We give a characterization, with respect to a large class of models of
untyped lambda-calculus, of those models that are fully abstract for
head-normalization, i.e., whose equational theory is H* (observations for head
normalization). An extensional K-model D is fully abstract if and only if it
is hyperimmune, {\em i.e.}, not well founded chains of elements of D cannot be
captured by any recursive function.
This article, together with its companion paper, form the long version of
[Bre14]. It is a standalone paper that presents a purely semantical proof of
the result as opposed to its companion paper that presents an independent and
purely syntactical proof of the same result