Igor Kukavica, Linfeng Li, Amjad Tuffaha
Published 2022-02-06Version 1
We address a system of equations modeling a compressible fluid interacting with an elastic body in dimension three. We prove the local existence and uniqueness of a strong solution when the initial velocity belongs to the space $H^{2+\epsilon}$ and the initial structure velocity is in $H^{1.5+\epsilon}$ , where $\epsilon \in (0, 1/2)$.
On the local existence of solutions to the fluid-structure interaction problem with a free interface
On the local existence of solutions to the fluid-structure interaction problem with a free interface
Structure of the free interfaces near triple junction singularities in harmonic maps and optimal partition problems
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