Documentation

Mathlib.Tactic.NormNum.Result

The `Result` type for `norm_num` #

We set up predicates IsNat, IsInt, and IsRat, stating that an element of a ring is equal to the "normal form" of a natural number, integer, or rational number coerced into that ring.

We then define Result e, which contains a proof that a typed expression e : Q($α) is equal to the coercion of an explicit natural number, integer, or rational number, or is either true or false.

def Mathlib.Meta.NormNum.instAddMonoidWithOneNat :

AddMonoidWithOne ℕ

A shortcut (non)instance for AddMonoidWithOne ℕ to shrink generated proofs.

Equations

Mathlib.Meta.NormNum.instAddMonoidWithOneNat = inferInstance

Instances For

def Mathlib.Meta.NormNum.instAddMonoidWithOne {α : Type u_1} [Ring α] :

AddMonoidWithOne α

A shortcut (non)instance for AddMonoidWithOne α from Ring α to shrink generated proofs.

Equations

Mathlib.Meta.NormNum.instAddMonoidWithOne = inferInstance

Instances For

def Mathlib.Meta.NormNum.inferAddMonoidWithOne {u : Lean.Level} (α : Q(Type u)) :

Lean.MetaM Q(AddMonoidWithOne «$α»)

Helper function to synthesize a typed AddMonoidWithOne α expression.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.inferSemiring {u : Lean.Level} (α : Q(Type u)) :

Lean.MetaM Q(Semiring «$α»)

Helper function to synthesize a typed Semiring α expression.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.inferRing {u : Lean.Level} (α : Q(Type u)) :

Lean.MetaM Q(Ring «$α»)

Helper function to synthesize a typed Ring α expression.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.mkRawIntLit (n : ℤ) :

Q(ℤ)

Represent an integer as a "raw" typed expression.

This uses .lit (.natVal n) internally to represent a natural number, rather than the preferred OfNat.ofNat form. We use this internally to avoid unnecessary typeclass searches.

This function is the inverse of Expr.intLit!.

Instances For

def Mathlib.Meta.NormNum.mkRawRatLit (q : ℚ) :

Q(ℚ)

Represent an integer as a "raw" typed expression.

This .lit (.natVal n) internally to represent a natural number, rather than the preferred OfNat.ofNat form. We use this internally to avoid unnecessary typeclass searches.

Instances For

def Mathlib.Meta.NormNum.rawIntLitNatAbs (n : Q(ℤ)) :

(m : Q(ℕ)) × Q(Int.natAbs «$n» = «$m»)

Extract the raw natlit representing the absolute value of a raw integer literal (of the type produced by Mathlib.Meta.NormNum.mkRawIntLit) along with an equality proof.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.mkOfNat {u : Lean.Level} (α : Q(Type u)) (_sα : Q(AddMonoidWithOne «$α»)) (lit : Q(ℕ)) :

Lean.MetaM ((a' : Q(«$α»)) × Q(↑«$lit» = «$a'»))

Constructs an ofNat application a' with the canonical instance, together with a proof that the instance is equal to the result of Nat.cast on the given AddMonoidWithOne instance.

This function is performance-critical, as many higher level tactics have to construct numerals. So rather than using typeclass search we hardcode the (relatively small) set of solutions to the typeclass problem.

Instances For

structure Mathlib.Meta.NormNum.IsNat {α : Type u_1} [AddMonoidWithOne α] (a : α) (n : ℕ) :

Assert that an element of a semiring is equal to the coercion of some natural number.

out : a = ↑n
The element is equal to the coercion of the natural number.

Instances For

theorem Mathlib.Meta.NormNum.IsNat.raw_refl (n : ℕ) :

Mathlib.Meta.NormNum.IsNat n n

def Nat.rawCast {α : Type u_1} [AddMonoidWithOne α] (n : ℕ) :

α

A "raw nat cast" is an expression of the form (Nat.rawCast lit : α) where lit is a raw natural number literal. These expressions are used by tactics like ring to decrease the number of typeclass arguments required in each use of a number literal at type α.

Equations

Nat.rawCast n = ↑n

Instances For

theorem Mathlib.Meta.NormNum.IsNat.to_eq {α : Type u_1} [AddMonoidWithOne α] {n : ℕ} {a : α} {a' : α} :

Mathlib.Meta.NormNum.IsNat a n → ↑n = a' → a = a'

theorem Mathlib.Meta.NormNum.IsNat.to_raw_eq {α : Type u_1} {a : α} {n : ℕ} [AddMonoidWithOne α] :

Mathlib.Meta.NormNum.IsNat a n → a = Nat.rawCast n

theorem Mathlib.Meta.NormNum.IsNat.of_raw (α : Type u_1) [AddMonoidWithOne α] (n : ℕ) :

Mathlib.Meta.NormNum.IsNat (Nat.rawCast n) n

theorem Mathlib.Meta.NormNum.isNat.natElim {p : ℕ → Prop} {n : ℕ} {n' : ℕ} :

Mathlib.Meta.NormNum.IsNat n n' → p n' → p n

structure Mathlib.Meta.NormNum.IsInt {α : Type u_1} [Ring α] (a : α) (n : ℤ) :

Assert that an element of a ring is equal to the coercion of some integer.

out : a = ↑n
The element is equal to the coercion of the integer.

Instances For

def Int.rawCast {α : Type u_1} [Ring α] (n : ℤ) :

α

A "raw int cast" is an expression of the form:

(Nat.rawCast lit : α) where lit is a raw natural number literal
(Int.rawCast (Int.negOfNat lit) : α) where lit is a nonzero raw natural number literal

(That is, we only actually use this function for negative integers.) This representation is used by tactics like ring to decrease the number of typeclass arguments required in each use of a number literal at type α.

Equations

Int.rawCast n = ↑n

Instances For

theorem Mathlib.Meta.NormNum.IsInt.to_isNat {α : Type u_1} [Ring α] {a : α} {n : ℕ} :

Mathlib.Meta.NormNum.IsInt a (Int.ofNat n) → Mathlib.Meta.NormNum.IsNat a n

theorem Mathlib.Meta.NormNum.IsNat.to_isInt {α : Type u_1} [Ring α] {a : α} {n : ℕ} :

Mathlib.Meta.NormNum.IsNat a n → Mathlib.Meta.NormNum.IsInt a (Int.ofNat n)

theorem Mathlib.Meta.NormNum.IsInt.to_raw_eq {α : Type u_1} {a : α} {n : ℤ} [Ring α] :

Mathlib.Meta.NormNum.IsInt a n → a = Int.rawCast n

theorem Mathlib.Meta.NormNum.IsInt.of_raw (α : Type u_1) [Ring α] (n : ℤ) :

Mathlib.Meta.NormNum.IsInt (Int.rawCast n) n

theorem Mathlib.Meta.NormNum.IsInt.neg_to_eq {α : Type u_1} [Ring α] {n : ℕ} {a : α} {a' : α} :

Mathlib.Meta.NormNum.IsInt a (Int.negOfNat n) → ↑n = a' → a = -a'

theorem Mathlib.Meta.NormNum.IsInt.nonneg_to_eq {α : Type u_1} [Ring α] {n : ℕ} {a : α} {a' : α} (h : Mathlib.Meta.NormNum.IsInt a (Int.ofNat n)) (e : ↑n = a') :

a = a'

inductive Mathlib.Meta.NormNum.IsRat {α : Type u_1} [Ring α] (a : α) (num : ℤ) (denom : ℕ) :

Assert that an element of a ring is equal to num / denom (and denom is invertible so that this makes sense). We will usually also have num and denom coprime, although this is not part of the definition.

mk: ∀ {α : Type u_1} [inst : Ring α] {a : α} {num : ℤ} {denom : ℕ} (inv : Invertible ↑denom), a = ↑num * ⅟↑denom → Mathlib.Meta.NormNum.IsRat a num denom

Instances For

def Rat.rawCast {α : Type u_1} [DivisionRing α] (n : ℤ) (d : ℕ) :

α

A "raw rat cast" is an expression of the form:

(Nat.rawCast lit : α) where lit is a raw natural number literal
(Int.rawCast (Int.negOfNat lit) : α) where lit is a nonzero raw natural number literal
(Rat.rawCast n d : α) where n is a raw int literal, d is a raw nat literal, and d is not 1 or 0.

(where a raw int literal is of the form Int.ofNat lit or Int.negOfNat nzlit where lit is a raw nat literal)

This representation is used by tactics like ring to decrease the number of typeclass arguments required in each use of a number literal at type α.

Equations

Rat.rawCast n d = ↑n / ↑d

Instances For

theorem Mathlib.Meta.NormNum.IsRat.to_isNat {α : Type u_1} [Ring α] {a : α} {n : ℕ} :

Mathlib.Meta.NormNum.IsRat a (Int.ofNat n) 1 → Mathlib.Meta.NormNum.IsNat a n

theorem Mathlib.Meta.NormNum.IsNat.to_isRat {α : Type u_1} [Ring α] {a : α} {n : ℕ} :

Mathlib.Meta.NormNum.IsNat a n → Mathlib.Meta.NormNum.IsRat a (Int.ofNat n) 1

theorem Mathlib.Meta.NormNum.IsRat.to_isInt {α : Type u_1} [Ring α] {a : α} {n : ℤ} :

Mathlib.Meta.NormNum.IsRat a n 1 → Mathlib.Meta.NormNum.IsInt a n

theorem Mathlib.Meta.NormNum.IsInt.to_isRat {α : Type u_1} [Ring α] {a : α} {n : ℤ} :

Mathlib.Meta.NormNum.IsInt a n → Mathlib.Meta.NormNum.IsRat a n 1

theorem Mathlib.Meta.NormNum.IsRat.to_raw_eq {α : Type u_1} {n : ℤ} {d : ℕ} [DivisionRing α] {a : α} :

Mathlib.Meta.NormNum.IsRat a n d → a = Rat.rawCast n d

theorem Mathlib.Meta.NormNum.IsRat.neg_to_eq {α : Type u_1} [DivisionRing α] {n : ℕ} {d : ℕ} {a : α} {n' : α} {d' : α} :

Mathlib.Meta.NormNum.IsRat a (Int.negOfNat n) d → ↑n = n' → ↑d = d' → a = -(n' / d')

theorem Mathlib.Meta.NormNum.IsRat.nonneg_to_eq {α : Type u_1} [DivisionRing α] {n : ℕ} {d : ℕ} {a : α} {n' : α} {d' : α} :

Mathlib.Meta.NormNum.IsRat a (Int.ofNat n) d → ↑n = n' → ↑d = d' → a = n' / d'

theorem Mathlib.Meta.NormNum.IsRat.of_raw (α : Type u_1) [DivisionRing α] (n : ℤ) (d : ℕ) (h : ↑d ≠ 0) :

Mathlib.Meta.NormNum.IsRat (Rat.rawCast n d) n d

theorem Mathlib.Meta.NormNum.IsRat.den_nz {α : Type u_1} [DivisionRing α] {a : α} {n : ℤ} {d : ℕ} :

Mathlib.Meta.NormNum.IsRat a n d → ↑d ≠ 0

inductive Mathlib.Meta.NormNum.Result' :

The result of norm_num running on an expression x of type α. Untyped version of Result.

isBool: Bool → Lean.Expr → Mathlib.Meta.NormNum.Result'
Untyped version of Result.isBool.
isNat: Lean.Expr → Lean.Expr → Lean.Expr → Mathlib.Meta.NormNum.Result'
Untyped version of Result.isNat.
isNegNat: Lean.Expr → Lean.Expr → Lean.Expr → Mathlib.Meta.NormNum.Result'
Untyped version of Result.isNegNat.
isRat: Lean.Expr → ℚ → Lean.Expr → Lean.Expr → Lean.Expr → Mathlib.Meta.NormNum.Result'
Untyped version of Result.isRat.

Instances For

instance Mathlib.Meta.NormNum.instInhabitedResult' :

Inhabited Mathlib.Meta.NormNum.Result'

Equations

Mathlib.Meta.NormNum.instInhabitedResult' = { default := Mathlib.Meta.NormNum.Result'.isBool default default }

def Mathlib.Meta.NormNum.Result {u : Lean.Level} {α : Q(Type u)} (x : Q(«$α»)) :

The result of norm_num running on an expression x of type α.

Equations

Mathlib.Meta.NormNum.Result x = Mathlib.Meta.NormNum.Result'

Instances For

instance Mathlib.Meta.NormNum.instInhabitedResult :

{a : Lean.Level} → {α : Q(Type a)} → {x : Q(«$α»)} → Inhabited (Mathlib.Meta.NormNum.Result x)

Equations

Mathlib.Meta.NormNum.instInhabitedResult = inferInstanceAs (Inhabited Mathlib.Meta.NormNum.Result')

@[match_pattern, inline]

def Mathlib.Meta.NormNum.Result.isTrue {x : Q(Prop)} (proof : Q(«$x»)) :

Mathlib.Meta.NormNum.Result x

The result is proof : x, where x is a (true) proposition.

Equations

Mathlib.Meta.NormNum.Result.isTrue = Mathlib.Meta.NormNum.Result'.isBool true

Instances For

@[match_pattern, inline]

def Mathlib.Meta.NormNum.Result.isFalse {x : Q(Prop)} (proof : Q(¬«$x»)) :

Mathlib.Meta.NormNum.Result x

The result is proof : ¬x, where x is a (false) proposition.

Equations

Mathlib.Meta.NormNum.Result.isFalse = Mathlib.Meta.NormNum.Result'.isBool false

Instances For

@[match_pattern, inline]

def Mathlib.Meta.NormNum.Result.isNat {u : Lean.Level} {α : Q(Type u)} {x : Q(«$α»)} (inst : autoParam Q(AddMonoidWithOne «$α») _auto✝) (lit : Q(ℕ)) (proof : Q(Mathlib.Meta.NormNum.IsNat «$x» «$lit»)) :

Mathlib.Meta.NormNum.Result x

The result is lit : ℕ (a raw nat literal) and proof : isNat x lit.

Equations

@Mathlib.Meta.NormNum.Result.isNat u α x = Mathlib.Meta.NormNum.Result'.isNat

Instances For

@[match_pattern, inline]

def Mathlib.Meta.NormNum.Result.isNegNat {u : Lean.Level} {α : Q(Type u)} {x : Q(«$α»)} (inst : autoParam Q(Ring «$α») _auto✝) (lit : Q(ℕ)) (proof : Q(Mathlib.Meta.NormNum.IsInt «$x» (Int.negOfNat «$lit»))) :

Mathlib.Meta.NormNum.Result x

The result is -lit where lit is a raw nat literal and proof : isInt x (.negOfNat lit).

Equations

@Mathlib.Meta.NormNum.Result.isNegNat u α x = Mathlib.Meta.NormNum.Result'.isNegNat

Instances For

@[match_pattern, inline]

def Mathlib.Meta.NormNum.Result.isRat {u : Lean.Level} {α : Q(Type u)} {x : Q(«$α»)} (inst : autoParam Q(DivisionRing «$α») _auto✝) (q : ℚ) (n : Q(ℤ)) (d : Q(ℕ)) (proof : Q(Mathlib.Meta.NormNum.IsRat «$x» «$n» «$d»)) :

Mathlib.Meta.NormNum.Result x

The result is proof : isRat x n d, where n is either .ofNat lit or .negOfNat lit with lit a raw nat literal and d is a raw nat literal (not 0 or 1), and q is the value of n / d.

Equations

@Mathlib.Meta.NormNum.Result.isRat u α x = Mathlib.Meta.NormNum.Result'.isRat

Instances For

def Mathlib.Meta.NormNum.Result.isInt {u : Lean.Level} {α : Q(Type u)} {x : Q(«$α»)} (inst : autoParam Q(Ring «$α») _auto✝) (z : Q(ℤ)) (n : ℤ) (proof : Q(Mathlib.Meta.NormNum.IsInt «$x» «$z»)) :

Mathlib.Meta.NormNum.Result x

The result is z : ℤ and proof : isNat x z.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.isRat' {u : Lean.Level} {α : Q(Type u)} {x : Q(«$α»)} (inst : autoParam Q(DivisionRing «$α») _auto✝) (q : ℚ) (n : Q(ℤ)) (d : Q(ℕ)) (proof : Q(Mathlib.Meta.NormNum.IsRat «$x» «$n» «$d»)) :

Mathlib.Meta.NormNum.Result x

The result depends on whether q : ℚ happens to be an integer, in which case the result is .isInt .. whereas otherwise it's .isRat ...

Equations

One or more equations did not get rendered due to their size.

Instances For

instance Mathlib.Meta.NormNum.instToMessageDataResult :

{a : Lean.Level} → {α : Q(Type a)} → {x : Q(«$α»)} → Lean.ToMessageData (Mathlib.Meta.NormNum.Result x)

Equations

One or more equations did not get rendered due to their size.

def Mathlib.Meta.NormNum.Result.toRat :

{a : Lean.Level} → {α : Q(Type a)} → {e : Q(«$α»)} → Mathlib.Meta.NormNum.Result e → Option ℚ

Returns the rational number that is the result of norm_num evaluation.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.toRatNZ :

{a : Lean.Level} → {α : Q(Type a)} → {e : Q(«$α»)} → Mathlib.Meta.NormNum.Result e → Option (ℚ × Option Lean.Expr)

Returns the rational number that is the result of norm_num evaluation, along with a proof that the denominator is nonzero in the isRat case.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.toInt {u : Lean.Level} {α : Q(Type u)} {e : Q(«$α»)} (_i : autoParam Q(Ring «$α») _auto✝) :

Mathlib.Meta.NormNum.Result e → Option (ℤ × (lit : Q(ℤ)) × Q(Mathlib.Meta.NormNum.IsInt «$e» «$lit»))

Extract from a Result the integer value (as both a term and an expression), and the proof that the original expression is equal to this integer.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.toRat' {u : Lean.Level} {α : Q(Type u)} {e : Q(«$α»)} (_i : autoParam Q(DivisionRing «$α») _auto✝) :

Mathlib.Meta.NormNum.Result e → Option (ℚ × (n : Q(ℤ)) × (d : Q(ℕ)) × Q(Mathlib.Meta.NormNum.IsRat «$e» «$n» «$d»))

Extract from a Result the rational value (as both a term and an expression), and the proof that the original expression is equal to this rational number.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.toRawEq {u : Lean.Level} {α : Q(Type u)} {e : Q(«$α»)} :

Mathlib.Meta.NormNum.Result e → (e' : Q(«$α»)) × Q(«$e» = «$e'»)

Given a NormNum.Result e (which uses IsNat, IsInt, IsRat to express equality to a rational numeral), converts it to an equality e = Nat.rawCast n, e = Int.rawCast n, or e = Rat.rawCast n d to a raw cast expression, so it can be used for rewriting.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.toRawIntEq {u : Lean.Level} {α : Q(Type u)} {e : Q(«$α»)} :

Mathlib.Meta.NormNum.Result e → Option (ℤ × (e' : Q(«$α»)) × Q(«$e» = «$e'»))

Result.toRawEq but providing an integer. Given a NormNum.Result e for something known to be an integer (which uses IsNat or IsInt to express equality to an integer numeral), converts it to an equality e = Nat.rawCast n or e = Int.rawCast n to a raw cast expression, so it can be used for rewriting. Gives none if not an integer.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.ofRawNat {u : Lean.Level} {α : Q(Type u)} (e : Q(«$α»)) :

Mathlib.Meta.NormNum.Result e

Constructs a Result out of a raw nat cast. Assumes e is a raw nat cast expression.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.ofRawInt {u : Lean.Level} {α : Q(Type u)} (n : ℤ) (e : Q(«$α»)) :

Mathlib.Meta.NormNum.Result e

Constructs a Result out of a raw int cast. Assumes e is a raw int cast expression denoting n.

Equations

One or more equations did not get rendered due to their size.

Instances For

def Mathlib.Meta.NormNum.Result.ofRawRat {u : Lean.Level} {α : Q(Type u)} (q : ℚ) (e : Q(«$α»)) (hyp : optParam (Option Lean.Expr) none) :

Mathlib.Meta.NormNum.Result e

Constructs a Result out of a raw rat cast. Assumes e is a raw rat cast expression denoting n.

Instances For

def Mathlib.Meta.NormNum.Result.toSimpResult {u : Lean.Level} {α : Q(Type u)} {e : Q(«$α»)} :

Mathlib.Meta.NormNum.Result e → Lean.MetaM Lean.Meta.Simp.Result

Convert a Result to a Simp.Result.

Equations

One or more equations did not get rendered due to their size.

Instances For

@[reducible]

def Mathlib.Meta.NormNum.BoolResult (p : Q(Prop)) (b : Bool) :

Given Mathlib.Meta.NormNum.Result.isBool p b, this is the type of p. Note that BoolResult p b is definitionally equal to Expr, and if you write match b with ..., then in the true branch BoolResult p true is reducibly equal to Q($p) and in the false branch it is reducibly equal to Q(¬ $p).

Equations

Mathlib.Meta.NormNum.BoolResult p b = Q(Bool.rec (¬«$p») «$p» «$b»)

Instances For

def Mathlib.Meta.NormNum.Result.ofBoolResult {p : Q(Prop)} {b : Bool} (prf : Mathlib.Meta.NormNum.BoolResult p b) :

Mathlib.Meta.NormNum.Result q(Prop)

Obtain a Result from a BoolResult.

Equations

Mathlib.Meta.NormNum.Result.ofBoolResult prf = Mathlib.Meta.NormNum.Result'.isBool b prf

Instances For

def Mathlib.Meta.NormNum.Result.eqTrans {u : Lean.Level} {α : Q(Type u)} {a : Q(«$α»)} {b : Q(«$α»)} (eq : Q(«$a» = «$b»)) :

Mathlib.Meta.NormNum.Result b → Mathlib.Meta.NormNum.Result a

If a = b and we can evaluate b, then we can evaluate a.

Equations

One or more equations did not get rendered due to their size.

Instances For