Let $K_1, K_2, \dots$ be a countable sequence of fields, and let $\prod_{\mathcal F} K_i$ be the ultraproduct with respect to some nonprincipal ultrafilter $\mathcal F$. Question: Can there be a field isomorphism $\prod_{\mathcal F} K_i \cong \mathbb R$? I think I gather that this can’t happen if...