# Step by step simplification in coq?

Is there a way to simplify one step at a time?

Say you have `f1 (f2 x)` both of which can be simplified in turn via a single `simpl`, is it possible to simplify `f2 x` as a first step, examine the intermediate result and then simplify `f1`?

Take for example the theorem:

``````Theorem pred_length : forall n : nat, forall l : list nat,
pred (length (n :: l)) = length l.
Proof.
intros.
simpl.
reflexivity.
Qed.
``````

The `simpl` tactic simplifies `Nat.pred (length (n :: l))` to `length l`. Is there a way to break that into a two step simplification i.e:

``````Nat.pred (length (n :: l)) --> Nat.pred (S (length l)) --> length l
``````

You can also use `simpl` for a specific pattern.

``````Theorem pred_length : forall n : nat, forall l : list nat,
pred (length (n :: l)) = length l.
Proof.
intros.
simpl length.
simpl pred.
reflexivity.
Qed.
``````

In case you have several occurrences of a pattern like `length` that could be simplified, you can further restrict the outcome of the simplification by giving a position of that occurrence (from left to right), e.g. `simpl length at 1` or `simpl length at 2` for the first or second occurrence.

• That's very useful! But I see that this simplifies all what it is within the pattern. For example `f (g x)` with `simpl f.` will also simplify using `g` definition. Is is possible to instruct coq, in this example case, to just use `f` definition to simplify, and let `g x` as it is? May 11, 2018 at 8:48

We can turn simplification for `pred` off, simplify its argument and turn it back on:

``````Theorem pred_length : forall n : nat, forall l : list nat,
pred (length (n :: l)) = length l.
Proof.
intros.
Arguments pred : simpl never.    (* do not unfold pred *)
simpl.
Arguments pred : simpl nomatch.  (* unfold if extra simplification is possible *)
simpl.
reflexivity.
Qed.
``````

See §8.7.4 of the Reference Manual for more details.

• @Savvas Savvides Thank you for accepting my answer, but let me respectfully suggest you not to accept answers too early, since it could discourage some users from providing their own high-quality answers which we are all here interested in. It's better to wait at least 24 hours. Have a nice day and good luck :) Sep 6, 2016 at 20:56