse and Ill-posed Problems 25 (2), 185-193, 2017 | 17 | 2017 |
An inverse problem for an inhomogeneous time-fractional diffusion equation: a regularization method and error estimate NH Tuan, LVC Hoan, S Tatar Computational and Applied Mathematics 38, 1-22, 2019 | 15 | 2019 |
Solutions of linear and nonlinear problems related to torsional rigidity of a beam A Hasanov, S Tatar Computational materials science 45 (2), 494-498, 2009 | 13 | 2009 |
An inverse source problem for pseudo-parabolic equation with Caputo derivative LD Long, NH Luc, S Tatar, D Baleanu, NH Can Journal of Applied Mathematics and Computing, 1-27, 2022 | 12 | 2022 |
Existence and uniqueness for a nonlinear inverse reaction‐diffusion problem with a nonlinear source in higher dimensions FT Akyildiz, S Tatar, S Ulusoy Mathematical Methods in the Applied Sciences 36 (17), 2397-2402, 2013 | 12 | 2013 |
Analysis of direct and inverse problems for a fractional elastoplasticity model S Tatar, S Ulusoy Filomat 31 (3), 699-708, 2017 | 11 | 2017 |
Numerical solutions of direct and inverse problems for a time fractional viscoelastoplastic equation S Tatar, R Tnaztepe, M Zeki Journal of Engineering Mechanics 143 (7), 04017035, 2017 | 10 | 2017 |
Monotonicity of input–output mapping related to inverse elastoplastic torsional problem S Tatar Applied Mathematical Modelling 37 (23), 9552-9561, 2013 | 9 | 2013 |
Recovery of the solute concentration and dispersion flux in an inhomogeneous time fractional diffusion equation NH Tuan, TB Ngoc, S Tatar Journal of Computational and Applied Mathematics 342, 96-118, 2018 | 8 | 2018 |
Numerical solution of the nonlinear evolutional inverse problem related to elastoplastic torsional problem S Tatar, Z Muradoğlu Applicable Analysis 93 (6), 1187-1200, 2014 | 8 | 2014 |
A modification of the semi-analytic inversion method: Determination of the yield stress and a comparison with the parametrization algorithm S Tatar, Z Muradoğlu Inverse Problems in Science and Engineering 22 (4), 543-556, 2014 | 6 | 2014 |
Identification of the density dependent coefficient in an inverse reaction-diffusion problem from a single boundary data R Tinaztepe, S Tatar, S Ulusoy Electronic Journal of Differential Equations 2014 (21), 1-14, 2014 | 5 | 2014 |
Numerical solution of the nonlinear parabolic problem related to inverse elastoplastic torsional problem S Tatar Inverse Problems in Science and Engineering 21 (1), 52-62, 2013 | 5 | 2013 |