Remark on global existence of solutions to the 1D compressible Euler equation with time-dependent damping
Abstract
In this paper, we consider the 1D compressible Euler equation with the damping coefficient λ/(1+t)μ. Under the assumption that 0≤ μ <1 and λ >0 or μ=1 and λ > 2, we prove that solutions exist globally in time, if initial data are small C1 perturbation near constant states. In particular, we remove the conditions on the limit |x| → ∞ (u (0,x), v (0,x)), assumed in previous results.
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