On the approximation by single hidden layer feedforward neural networks with fixed weights NJ Guliyev, VE Ismailov Neural Networks 98, 296–304, 2018 | 130 | 2018 |
A single hidden layer feedforward network with only one neuron in the hidden layer can approximate any univariate function NJ Guliyev, VE Ismailov Neural Computation 28 (7), 1289–1304, 2016 | 122 | 2016 |
Inverse eigenvalue problems for Sturm–Liouville equations with spectral parameter linearly contained in one of the boundary conditions NJ Guliyev Inverse Problems 21 (4), 1315–1330, 2005 | 97 | 2005 |
Approximation capability of two hidden layer feedforward neural networks with fixed weights NJ Guliyev, VE Ismailov Neurocomputing 316, 262–269, 2018 | 74 | 2018 |
Schrödinger operators with distributional potentials and boundary conditions dependent on the eigenvalue parameter NJ Guliyev Journal of Mathematical Physics 60 (6), 063501, 2019 | 51 | 2019 |
Essentially isospectral transformations and their applications NJ Guliyev Annali di Matematica Pura ed Applicata 199 (4), 1621–1648, 2020 | 43 | 2020 |
On two-spectra inverse problems NJ Guliyev Proceedings of the American Mathematical Society 148 (10), 4491–4502, 2020 | 29* | 2020 |
The regularized trace formula for the Sturm–Liouville equation with spectral parameter in the boundary conditions NJ Guliyev Proc. Inst. Math. Mech. Natl. Acad. Sci. Azerb. 22, 99–102, 2005 | 27* | 2005 |
Inverse square singularities and eigenparameter dependent boundary conditions are two sides of the same coin NJ Guliyev The Quarterly Journal of Mathematics 74 (3), 889–910, 2023 | 14 | 2023 |
A Riesz basis criterion for Schrödinger operators with boundary conditions dependent on the eigenvalue parameter NJ Guliyev Analysis and Mathematical Physics 10 (1), 2, 8 pp., 2020 | 10 | 2020 |
On extensions of symmetric operators NJ Guliyev Operators and Matrices 14 (1), 71–75, 2020 | 6* | 2020 |
A uniqueness theorem for Sturm–Liouville equations with a spectral parameter linearly contained in the boundary conditions NJ Guliyev Proc. Inst. Math. Mech. Natl. Acad. Sci. Azerb. 25, 35–40, 2006 | 3 | 2006 |
Обратные задачи для уравнения Штурма–Лиувилля со спектральным параметром в краевом условии НД Кулиев Докл. НАН Азерб. 60 (3-4), 10–16, 2004 | 3* | 2004 |
Spectral identities for Schrödinger operators NJ Guliyev arXiv preprint arXiv:1910.05812, 2019 | 1 | 2019 |
Вычисление регуляризованного следа для уравнения Штурма–Лиувилля со спектральным параметром в краевом условии НД Кулиев Akademik M.L. Rəsulovun 90 illiyinə həsr olunmuş "Riyazi fizikanın üsulları …, 2006 | | 2006 |