Interaction of elementary waves of scalar conservation laws with discontinuous flux function

## Abstract This paper is concerned with the interaction of elementary waves on a bounded domain for scalar conservation laws. The structure and large time asymptotic behaviours of weak entropy solution in the sense of Bardos __et al__. (Comm. Partial Differential Equations 1979; 4: 1017) are clari

## Abstract For the scalar conservation laws with discontinuous flux, an infinite family of (__A, B__)‐interface entropies are introduced and each one of them is shown to form an __L__^1^‐contraction semigroup (see [2]). One of the main unsettled questions concerning conservation law with discontin

Uniqueness of a generalized entropy solution (g.e.s.) to the Cauchy problem for N-dimensional scalar conservation laws u t +div x ,(u)= g, u(0, } )= f with continuous flux function , is still an open problem. For data ( f, g) vanishing at infinity, we show that there exist a maximal and a minimal g.

## Abstract In this paper, we study the interaction of elementary waves including delta‐shock waves on a boundary for a hyperbolic system of conservation laws. A boundary entropy condition is derived, thanks to the results of Dubois and Le Floch (__J. Differ. Equations__ 1988; **71**:93–122) by tak

We establish a unique stable solution to the Hamilton-Jacobi equation x 2 ðÀ1; 1Þ; t 2 ½0; 1Þ with Lipschitz initial condition, where Kðx; tÞ is allowed to be discontinuous in the ðx; tÞ plane along a finite number of (possibly intersecting) curves parameterized by t: We assume that for fixed k;