Abstract: The noncommutative version of the Euclidean ${g}^{2}{\ensuremath{\varphi}}^{4}$ theory is considered. By using Wilsonian flow equations the ultraviolet renormalizability can be proved to all orders in perturbation theory. On the other hand, the infrared sector cannot be treated perturbatively and requires a resummation of the leading divergences in the two-point function. This is analogous to what is done in the hard thermal loops resummation of finite temperature field theory. Next-to-leading order corrections to the self-energy are computed, resulting in $O({g}^{3})$ contributions in the massless case, and $O({g}^{6}\mathrm{log}{g}^{2})$ in the massive one.