DOIAbstract
In this thesis we examine how to recover continuous systems from discrete systems, i.e. differential equations from difference equations. In particular, we are interested in equations with a variational (Lagrangian) structure and the transferal of this structure from the discrete to the continuous. In the context of numerical integration, the differential equation corresponding to a given difference equation is known as its modified equation. Studying the modified equation to learn about a numerical integrator is a form of backward error analysis. It is well known that for a symplectic integrator applied to a Hamiltonian system, the modified equation is again a Hamiltonian equation. We will prove the corresponding result on the Lagrangian ...
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