Nonlinearity, conservation law and shocksPart I: Genuine nonlinearity and discontinuous solutions

We present in two parts, a mathematical theory of conservation laws using the language of physics. In Part I we explain the concept of a special type of nonlinearity which appears in an important class of evolutionary processes governed by hyperbolic partial differential equations. For simplicity, we develop the theory using a simple model equation. We show that it is possible to extend the concept of solutions with discontinuities with the help of a conservation form of the equation.