Blowup with Small BV Data in Hyperbolic Conservation Laws

## Abstract In this paper, we will give BV‐estimates of Lax–Friedrichs' scheme for a simple hyperbolic system of conservation laws with relaxation and get the global existence and uniqueness of BV‐solution by the BV‐estimates above. Furthermore, our results show that the solution converge towards t

In this paper we discuss asymptotic behavior for the hyperbolic conservation law with periodic initial data of period p. The function f is a smooth nonlinear function of u. In general, equation (1.1) does not have a continuous solution for all time. Shock curves appear after finite time and tend to

## Abstract In this paper we prove an explicit representation formula for the solution of a one‐dimensional hyperbolic conservation law with a non‐convex flux function but monotone initial data. This representation formula is similar to those of Lax [10] and Kunik [7,8] and enables us to compute th

plementing the characteristic equations with appropriate jump relations, i.e., by solving the corresponding local Rie- The present work is concerned with an application of the theory of characteristics to conservation laws with source terms in one mann problem. space dimension, such as the Euler e