Summary: In [7] and [8], Parker and Sochacki considered iterative methods for computing the power series solution to ${\bf y' = G \circ y}$ where ${\bf G}$ is a polynomial from $\mathbb{R}^n$ to $\mathbb{R}^n$, including truncations of Picard iteration. The authors demonstrated that many ODE's may be transformed into computationally feasible polynomial problems of this type, and the methods generalize to a broad class of initial value PDE's. In this paper we show that the subset of the real analytic functions $\mathcal{A}$ consisting of functions that are components of the solution to polynomial differential equations is a proper subset of $\mathcal{A}$ and that it shares the field and near-field structure of $\mathcal{A}$, thus making it a proper sub-algebra. Consequences of the algebraic structure are investigated. Using these results we show that the Maclaurin or Taylor series can be generated algebraically for a large class of functions. This finding can be used to generate efficient numerical methods of arbitrary order (accuracy) for initial value ordinary differential equations. Examples to indicate these techniques are presented. Future advances in numerical solutions to initial value ordinary differential equations are indicated.