Multilayered fluid-structure interactions: existence of weak solutions for time-periodic and initial-value problems

We study the interaction between incompressible viscous fluids and multilayered elastic structures in a 3D/2D/3D framework, where a 3D fluid interacts with a 2D thin elastic layer, coupled to a 3D thick elastic solid. The system is driven by time-periodic boundary conditions involving Bernoulli pressure. We prove the existence of at least one time-periodic weak solution when the boundary pressure has a sufficiently small $L^2-$ norm. A key feature of our analysis is the assumption of viscoelasticity in the thick solid, which is crucial for obtaining diffusion estimates and ensuring energy stability. Without this assumption, weak solutions are established for the initial-value problem. Our results extend prior work on 2D/1D/2D configurations to the more complex 3D/2D/3D setting, providing new insights into multilayered fluid-structure interactions.