| 1 |
Optimal Distributed Control of a Cahn-Hilliard-Darcy System with Mass Sources
Sprekels J, Wu H
Applied Mathematics and Optimization, 83(1), 489, 2021 |
| 2 |
A Diffuse Interface Model of a Two-Phase Flow with Thermal Fluctuations
Feireisl E, Petcu M
Applied Mathematics and Optimization, 83(1), 531, 2021 |
| 3 |
The Stochastic Viscous Cahn-Hilliard Equation: Well-Posedness, Regularity and Vanishing Viscosity Limit
Scarpa L
Applied Mathematics and Optimization, 84(1), 487, 2021 |
| 4 |
Long-Time Dynamics and Optimal Control of a Diffuse Interface Model for Tumor Growth
Cavaterra C, Rocca E, Wu H
Applied Mathematics and Optimization, 83(2), 739, 2021 |
| 5 |
Existence and Continuity of Inertial Manifolds for the Hyperbolic Relaxation of the Viscous Cahn-Hilliard Equation
Bonfoh A
Applied Mathematics and Optimization, 84(3), 3339, 2021 |
| 6 |
Systematic identification of safe harbor regions in the CHO genome through a comprehensive epigenome analysis
Hilliard W, Lee KH
Biotechnology and Bioengineering, 118(2), 659, 2021 |
| 7 |
A coupled continuum-statistical model to predict interfacial deformation under an external field
Chaudhuri J, Bandyopadhyay D
Journal of Colloid and Interface Science, 587, 864, 2021 |
| 8 |
Simultaneous Decomposition and Dewetting of Nanoscale Alloys: A Comparison of Experiment and Theory
Diez JA, Gonzalez AG, Garfinkel DA, Rack PD, McKeown JT, Kondic L
Langmuir, 37(8), 2575, 2021 |
| 9 |
Optimal Distributed Control of an Extended Model of Tumor Growth with Logarithmic Potential
Signori A
Applied Mathematics and Optimization, 82(2), 517, 2020 |
| 10 |
Optimal Distributed Control of a Generalized Fractional Cahn-Hilliard System
Colli P, Gilardi G, Sprekels J
Applied Mathematics and Optimization, 82(2), 551, 2020 |
