Injections into function spaces over ordinals

We investigate when and how function spaces over subspaces of ordinals admit continuous injections into each other. To formulate our results let τ be an uncountable regular cardinal. We prove, in particular, that: (1) If A and B are disjoint stationary subsets of τ then Cp(A) does not admit a continuous injection into Cp(B); (2) For A⊂ω1, admits a continuous injection into iff A is countable or ω1 embeds into A (which, in its turn, is equivalent to the statement “ embeds into ”).