Explicit structure of the vanishing viscosity limits with initial data consisting of δ-distributions starting from two point sources

Abstract

In this article, we consider the one-dimensional zero-pressure gas dynamics system \[ ut + ( u2/2 )x = 0,\ t + ( u)x = 0 \] in the upper-half plane with a linear combination of two δ-distributions \[ u|t=0 = ua\ δx=a + ub\ δx=b,\ |t=0 = c\ δx=c + d\ δx=d \] as initial data. Here a, b, c, d are distinct points on the real line ordered as a < c < b < d. Our objective is to provide a detailed analysis of the structure of the vanishing viscosity limits of this system utilizing the corresponding modified adhesion model \[ uεt + ((uε)2/2 )x =ε2 uεxx,\ εt + (ε uε)x = ε2 εxx. \] For this purpose, we extensively use the various asymptotic properties of the function erfc: z ∫z∞ e-s2\ ds along with suitable Hopf-Cole transformations.