\def\g{{\frak g}} We consider pairs of Lie algebras $\g$ and $\overline{\g}$, defined over a common vector space, where the Lie brackets of $\g$ and $\overline{\g}$ are related via a post-Lie algebra structure. The latter can be extended to the Lie enveloping algebra ${\cal U}(\g)$. This permits us to define another associative product on ${\cal U}(\g)$, which gives rise to a Hopf algebra isomorphism between ${\cal U}(\overline{\g})$ and a new Hopf algebra assembled from ${\cal U}(\g)$ with the new product.\endgraf For the free post-Lie algebra these constructions provide a refined understanding of a fundamental Hopf algebra appearing in the theory of numerical integration methods for differential equations on manifolds. In the pre-Lie setting, the algebraic point of view developed here also provides a concise way to develop Butcher's order theory for Runge-Kutta methods.