Uniqueness for discontinuous ODE and conservation laws

Some physical systems described by ODEs have quantities that are conserved as the system evolves. Runge-Kutta formulas and linear multistep methods preserve linear conservation laws automatically. A code for the integration of ODEs involves a number of algorithms in addition to the basic formula. It

We study the Cauchy problem for systems of conservation laws which belong to the Temple class. The compensated-compactness theory is used to prove existence of solutions. Some uniqueness results are established by means of Holmgren's principle.

Some ODEs have conservation laws, functions of a solution with constant values. Generally, numerical solutions do not satisfy these laws. This can mean that the numerical solution does not have the right qualitative behavior. The theory and practice of imposing conservation laws by projection is de