Coleman–Gurtin type equations with dynamic boundary conditions CG Gal, JL Shomberg
Physica D: Nonlinear Phenomena 292, 29-45, 2015
16 2015 Attractors for strongly damped wave equations with nonlinear hyperbolic dynamic boundary conditions PJ Graber, JL Shomberg
Nonlinearity 29 (4), 1171, 2016
14 2016 Hyperbolic relaxation of reaction-diffusion equations with dynamic boundary conditions C Gal, J Shomberg
Quarterly of Applied Mathematics 73 (1), 93-129, 2015
11 2015 Multi–component Cahn–Hilliard Systems with Singular Potentials: Theoretical Results CG Gal, M Grasselli, A Poiatti, JL Shomberg
Applied Mathematics & Optimization 88 (3), 73, 2023
8 2023 Attractors for damped semilinear wave equations with a Robin–acoustic boundary perturbation JL Shomberg
Nonlinear Analysis 189, 111582, 2019
7 2019 Cahn–Hilliard equations governed by weakly nonlocal conservation laws and weakly nonlocal particle interactions CG Gal, JL Shomberg
Annales de l'Institut Henri Poincaré C 39 (5), 1179-1234, 2022
6 2022 Well-posedness of semilinear strongly damped wave equations with fractional diffusion operators and JL Shomberg
6 2019 Robust Exponential Attractors for Coleman--Gurtin Equations with Dynamic Boundary Conditions Possessing Memory JL Shomberg
arXiv preprint arXiv:1602.01275, 2016
4 2016 Well-posedness and global attractors for a non-isothermal viscous relaxation of nonlocal Cahn-Hilliard equations JL Shomberg
arXiv preprint arXiv:1606.04325, 2016
3 2016 Attractors for a neural network equation JL Shomberg
Differential Equations and Dynamical Systems 23, 99-115, 2015
3 2015 A note on surfaces with radially symmetric nonpositive Gaussian curvature J Shomberg
Mathematica Bohemica 130 (2), 167-176, 2005
3 2005 MULTI-COMPONENT CAHN–HILLIARD SYSTEMS WITH SINGULAR POTENTIALS: NUMERICAL RESULTS AND CASCADING PHENOMENA CG GAL, M GRASSELLI, A POIATTI, JL SHOMBERG
1 2024 Modeling change in public sentiment with nonlocal reaction-diffusion equations JL Shomberg
arXiv preprint arXiv:2105.03920, 2021
1 2021 Global existence of weak solutions for strongly damped wave equations with nonlinear boundary conditions and balanced potentials JL Shomberg
Bulletin of the Australian Mathematical Society 99 (3), 432-444, 2019
1 2019 Exponential Decay Results for Semilinear Parabolic PDE with JL Shomberg
Differential Equations and Dynamical Systems 26 (4), 355-370, 2018
1 2018 Upper-semicontinuity of the global attractors for a class of nonlocal Cahn-Hilliard equations JL Shomberg
arXiv preprint arXiv:1805.06320, 2018
1 2018 A family of approximate inertial manifolds for a Van der Pol/FitzHugh–Nagumo perturbation problem JL Shomberg, C Nartea
International Journal of Computer Mathematics 88 (7), 1443-1470, 2011
1 2011 A GENERAL PARADIGM OF BINARY PHASE-SEGREGATION PROCESSES THROUGH THE LENS OF FOUR CRITICAL MECHANISMS M DE JESUS, CG GAL, JL SHOMBERG
2024 Well-Posedness and Global Attractors for Viscous Fractional Cahn–Hilliard Equations with Memory E Öztürk, JL Shomberg
Fractal and Fractional 6 (9), 505, 2022
2022 Weak exponential attractors for Coleman-Gurtin equations with dynamic boundary conditions possessing different memory kernels JL Shomberg
2020 
Ciprian G. GalFlorida International UniversityEmail verificata su fiu.edu