A canonical form for the continuous piecewise polynomial functions

We present in this paper a canonical form for the elements in the ring of continuous piecewise polynomial functions. This new representation is based on the use of a particular class of functions $$\{C_i(P):P\in\Q[x],i=0,\ldots,\deg(P)\}$$ defined by $$C_i(P)(x)= \left\{ \begin{array}{cll}0 & \mbox{ if } & x \leq \alpha \\ P(x) & \mbox{ if } & x \geq \alpha \end{array} \right.$$ where $\alpha$ is the $i$-th real root of the polynomial $P$. These functions will allow us to represent and manipulate easily every continuous piecewise polynomial function through the use of the corresponding canonical form. It will be also shown how to produce a "rational" representation of each function $C_{i}(P)$ allowing its evaluation by performing only operations in $\Q$ and avoiding the use of any real algebraic number.