Analysis of a phase-field model for two-phase compressible fluids E Feireisl, H Petzeltová, E Rocca, G Schimperna Mathematical Models and Methods in Applied Sciences 20 (07), 1129-1160, 2010 | 141 | 2010 |
On a diffuse interface model of tumour growth S Frigeri, M Grasselli, E Rocca European Journal of Applied Mathematics 26 (2), 215-243, 2015 | 113 | 2015 |
Optimal distributed control of a diffuse interface model of tumor growth P Colli, G Gilardi, E Rocca, J Sprekels Nonlinearity 30 (6), 2518, 2017 | 107 | 2017 |
Optimal control of treatment time in a diffuse interface model of tumor growth H Garcke, KF Lam, E Rocca Applied Mathematics & Optimization 78, 495-544, 2018 | 79 | 2018 |
Optimal distributed control of a nonlocal Cahn--Hilliard/Navier--Stokes system in two dimensions S Frigeri, E Rocca, J Sprekels SIAM Journal on Control and Optimization 54 (1), 221-250, 2016 | 77 | 2016 |
A new approach to non-isothermal models for nematic liquid crystals E Feireisl, M Frémond, E Rocca, G Schimperna Archive for Rational Mechanics and Analysis 205 (2), 651-672, 2012 | 76 | 2012 |
Vanishing viscosities and error estimate for a Cahn–Hilliard type phase field system related to tumor growth P Colli, G Gilardi, E Rocca, J Sprekels Nonlinear Analysis: Real World Applications 26, 93-108, 2015 | 68 | 2015 |
Analysis of a diffuse interface model of multispecies tumor growth M Dai, E Feireisl, E Rocca, G Schimperna, ME Schonbek Nonlinearity 30 (4), 1639, 2017 | 66 | 2017 |
A diffuse interface model for two-phase incompressible flows with non-local interactions and non-constant mobility S Frigeri, M Grasselli, E Rocca Nonlinearity 28 (5), 1257, 2015 | 62 | 2015 |
On a multi-species Cahn-Hilliard-Darcy tumor growth model with singular potentials S Frigeri, KF Lam, E Rocca, G Schimperna arXiv preprint arXiv:1709.01469, 2017 | 60 | 2017 |
On the long time behavior of a tumor growth model A Miranville, E Rocca, G Schimperna Journal of Differential Equations 267 (4), 2616-2642, 2019 | 59 | 2019 |
ASYMPTOTIC ANALYSES AND ERROR ESTIMATES FOR A CAHN-HILLIARD TYPE PHASE FIELD SYSTEM MODELLING TUMOR GROWTH. P Colli, G Gilardi, E Rocca, J Sprekels Discrete & Continuous Dynamical Systems-Series S 10 (1), 2017 | 59 | 2017 |
On a non-isothermal model for nematic liquid crystals E Feireisl, E Rocca, G Schimperna Nonlinearity 24 (1), 243, 2010 | 59 | 2010 |
Universal attractor for some singular phase transition systems E Rocca, G Schimperna Physica D: Nonlinear Phenomena 192 (3-4), 279-307, 2004 | 58 | 2004 |
Global weak solution and blow-up criterion of the general Ericksen–Leslie system for nematic liquid crystal flows C Cavaterra, E Rocca, H Wu Journal of Differential Equations 255 (1), 24-57, 2013 | 57 | 2013 |
Graded-material design based on phase-field and topology optimization M Carraturo, E Rocca, E Bonetti, D Hömberg, A Reali, F Auricchio Computational Mechanics 64, 1589-1600, 2019 | 55 | 2019 |
A degenerating PDE system for phase transitions and damage E Rocca, R Rossi Mathematical Models and Methods in Applied Sciences 24 (07), 1265-1341, 2014 | 54 | 2014 |
Evolution of non-isothermal Landau-de Gennes nematic liquid crystals flows with singular potential E Feireisl, E Rocca, G Schimperna, A Zarnescu arXiv preprint arXiv:1207.1643, 2012 | 52 | 2012 |
``Entropic” solutions to a thermodynamically consistent PDE system for phase transitions and damage E Rocca, R Rossi SIAM Journal on Mathematical Analysis 47 (4), 2519-2586, 2015 | 51 | 2015 |
Nonlinear evolution inclusions arising from phase change models P Colli, P Krejčí, E Rocca, J Sprekels Czechoslovak Mathematical Journal 57, 1067-1098, 2007 | 51 | 2007 |