Batteries.Data.Nat.Basic

source

def Nat.recAuxOn {motive : Nat → Sort u_1} (t : Nat) (zero : motive 0) (succ : (n : Nat) → motive n → motive (n + 1)) :

motive t

Recursor identical to Nat.recOn but uses notations 0 for Nat.zero and ·+1 for Nat.succ

Equations

Nat.recAuxOn t zero succ = Nat.recAux zero succ t

Instances For

source

def Nat.strongRec {motive : Nat → Sort u_1} (ind : (n : Nat) → ((m : Nat) → m < n → motive m) → motive n) (t : Nat) :

motive t

Strong recursor for Nat

Equations

Nat.strongRec ind t = ind t fun (m : Nat) (x : m < t) => Nat.strongRec ind m

Instances For

source

def Nat.strongRecOn (t : Nat) {motive : Nat → Sort u_1} (ind : (n : Nat) → ((m : Nat) → m < n → motive m) → motive n) :

motive t

Strong recursor for Nat

Equations

t.strongRecOn ind = Nat.strongRec ind t

Instances For

source

def Nat.recDiagAux {motive : Nat → Nat → Sort u_1} (zero_left : (n : Nat) → motive 0 n) (zero_right : (m : Nat) → motive m 0) (succ_succ : (m n : Nat) → motive m n → motive (m + 1) (n + 1)) (m : Nat) (n : Nat) :

motive m n

Simple diagonal recursor for Nat

Equations

Nat.recDiagAux zero_left zero_right succ_succ 0 x = zero_left x
Nat.recDiagAux zero_left zero_right succ_succ x 0 = zero_right x
Nat.recDiagAux zero_left zero_right succ_succ n.succ n_1.succ = succ_succ n n_1 (Nat.recDiagAux zero_left zero_right succ_succ n n_1)

Instances For

source

def Nat.recDiag {motive : Nat → Nat → Sort u_1} (zero_zero : motive 0 0) (zero_succ : (n : Nat) → motive 0 n → motive 0 (n + 1)) (succ_zero : (m : Nat) → motive m 0 → motive (m + 1) 0) (succ_succ : (m n : Nat) → motive m n → motive (m + 1) (n + 1)) (m : Nat) (n : Nat) :

motive m n

Diagonal recursor for Nat

Equations

Nat.recDiag zero_zero zero_succ succ_zero succ_succ m n = Nat.recDiagAux (Nat.recDiag.left zero_zero zero_succ) (Nat.recDiag.right zero_zero succ_zero) succ_succ m n

Instances For

source

def Nat.recDiag.left {motive : Nat → Nat → Sort u_1} (zero_zero : motive 0 0) (zero_succ : (n : Nat) → motive 0 n → motive 0 (n + 1)) (n : Nat) :

motive 0 n

Left leg for Nat.recDiag

Equations

Nat.recDiag.left zero_zero zero_succ 0 = zero_zero
Nat.recDiag.left zero_zero zero_succ n.succ = zero_succ n (Nat.recDiag.left zero_zero zero_succ n)

Instances For

source

def Nat.recDiag.right {motive : Nat → Nat → Sort u_1} (zero_zero : motive 0 0) (succ_zero : (m : Nat) → motive m 0 → motive (m + 1) 0) (m : Nat) :

motive m 0

Right leg for Nat.recDiag

Equations

Nat.recDiag.right zero_zero succ_zero 0 = zero_zero
Nat.recDiag.right zero_zero succ_zero n.succ = succ_zero n (Nat.recDiag.right zero_zero succ_zero n)

Instances For

source

def Nat.recDiagOn {motive : Nat → Nat → Sort u_1} (m : Nat) (n : Nat) (zero_zero : motive 0 0) (zero_succ : (n : Nat) → motive 0 n → motive 0 (n + 1)) (succ_zero : (m : Nat) → motive m 0 → motive (m + 1) 0) (succ_succ : (m n : Nat) → motive m n → motive (m + 1) (n + 1)) :

motive m n

Diagonal recursor for Nat

Equations

Nat.recDiagOn m n zero_zero zero_succ succ_zero succ_succ = Nat.recDiag zero_zero zero_succ succ_zero succ_succ m n

Instances For

source

def Nat.casesDiagOn {motive : Nat → Nat → Sort u_1} (m : Nat) (n : Nat) (zero_zero : motive 0 0) (zero_succ : (n : Nat) → motive 0 (n + 1)) (succ_zero : (m : Nat) → motive (m + 1) 0) (succ_succ : (m n : Nat) → motive (m + 1) (n + 1)) :

motive m n

Diagonal recursor for Nat

Equations