This is part of #3983.
Fine-grained equational lemmas are useful even for non-recursive
functions, so this adds them.
The new option `eqns.nonrecursive` can be set to `false` to have the old
behavior.
### Breaking channge
This is a breaking change: Previously, `rw [Option.map]` would rewrite
`Option.map f o` to `match o with … `. Now this rewrite will fail
because the equational lemmas require constructors here (like they do
for, say, `List.map`).
Remedies:
* Split on `o` before rewriting.
* Use `rw [Option.map.eq_def]`, which rewrites any (saturated)
application of `Option.map`
* Use `set_option eqns.nonrecursive false` when *defining* the function
in question.
### Interaction with simp
The `simp` tactic so far had a special provision for non-recursive
functions so that `simp [f]` will try to use the equational lemmas, but
will also unfold `f` else, so less breakage here (but maybe performance
improvements with functions with many cases when applied to a
constructor, as the simplifier will no longer unfold to a large
`match`-statement and then collapse it right away).
For projection functions and functions marked `[reducible]`, `simp [f]`
won’t use the equational theorems, and will only use its internal
unfolding machinery.
### Implementation notes
It uses the same `mkEqnTypes` function as for recursive functions, so we
are close to a consistency here. There is still the wrinkle that for
recursive functions we don't split matches without an interesting
recursive call inside. Unifying that is future work.
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