We prove a strong dichotomy result for countably-infinite oriented graphs; that is, we prove that for all countably-infinite oriented graphs G G , either (i) there is a countably-infinite tournament K K such that G ⊈ K G\not \subseteq K , or (ii) every countably-infinite tournament contains a spanning copy of G G . Furthermore, we are able to give a concise characterization of such oriented graphs. Our characterization becomes even simpler in the case of transitive acyclic oriented graphs (i.e. strict partial orders). For uncountable oriented graphs, we are able to extend the dichotomy result mentioned above to all regular cardinals κ \kappa ; however, we are only able to provide a concise characterization in the case when κ = ℵ 1 \kappa =\aleph _1 .