I am just wondering how is the "less than" relationship defined for real numbers.

I understand that for natural numbers (`nat`

), `<`

can be defined recursively in terms of one number being the (`1+`

) successor `S`

of another number. I heard that many things about real numbers are axiomatic in Coq and do not compute.

But I am wondering whether there is a minimum set of axioms for real numbers in Coq based upon which other properties/relations can be derived. (e.g. Coq.Reals.RIneq has it that `Rplus_0_r : forall r, r + 0 = r.`

is an axiom, among others)

In particular, I am interested in whether the relationships such as `<`

or `<=`

can be defined on top of the equality relationship. For example, I can imagine that in conventional math, given two numbers `r1 r2`

:

```
r1 < r2 <=> exists s, s > 0 /\ r1 + s = r2.
```

But does this hold in the constructive logic of Coq? And can I use this to at least do some reasoning about inequalities (instead of rewriting axioms all the time)?