Viscous Conservation Laws in 1d With Measure Initial Data
Abstract
The one-dimensional viscous conservation law is considered on the whole line ut + f(u)x= uxx, (x,t)∈×, >0, subject to positive measure initial data. The flux f∈ C1() is assumed to satisfy a p-condition, a weak form of convexity. Existence and uniqueness of solutions is established. The method of proof relies on sharp decay estimates for viscous Hamilton-Jacobi equations.
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