Nonlocal-to-local convergence of Cahn–Hilliard equations: Neumann boundary conditions and viscosity terms E Davoli, L Scarpa, L Trussardi Archive for Rational Mechanics and Analysis 239 (1), 117-149, 2021 | 45 | 2021 |
Degenerate nonlocal Cahn-Hilliard equations: well-posedness, regularity and local asymptotics E Davoli, H Ranetbauer, L Scarpa, L Trussardi Annales de l'Institut Henri Poincaré C, Analyse non linéaire 37 (3), 627-651, 2020 | 35 | 2020 |
A quasistatic evolution model for perfectly plastic plates derived by Γ-convergence E Davoli, MG Mora Annales de l'IHP Analyse non linéaire 30 (4), 615-660, 2013 | 34 | 2013 |
Local asymptotics for nonlocal convective Cahn-Hilliard equations with W1, 1 kernel and singular potential E Davoli, L Scarpa, L Trussardi Journal of Differential Equations 289, 35-58, 2021 | 33 | 2021 |
A critical revisiting of finite elasto-plasticity E Davoli, GA Francfort SIAM Journal on Mathematical Analysis 47 (1), 526-565, 2015 | 29 | 2015 |
Sharp Law for the Minimizers of the Edge-Isoperimetric Problem on the Triangular Lattice E Davoli, P Piovano, U Stefanelli Journal of Nonlinear Science 27, 627-660, 2017 | 28 | 2017 |
Wulff shape emergence in graphene E Davoli, P Piovano, U Stefanelli Mathematical Models and Methods in Applied Sciences 26 (12), 2277-2310, 2016 | 28 | 2016 |
Analytical validation of the Young–Dupré law for epitaxially-strained thin films E Davoli, P Piovano Mathematical Models and Methods in Applied Sciences 29 (12), 2183-2223, 2019 | 23 | 2019 |
Two-well rigidity and multidimensional sharp-interface limits for solid–solid phase transitions E Davoli, M Friedrich Calculus of Variations and Partial Differential Equations 59 (2), 44, 2020 | 21 | 2020 |
Quasistatic evolution models for thin plates arising as low energy Γ-limits of finite plasticity E Davoli Mathematical Models and Methods in Applied Sciences 24 (10), 2085-2153, 2014 | 20 | 2014 |
Linearized plastic plate models as Γ-limits of 3D finite elastoplasticity E Davoli ESAIM: Control, Optimisation and Calculus of Variations 20 (3), 725-747, 2014 | 16 | 2014 |
Homogenization of integral energies under periodically oscillating differential constraints E Davoli, I Fonseca Calculus of Variations and Partial Differential Equations 55, 1-60, 2016 | 15 | 2016 |
Adaptive image processing: first order PDE constraint regularizers and a bilevel training scheme E Davoli, I Fonseca, P Liu Journal of Nonlinear Science 33 (3), 41, 2023 | 14 | 2023 |
Micromagnetics of thin films in the presence of Dzyaloshinskii–Moriya interaction E Davoli, G Di Fratta, D Praetorius, M Ruggeri Mathematical Models and Methods in Applied Sciences 32 (05), 911-939, 2022 | 14 | 2022 |
Derivation of a heteroepitaxial thin-film model E Davoli, P Piovano Interfaces and Free Boundaries 22 (1), 1-26, 2020 | 14 | 2020 |
Magnetoelastic thin films at large strains E Davoli, M Kružík, P Piovano, U Stefanelli Continuum Mechanics and Thermodynamics 33 (2), 327-341, 2021 | 13 | 2021 |
Homogenization in BV of a model for layered composites in finite crystal plasticity E Davoli, R Ferreira, C Kreisbeck Advances in calculus of variations 14 (3), 441-473, 2021 | 12 | 2021 |
Convergence of equilibria of thin elastic rods under physical growth conditions for the energy density E Davoli, MG Mora Proceedings of the Royal Society of Edinburgh Section A: Mathematics 142 (3 …, 2012 | 12 | 2012 |
A note about hardening-free viscoelastic models in Maxwellian-type rheologies at large strains E Davoli, T Roubíček, U Stefanelli Mathematics and Mechanics of Solids 26 (10), 1483-1497, 2021 | 11 | 2021 |
Homogenization of chiral magnetic materials-A mathematical evidence of Dzyaloshinskii's predictions on helical structures E Davoli, G Di Fratta Journal of Nonlinear Science 30, 1229-1262, 2020 | 11 | 2020 |