Two-point method for solving nonlinear equation with nondifferentiable operator SM Shakhno, HP Yarmola Mat. Stud 36 (2), 213-220, 2011 | 22 | 2011 |
Convergence analysis of a two-step method for the nonlinear least squares problem with decomposition of operator S Shakhno, R Iakymchuk, H Yarmola | 18 | 2018 |
On the two‐step method for solving nonlinear equations with nondifferentiable operator S Shakhno, H Yarmola PAMM 12 (1), 617-618, 2012 | 17 | 2012 |
Analysis of the convergence of a combined method for the solution of nonlinear equations SM Shakhno, IV Mel’nyk, HP Yarmola Journal of Mathematical Sciences 201 (1), 32-43, 2014 | 15 | 2014 |
An iterative method for solving nonlinear least squares problems with nondifferentiable operator SM Shakhno, RP Iakymchuk, HP Yarmola Matematychni Studii 48 (1), 97-107, 2017 | 11 | 2017 |
Аналіз збіжності комбінованого методу для розв’язування нелінійних рівнянь СМ Шахно, ІВ Мельник, ГП Ярмола Математичні методи та фізико-механічні поля, 31–39-31–39, 2013 | 10 | 2013 |
Двоточковий метод для розв’язування нелiнiйних рiвнянь з недиференцiйовним оператором СМ Шахно, ГП Ярмола Мат. студiї.–2011.–36, 213-220, 2011 | 9 | 2011 |
Two-step solver for nonlinear equations IK Argyros, S Shakhno, H Yarmola Symmetry 11 (2), 128, 2019 | 8 | 2019 |
Combined Newton‐Kurchatov method for solving nonlinear operator equations R Iakymchuk, S Shakhno, H Yarmola PAMM 16 (1), 719-720, 2016 | 7 | 2016 |
Combined Newton-Potra method for solving nonlinear operator equations SM Shakhno, AVI Babjak, HP Yarmola Journal of Computational and Applied Mathematics, Kyiv 3 (120), 170-178, 2015 | 7 | 2015 |
Twoparametric secant type methods for solving nonlinear equations SM Shakhno, SI Grab, HP Yarmola Visnyk of the Lviv University. Series Appl. Math. and Computer Sci 15, 117-127, 2009 | 7 | 2009 |
Extended semilocal convergence for the Newton-Kurchatov method HP Yarmola, IK Argyros, SM Shakhno Matematychni Studii 53 (1), 85-91, 2020 | 6 | 2020 |
Convergence analysis of the Gauss-Newton-Potra method for nonlinear least squares problems SM Shakhno, HP Yarmola, YV Shunkin Matematychni Studii 50 (211), 221-2, 2018 | 5 | 2018 |
Convergence analysis of a two-step modification of the Gauss-Newton method and its Applications R Iakymchuk, S Shakhno, H Yarmola | 5 | 2018 |
Двопараметричні методи типу хорд для розв’язування нелінійних рівнянь СМ Шахно, С Граб, Г Ярмола Вісник Львівського університету. Сер. прикл. матем. та інф.—Львів: ЛНУ …, 2009 | 5 | 2009 |
Convergence analysis of combined method for solving nonlinear equations SM Shakhno, IV Mel’nyk, HP Yarmola J. Math. Sci 212, 16-26, 2016 | 4 | 2016 |
Perturbed Newton methods for solving nonlinear equations with applications IK Argyros, S Regmi, S Shakhno, H Yarmola Symmetry 14 (10), 2206, 2022 | 3 | 2022 |
Improving convergence analysis of the Newton–Kurchatov method under weak conditions IK Argyros, S Shakhno, H Yarmola Computation 8 (1), 8, 2020 | 3 | 2020 |
On the convergence of Kurchatov-type methods using recurrent functions for solving equations IK Argyros, S Shakhno, H Yarmola Matematychni Studii 58 (1), 103-112, 2022 | 2 | 2022 |
Method of Third-Order Convergence with Approximation of Inverse Operator for Large Scale Systems IK Argyros, S Shakhno, H Yarmola Symmetry 12 (6), 978, 2020 | 2 | 2020 |