The mathematical formulation of the dynamics observed in fluid power systems in-volves the numerical solution of differential equations. Because of the intrinsic characteris-tics and physics of fluid power circuits, the numerical integrators employed to solve such system of equations must retain certain properties in order to guarantee the accuracy, stability and efficiency of the numerical solution. In this thesis, different classes of numerical integration methods used for stiff systems have been analyzed and tested in order to quantitatively and qualitatively assess their performance against the numerical stiffness, high non-linearities and discontinuities typically shown in the differential equations arisen in fluid power circuits. Nume...