A review on phase-field models of brittle fracture and a new fast hybrid formulation M Ambati, T Gerasimov, L De Lorenzis
Computational Mechanics 55, 383-405, 2015
1487 2015 Phase-field modeling of ductile fracture M Ambati, T Gerasimov, L De Lorenzis
Computational Mechanics 55, 1017-1040, 2015
834 2015 A line search assisted monolithic approach for phase-field computing of brittle fracture T Gerasimov, L De Lorenzis
Computer Methods in Applied Mechanics and Engineering 312, 276-303, 2016
283 2016 On penalization in variational phase-field models of brittle fracture T Gerasimov, L De Lorenzis
Computer Methods in Applied Mechanics and Engineering 354, 990-1026, 2019
174 2019 Comparison of phase-field models of fracture coupled with plasticity R Alessi, M Ambati, T Gerasimov, S Vidoli, L De Lorenzis
Advances in computational plasticity: A book in honour of D. Roger J. Owen, 1-21, 2018
172 2018 A non-intrusive global/local approach applied to phase-field modeling of brittle fracture T Gerasimov, N Noii, O Allix, L De Lorenzis
Advanced modeling and simulation in engineering sciences 5, 1-30, 2018
74 2018 Numerical implementation of phase-field models of brittle fracture L De Lorenzis, T Gerasimov
Modeling in engineering using innovative numerical methods for solids and …, 2020
65 2020 Stochastic phase-field modeling of brittle fracture: Computing multiple crack patterns and their probabilities T Gerasimov, U Römer, J Vondřejc, HG Matthies, L De Lorenzis
Computer Methods in Applied Mechanics and Engineering 372, 113353, 2020
59 2020 An explicit residual‐type error estimator for‐quadrilateral extended finite element method in two‐dimensional linear elastic fracture mechanics T Gerasimov, M Rüter, E Stein
International Journal for Numerical Methods in Engineering 90 (9), 1118-1155, 2012
37 2012 Second-order phase-field formulations for anisotropic brittle fracture T Gerasimov, L De Lorenzis
Computer Methods in Applied Mechanics and Engineering 389, 114403, 2022
30 2022 Goal-oriented explicit residual-type error estimates in XFEM M Rüter, T Gerasimov, E Stein
Computational Mechanics 52 (2), 361-376, 2013
29 2013 Corners give problems when decoupling fourth order equations into second order systems T Gerasimov, A Stylianou, G Sweers
SIAM Journal on Numerical Analysis 50 (3), 1604-1623, 2012
21 2012 Convergence study of the h -adaptive PUM and the hp -adaptive FEM applied to eigenvalue problems in quantum mechanics D Davydov, T Gerasimov, JP Pelteret, P Steinmann
Advanced Modeling and Simulation in Engineering Sciences 4, 1-23, 2017
16 2017 Constant‐free explicit error estimator with sharp upper error bound property for adaptive FE analysis in elasticity and fracture T Gerasimov, E Stein, P Wriggers
International Journal for Numerical Methods in Engineering 101 (2), 79-126, 2015
16 2015 Some studies on the deformation of the membrane in an RF MEMS switch VR Ambati, A Asheim, JB van den Berg, Y van Gennip, T Gerasimov, ...
Proceedings of the sixty-third European Study Group Mathematics with …, 2008
8 2008 On the D Davydov, T Gerasimov, JP Pelteret, P Steinmann
arXiv preprint arXiv:1612.02305, 2016
5 2016 Explicit and implicit residual-type goal-oriented error estimators for xfem in lefm E Stein, T Gerasimov, M Rüter
International Conference on Adaptive Modeling and Simulation, ADMOS, 2011
4 2011 Error-controlled adaptive multiscale analysis for crack initiation and propagation in brittle materials E Stein, T Gerasimov, M Rüter
Adaptive Modeling and Simulation, 26, 2013
3 2013 Regularity for a clamped grid equation u_ {xxxx}+ u_ {yyyy}= f on a domain with a corner GH Sweers, T Gerasimov
Electronic Journal of Differential Equations 2009 (47), 1-54, 2009
2 * 2009 The clamped elastic grid, a fourth order equation on a domain with corner T Gerasimov
Analysis group, Delft Institute of Applied Mathematics Delft University of …, 2009
1 2009 
Laura De LorenzisETH ZürichEmail được xác minh tại ethz.ch