A vanishing dynamic capillarity limit equation with discontinuous flux

Abstract

We prove existence and uniqueness of a solution to the Cauchy problem corresponding to the equation equation* cases ∂t u,δ +div f,δ( x, u,δ)= u,δ+δ() ∂t u,δ, \ \ x ∈ M, \ \ t≥ 0 u|t=0=u0( x). cases equation* Here, f,δ and u0 are smooth functions while and δ=δ() are fixed constants. Assuming f,δ f ∈ Lp( Rd× R;Rd) for some 1<p<∞, strongly as 0, we prove that, under an appropriate relationship between and δ() depending on the regularity of the flux f, the sequence of solutions (u,δ) strongly converges in L1loc(R+× Rd) towards a solution to the conservation law ∂t u +div f( x, u)=0. The main tools employed in the proof are the Leray-Schauder fixed point theorem for the first part and reduction to the kinetic formulation combined with recent results in the velocity averaging theory for the second.