| Model hierarchies for cell aggregation by chemotaxis F Chalub, Y Dolak-Struss, P Markowich, D Oelz, C Schmeiser, A Soreff Mathematical Models and Methods in Applied Sciences 16 (supp01), 1173-1197, 2006 | 91 | 2006 |
| Modeling of the actin-cytoskeleton in symmetric lamellipodial fragments D Oelz, C Schmeiser, JV Small Cell adhesion & migration 2 (2), 117-126, 2008 | 65 | 2008 |
| Size distribution dependence of prion aggregates infectivity V Calvez, N Lenuzza, D Oelz, JP Deslys, P Laurent, F Mouthon, ... Mathematical biosciences 217 (1), 88-99, 2009 | 57 | 2009 |
| A combination of actin treadmilling and cross-linking drives contraction of random actomyosin arrays DB Oelz, BY Rubinstein, A Mogilner Biophysical journal 109 (9), 1818-1829, 2015 | 48 | 2015 |
| Derivation of a model for symmetric lamellipodia with instantaneous cross-link turnover D Oelz, C Schmeiser Archive for Rational Mechanics and Analysis 198 (3), 963-980, 2010 | 47 | 2010 |
| An extended Filament Based Lamellipodium Model produces various moving cell shapes in the presence of chemotactic signals A Manhart, D Oelz, C Schmeiser, N Sfakianakis Journal of theoretical biology 382, 244-258, 2015 | 39 | 2015 |
| Non linear diffusions as limit of kinetic equations with relaxation collision kernels J Dolbeault, P Markowich, D Oelz, C Schmeiser Archive for Rational Mechanics and Analysis 186 (1), 133-158, 2007 | 38 | 2007 |
| On the asymptotic regime of a model for friction mediated by transient elastic linkages V Mili¹iæ, D Oelz Journal de mathématiques pures et appliquées 96 (5), 484-501, 2011 | 36 | 2011 |
| How do cells move? Mathematical modeling of cytoskeleton dynamics and cell migration D Ölz, C Schmeiser Cell mechanics: from single scale-based models to multiscale modeling …, 2010 | 25 | 2010 |
| How do cells move? Mathematical modeling of cytoskeleton dynamics and cell migration D Ölz, C Schmeiser Cell mechanics: from single scale-based models to multiscale modeling …, 2010 | 25 | 2010 |
| Multistep navigation of leukocytes: a stochastic model with memory effects D Oelz, C Schmeiser, A Soreff Mathematical Medicine and Biology 22 (4), 291-303, 2005 | 19 | 2005 |
| On a structured model for load-dependent reaction kinetics of transient elastic linkages mediating nonlinear friction V Mili¹ic, D Oelz SIAM J. Math. Anal 47 (3), 2104-2121, 2015 | 17 | 2015 |
| Tear-off versus global existence for a structured model of adhesion mediated by transient elastic linkages V Milisic, D Oelz arXiv preprint arXiv:1506.00824, 2015 | 15 | 2015 |
| Microtubule dynamics, kinesin-1 sliding, and dynein action drive growth of cell processes DB Oelz, U Del Castillo, VI Gelfand, A Mogilner Biophysical journal 115 (8), 1614-1624, 2018 | 14 | 2018 |
| Numerical treatment of the filament-based lamellipodium model (FBLM) A Manhart, D Oelz, C Schmeiser, N Sfakianakis Modeling cellular systems, 141-159, 2017 | 14 | 2017 |
| Simulation of lamellipodial fragments D Oelz, C Schmeiser Journal of mathematical biology 64 (3), 513-528, 2012 | 14 | 2012 |
| A viscous two-phase model for contractile actomyosin bundles D Oelz Journal of mathematical biology 68 (7), 1653-1676, 2014 | 13 | 2014 |
| Analysis of a relaxation scheme for a nonlinear Schrödinger equation occurring in plasma physics D Oelz, S Trabelsi Mathematical Modelling and Analysis 19 (2), 257-274, 2014 | 12 | 2014 |
| Cell mechanics: from single scale-based models to multiscale modeling., chapter How do cells move? Mathematical modeling of cytoskeleton dynamics and cell migration D Oelz, C Schmeiser Chapman and Hall, 2010 | 12 | 2010 |
| Actomyosin contraction, aggregation and traveling waves in a treadmilling actin array D Oelz, A Mogilner Physica D: Nonlinear Phenomena 318, 70-83, 2016 | 8 | 2016 |
