Gradient blowup of smooth vacuum solutions to 1D compressible Euler equations
Abstract
We consider the isentropic compressible Euler equations in the half-line which govern the motion of gaseous fluids in contact with stationary vacuum boundary. We construct a large class of solutions that are initially smooth and square-integrable, and which, in finite time, transition to C1-μ regularity for μ ∈ [1/2,1) near the boundary, leading to the gradient blowup at the boundary. It is based on stability analysis of self-similar waiting time solutions JLN2025 recently constructed by the authors.
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