I'd like to use ssreflect's lemmas on the Reals defined in `Coq.Reals.Raxioms`

.
How do I do that?

For example, I'd like to be able to use the `add`

, `mul`

, etc. operations defined for `ssralg.GRing.Ring`

directly on variables of type `Rdefintions.R`

and apply the `Num.real_closed_axiom`

directly on Coq reals.

Is it necessary to prove all the structures from eqType, choice, zmodule, etc, up to the ClosedReals? If so, someone must have done so before, but I have not been able to find it. Is there some other development I can use?

If not so, what is the right way to do it via axioms? Does one have to add additional coercions and `Canonical`

structure statements.