Theoretical and numerical comparison of relaxation methods for mathematical programs with complementarity constraints T Hoheisel, C Kanzow, A Schwartz Mathematical Programming 137, 257-288, 2013 | 233 | 2013 |
Stationary conditions for mathematical programs with vanishing constraints using weak constraint qualifications T Hoheisel, C Kanzow Journal of Mathematical Analysis and Applications 337 (1), 292-310, 2008 | 92 | 2008 |
First-and second-order optimality conditions for mathematical programs with vanishing constraints T Hoheisel, C Kanzow Applications of Mathematics 52 (6), 495-514, 2007 | 84 | 2007 |
Exact penalty results for mathematical programs with vanishing constraints T Hoheisel, C Kanzow, JV Outrata Nonlinear Analysis: Theory, Methods & Applications 72 (5), 2514-2526, 2010 | 64 | 2010 |
Mathematical programs with vanishing constraints T Hoheisel Universität Würzburg, 2009 | 57 | 2009 |
Convergence of a local regularization approach for mathematical programmes with complementarity or vanishing constraints T Hoheisel, C Kanzow, A Schwartz Optimization Methods and Software 27 (3), 483-512, 2012 | 52 | 2012 |
A smoothing-regularization approach to mathematical programs with vanishing constraints W Achtziger, T Hoheisel, C Kanzow Computational Optimization and Applications 55, 733-767, 2013 | 50 | 2013 |
Epi-convergent smoothing with applications to convex composite functions JV Burke, T Hoheisel SIAM Journal on Optimization 23 (3), 1457-1479, 2013 | 44 | 2013 |
Blind deblurring of barcodes via Kullback-Leibler divergence G Rioux, C Scarvelis, R Choksi, T Hoheisel, P Marechal IEEE transactions on pattern analysis and machine intelligence 43 (1), 77-88, 2019 | 32 | 2019 |
Generalized Newton’s method based on graphical derivatives T Hoheisel, C Kanzow, BS Mordukhovich, H Phan Nonlinear Analysis: Theory, Methods & Applications 75 (3), 1324-1340, 2012 | 31 | 2012 |
Gradient consistency for integral-convolution smoothing functions JV Burke, T Hoheisel, C Kanzow Set-Valued and Variational Analysis 21 (2), 359-376, 2013 | 28 | 2013 |
On a relaxation method for mathematical programs with vanishing constraints W Achtziger, C Kanzow, T Hoheisel GAMM‐Mitteilungen 35 (2), 110-130, 2012 | 27 | 2012 |
Mathematical programs with vanishing constraints: a new regularization approach with strong convergence properties T Hoheisel, C Kanzow, A Schwartz Optimization 61 (6), 619-636, 2012 | 26 | 2012 |
Sufficient conditions for metric subregularity of constraint systems with applications to disjunctive and ortho-disjunctive programs M Benko, M Červinka, T Hoheisel Set-Valued and Variational Analysis, 1-35, 2022 | 22 | 2022 |
On a smooth dual gap function for a class of quasi-variational inequalities N Harms, T Hoheisel, C Kanzow Journal of Optimization Theory and Applications 163, 413-438, 2014 | 21 | 2014 |
Epi-convergence properties of smoothing by infimal convolution JV Burke, T Hoheisel Set-Valued and Variational Analysis 25, 1-23, 2017 | 17 | 2017 |
Matrix support functionals for inverse problems, regularization, and learning JV Burke, T Hoheisel SIAM Journal on Optimization 25 (2), 1135-1159, 2015 | 16 | 2015 |
A regularization interpretation of the proximal point method for weakly convex functions T Hoheisel, M Laborde, A Oberman J. Dyn. Games 7 (1), 79-96, 2020 | 15 | 2020 |
A study of convex convex-composite functions via infimal convolution with applications JV Burke, H Tim, QV Nguyen Mathematics of Operations Research 46 (4), 1324-1348, 2021 | 14 | 2021 |
The maximum entropy on the mean method for image deblurring G Rioux, R Choksi, T Hoheisel, P Marechal, C Scarvelis Inverse Problems 37 (1), 015011, 2020 | 13 | 2020 |