Ergodic and combinatorial results obtained in Bergelson and Moreira [Ergodic theorem involving additive and multiplicative groups of a field and $\{x+y,xy\}$ patterns. Ergod. Th. & Dynam. Sys. to appear, published online 6 October 2015, doi:10.1017/etds.2015.68], involved measure preserving actions of the affine group of a countable field $K$. In this paper, we develop a new approach, based on ultrafilter limits, which allows one to refine and extend the results obtained in Bergelson and Moreira, op. cit., to a more general situation involving measure preserving actions of the non-amenable affine semigroups of a large class of integral domains. (The results and methods in Bergelson and Moreira, op. cit., heavily depend on the amenability of the affine group of a field.) Among other things, we obtain, as a corollary of an ultrafilter ergodic theorem, the following result. Let $K$ be a number field and let ${\mathcal{O}}_{K}$ be the ring of integers of $K$. For any finite partition $K=C_{1}\cup \cdots \cup C_{r}$, there exists $i\in \{1,\ldots ,r\}$ such that, for many $x\in K$ and many $y\in {\mathcal{O}}_{K}$, $\{x+y,xy\}\subset C_{i}$.