Suppose that I have already proved some theorem in coq, and later I want to introduce it as a hypothesis in the proof of another theorem. Is there a succinct way to do this?

The need for this typically arises for me when I want to do something like a proof by cases. And I've discovered that one way to do this is to `assert`

the statement of the theorem, and then immediately prove it, but this seems kind of cumbersome. For example I tend to write things like:

```
Require Import Arith.EqNat.
Definition Decide P := P \/ ~P.
Theorem decide_eq_nat: forall x y: nat, Decide (x = y).
Proof.
intros x y. remember (beq_nat x y) as b eqn:E. destruct b.
left. apply beq_nat_eq. assumption.
right. apply beq_nat_false. symmetry. assumption. Qed.
Theorem silly: forall x y: nat, x = y \/ x <> y.
Proof.
intros x y.
assert (Decide (x = y)) as [E|N] by apply decide_eq_nat.
left. assumption.
right. assumption. Qed.
```

But is there an easier way than having to type the whole `assert [statement] by apply [theorem]`

thing?