The halting problem does not act on languages. Rather, it acts on machines
(i.e., programs): it asks whether a given program halts on a given input.

Perhaps you meant to ask whether it can be solved for other models of
computation (like regular expressions, which you mention, but also like
push-down automata).

Halting can, in general, be detected in models with finite resources (like
regular expressions or, equivalently, finite automata, which have a fixed
number of states and no external storage). This is easily accomplished by
enumerating all possible configurations and checking whether the machine enters
the same configuration twice (indicating an infinite loop); with finite
resources, we can put an upper bound on the amount of time before we *must* see
a repeated configuration if the machine does not halt.

Usually, models with infinite resources (unbounded TMs and PDAs, for instance),
cannot be halt-checked, but it would be best to investigate the models and
their open problems individually.

(Sorry for all the Wikipedia links, but it actually is a very good resource for
this kind of question.)