A unified local convergence analysis of inexact constrained Levenberg–Marquardt methods R Behling, A Fischer Optimization Letters 6, 927-940, 2012 | 51 | 2012 |
Circumcentering the Douglas–Rachford method R Behling, JY Bello Cruz, LR Santos Numerical Algorithms 78, 759-776, 2018 | 39 | 2018 |
The effect of calmness on the solution set of systems of nonlinear equations R Behling, A Iusem Mathematical Programming 137, 155-165, 2013 | 35 | 2013 |
A Levenberg-Marquardt method with approximate projections R Behling, A Fischer, M Herrich, A Iusem, Y Ye Computational Optimization and Applications 59, 5-26, 2014 | 33 | 2014 |
On the linear convergence of the circumcentered-reflection method R Behling, JY Bello-Cruz, LR Santos Operations Research Letters 46 (2), 159-162, 2018 | 30 | 2018 |
Local convergence analysis of the Levenberg–Marquardt framework for nonzero-residue nonlinear least-squares problems under an error bound condition R Behling, DS Gonçalves, SA Santos Journal of Optimization Theory and Applications 183 (3), 1099-1122, 2019 | 27 | 2019 |
The block-wise circumcentered–reflection method R Behling, JY Bello-Cruz, LR Santos Computational Optimization and Applications 76 (3), 675-699, 2020 | 22 | 2020 |
On a conjecture in second-order optimality conditions R Behling, G Haeser, A Ramos, DS Viana Journal of Optimization Theory and Applications 176, 625-633, 2018 | 21 | 2018 |
On second-order optimality conditions in nonlinear optimization R Andreani, R Behling, G Haeser, PJS Silva Optimization Methods and Software 32 (1), 22-38, 2017 | 21 | 2017 |
On the circumcentered-reflection method for the convex feasibility problem R Behling, Y Bello-Cruz, LR Santos Numerical Algorithms 86, 1475-1494, 2021 | 19 | 2021 |
On the constrained error bound condition and the projected Levenberg–Marquardt method R Behling, A Fischer, G Haeser, A Ramos, K Schönefeld Optimization 66 (8), 1397-1411, 2017 | 16 | 2017 |
The circumcentered-reflection method achieves better rates than alternating projections R Arefidamghani, R Behling, Y Bello-Cruz, AN Iusem, LR Santos Computational Optimization and Applications 79 (2), 507-530, 2021 | 15 | 2021 |
Infeasibility and error bound imply finite convergence of alternating projections R Behling, Y Bello-Cruz, LR Santos SIAM Journal on Optimization 31 (4), 2863-2892, 2021 | 14 | 2021 |
Circumcentering approximate reflections for solving the convex feasibility problem GHM Araújo, R Arefidamghani, R Behling, Y Bello-Cruz, A Iusem, ... Fixed Point Theory and Algorithms for Sciences and Engineering 2022 (1), 1, 2022 | 8 | 2022 |
The method and the trajectory of Levenberg-Marquardt R Behling PhD thesis, IMPA, Rio de Janeiro, Brazil, 2011 | 6 | 2011 |
A special complementarity function revisited R Behling, A Fischer, K Schönefeld, N Strasdat Optimization 68 (1), 65-79, 2019 | 5 | 2019 |
On the centralization of the circumcentered-reflection method R Behling, Y Bello-Cruz, AN Iusem, LR Santos Mathematical Programming 205 (1), 337-371, 2024 | 4 | 2024 |
A circumcentered-reflection method for finding common fixed points of firmly nonexpansive operators R Arefidamghani, R Behling, AN Iusem, LR Santos arXiv preprint arXiv:2203.02410, 2022 | 4 | 2022 |
Primal-dual relationship between Levenberg–Marquardt and central trajectories for linearly constrained convex optimization R Behling, C Gonzaga, G Haeser Journal of Optimization Theory and Applications 162, 705-717, 2014 | 4 | 2014 |
Circumcentric directions of cones R Behling, Y Bello-Cruz, H Lara-Urdaneta, H Oviedo, LR Santos Optimization Letters 17 (4), 1069-1081, 2023 | 3 | 2023 |