Discontinuous Functions Represented by Exact, Closed, Continuous Parametric Equations

A simple procedure is proposed to represent a discontinuous function by continuous parametric equations without a significant change in the nature of the original function. Furthermore, this representation is exact and closed. As it is well known, series expansions of functions with discontinuities are plagued by spurious oscillations due to the Gibbs phenomenon. Since in the proposed parametric representation there are no discontinuities, no Gibbs phenomenon arises in its series expansion.