| A finite deformation mortar contact formulation using a primal–dual active set strategy A Popp, MW Gee, WA Wall International Journal for Numerical Methods in Engineering 79 (11), 1354-1391, 2009 | 211 | 2009 |
| A dual mortar approach for 3D finite deformation contact with consistent linearization A Popp, M Gitterle, MW Gee, WA Wall International Journal for Numerical Methods in Engineering 83 (11), 1428-1465, 2010 | 203 | 2010 |
| Geometrically exact finite element formulations for slender beams: Kirchhoff–Love theory versus Simo–Reissner theory C Meier, A Popp, WA Wall Archives of Computational Methods in Engineering 26 (1), 163-243, 2019 | 185 | 2019 |
| An objective 3D large deformation finite element formulation for geometrically exact curved Kirchhoff rods C Meier, A Popp, WA Wall Computer Methods in Applied Mechanics and Engineering 278, 445-478, 2014 | 137 | 2014 |
| Finite deformation frictional mortar contact using a semi‐smooth Newton method with consistent linearization M Gitterle, A Popp, MW Gee, WA Wall International Journal for Numerical Methods in Engineering 84 (5), 543-571, 2010 | 127 | 2010 |
| Dual quadratic mortar finite element methods for 3D finite deformation contact A Popp, BI Wohlmuth, MW Gee, WA Wall SIAM Journal on Scientific Computing 34 (4), B421-B446, 2012 | 124 | 2012 |
| 3D fluid–structure-contact interaction based on a combined XFEM FSI and dual mortar contact approach UM Mayer, A Popp, A Gerstenberger, WA Wall Computational Mechanics 46, 53-67, 2010 | 117 | 2010 |
| Isogeometric dual mortar methods for computational contact mechanics A Seitz, P Farah, J Kremheller, BI Wohlmuth, WA Wall, A Popp Computer Methods in Applied Mechanics and Engineering 301, 259-280, 2016 | 116 | 2016 |
| Fluid–structure interaction for non-conforming interfaces based on a dual mortar formulation T Klöppel, A Popp, U Küttler, WA Wall Computer Methods in Applied Mechanics and Engineering 200 (45-46), 3111-3126, 2011 | 107 | 2011 |
| Mortar methods for computational contact mechanics and general interface problems A Popp Technische Universität München, 2012 | 98 | 2012 |
| Segment-based vs. element-based integration for mortar methods in computational contact mechanics P Farah, A Popp, WA Wall Computational Mechanics 55, 209-228, 2015 | 94 | 2015 |
| Improved robustness and consistency of 3D contact algorithms based on a dual mortar approach A Popp, A Seitz, MW Gee, WA Wall Computer Methods in Applied Mechanics and Engineering 264, 67-80, 2013 | 88 | 2013 |
| A cut-cell finite volume–finite element coupling approach for fluid–structure interaction in compressible flow V Pasquariello, G Hammerl, F Örley, S Hickel, C Danowski, A Popp, ... Journal of Computational Physics 307, 670-695, 2016 | 84 | 2016 |
| A finite element approach for the line-to-line contact interaction of thin beams with arbitrary orientation C Meier, A Popp, WA Wall Computer Methods in Applied Mechanics and Engineering 308, 377-413, 2016 | 79 | 2016 |
| A unified approach for beam-to-beam contact C Meier, WA Wall, A Popp Computer Methods in Applied Mechanics and Engineering 315, 972-1010, 2017 | 78 | 2017 |
| Dual mortar methods for computational contact mechanics–overview and recent developments A Popp, WA Wall GAMM‐Mitteilungen 37 (1), 66-84, 2014 | 72 | 2014 |
| A locking-free finite element formulation and reduced models for geometrically exact Kirchhoff rods C Meier, A Popp, WA Wall Computer Methods in Applied Mechanics and Engineering 290, 314-341, 2015 | 70 | 2015 |
| Geometrically exact beam elements and smooth contact schemes for the modeling of fiber-based materials and structures C Meier, MJ Grill, WA Wall, A Popp International Journal of Solids and Structures 154, 124-146, 2018 | 58 | 2018 |
| An abstract framework for a priori estimates for contact problems in 3D with quadratic finite elements BI Wohlmuth, A Popp, MW Gee, WA Wall Computational Mechanics 49 (6), 735-747, 2012 | 57 | 2012 |
| Nitsche’s method for finite deformation thermomechanical contact problems A Seitz, WA Wall, A Popp Computational Mechanics 63, 1091-1110, 2019 | 42 | 2019 |
Wolfgang A. WallProfessor of Computational Mechanics, Technical University of Munich (TUM)在 lnm.mw.tum.de 的电子邮件经过验证
