Abstract
This paper investigates a Cahn-Hilliard-Swift-Hohenberg system, focusing on a three-species chemical mixture subject to physical constraints on volume fractions. The resulting system leads to complex patterns involving a separation into phases as typical of the Cahn-Hilliard equation and small scale stripes and dots as seen in the Swift-Hohenberg equation. We introduce singular potentials of logarithmic type to enhance the model's accuracy in adhering to essential physical constraints. The paper establishes the existence and uniqueness of weak solutions within this extended framework. The insights gained contribute to a deeper understanding of phase separation in complex systems, with potential applications in materials science and related fields. We introduce a stable finite element approximation based on an obstacle formulation. Subsequent numerical simulations demonstrate that the model allows for complex structures as seen in pigment patterns of animals and in porous polymeric materials.
Original language | English |
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Pages (from-to) | 2055-2097 |
Number of pages | 43 |
Journal | Mathematical Models and Methods in Applied Sciences |
Volume | 34 |
Issue number | 11 |
DOIs | |
Publication status | Published - Oct 2024 |
Scopus Subject Areas
- Modelling and Simulation
- Applied Mathematics
User-Defined Keywords
- Cahn-Hilliard-Swift-Hohenberg equation
- materials science
- numerical simulations
- pattern formation
- phase separation
- singular potentials
- well-posedness