Loogle!

Result

Found 729 declarations mentioning PNat. Of these, 6 have a name containing "rec".

• PNat.recOn 📋 Mathlib.Data.PNat.Basic
  (n : ℕ+) {p : ℕ+ → Sort u_1} (one : p 1) (succ : (n : ℕ+) → p n → p (n + 1)) : p n
• PNat.recOn_one 📋 Mathlib.Data.PNat.Basic
  {p : ℕ+ → Sort u_1} (one : p 1) (succ : (n : ℕ+) → p n → p (n + 1)) : PNat.recOn 1 one succ = one
• PNat.recOn_succ 📋 Mathlib.Data.PNat.Basic
  (n : ℕ+) {p : ℕ+ → Sort u_1} (one : p 1) (succ : (n : ℕ+) → p n → p (n + 1)) : (n + 1).recOn one succ = succ n (n.recOn one succ)
• Function.directed_ptsOfPeriod_pNat 📋 Mathlib.Dynamics.PeriodicPts.Lemmas
  {α : Type u_1} (f : α → α) : Directed (fun x1 x2 => x1 ⊆ x2) fun n => Function.ptsOfPeriod f ↑n
• Function.directed_ptsOfPeriod_pnat 📋 Mathlib.Dynamics.PeriodicPts.Lemmas
  {α : Type u_1} (f : α → α) : Directed (fun x1 x2 => x1 ⊆ x2) fun n => Function.ptsOfPeriod f ↑n
• NONote.recOn 📋 Mathlib.SetTheory.Ordinal.Notation
  {C : NONote → Sort u_1} (o : NONote) (H0 : C 0) (H1 : (e : NONote) → (n : ℕ+) → (a : NONote) → (h : a.below e) → C e → C a → C (e.oadd n a h)) : C o

About

Loogle searches Lean and Mathlib definitions and theorems.

You can use Loogle from within the Lean4 VSCode language extension using (by default) Ctrl-K Ctrl-S. You can also try the #loogle command from LeanSearchClient, the CLI version, the Loogle VS Code extension, the lean.nvim integration or the Zulip bot.

Usage

Loogle finds definitions and lemmas in various ways:

1. By constant:
   🔍 Real.sin
   finds all lemmas whose statement somehow mentions the sine function.

2. By lemma name substring:
   🔍 "differ"
   finds all lemmas that have "differ" somewhere in their lemma name.

3. By subexpression:
   🔍 _ * (_ ^ _)
   finds all lemmas whose statements somewhere include a product where the second argument is raised to some power.

   The pattern can also be non-linear, as in
   🔍 Real.sqrt ?a * Real.sqrt ?a

   If the pattern has parameters, they are matched in any order. Both of these will find List.map:
   🔍 (?a -> ?b) -> List ?a -> List ?b
   🔍 List ?a -> (?a -> ?b) -> List ?b

4. By main conclusion:
   🔍 |- tsum _ = _ * tsum _
   finds all lemmas where the conclusion (the subexpression to the right of all → and ∀) has the given shape.

   As before, if the pattern has parameters, they are matched against the hypotheses of the lemma in any order; for example,
   🔍 |- _ < _ → tsum _ < tsum _
   will find tsum_lt_tsum even though the hypothesis f i < g i is not the last.

If you pass more than one such search filter, separated by commas Loogle will return lemmas which match all of them. The search
🔍 Real.sin, "two", tsum, _ * _, _ ^ _, |- _ < _ → _
would find all lemmas which mention the constants Real.sin and tsum, have "two" as a substring of the lemma name, include a product and a power somewhere in the type, and have a hypothesis of the form _ < _ (if there were any such lemmas). Metavariables (?a) are assigned independently in each filter.

The #lucky button will directly send you to the documentation of the first hit.

Source code

You can find the source code for this service at https://github.com/nomeata/loogle. The https://loogle.lean-lang.org/ service is provided by the Lean FRO.

This is Loogle revision 19971e9 serving mathlib revision 4cb993b