mathlib documentation

tactic.interactive

Similar to constructor, but does not reorder goals.

Similar to constructor, but does not reorder goals.

try_for n { tac } executes tac for n ticks, otherwise uses sorry to close the goal. Never fails. Useful for debugging.

Multiple subst. substs x y z is the same as subst x, subst y, subst z.

Multiple subst. substs x y z is the same as subst x, subst y, subst z.

Unfold coercion-related definitions

Unfold coercion-related definitions

Unfold has_well_founded.r, sizeof and other such definitions.

Unfold auxiliary definitions associated with the current declaration.

For debugging only. This tactic checks the current state for any missing dropped goals and restores them. Useful when there are no goals to solve but "result contains meta-variables".

Like try { tac }, but in the case of failure it continues from the failure state instead of reverting to the original state.

@[protected]

id { tac } is the same as tac, but it is useful for creating a block scope without requiring the goal to be solved at the end like { tac }. It can also be used to enclose a non-interactive tactic for patterns like tac1; id {tac2} where tac2 is non-interactive.

work_on_goal n { tac } creates a block scope for the n-goal, and does not require that the goal be solved at the end (any remaining subgoals are inserted back into the list of goals).

Typically usage might look like:

intros,
simp,
apply lemma_1,
work_on_goal 3
{ dsimp,
  simp },
refl

See also id { tac }, which is equivalent to work_on_goal 1 { tac }.

meta def tactic.interactive.swap (n : := 2) :

swap n will move the nth goal to the front. swap defaults to swap 2, and so interchanges the first and second goals.

See also tactic.interactive.rotate, which moves the first n goals to the back.

swap n will move the nth goal to the front. swap defaults to swap 2, and so interchanges the first and second goals.

See also tactic.interactive.rotate, which moves the first n goals to the back.

rotate moves the first goal to the back. rotate n will do this n times.

See also tactic.interactive.swap, which moves the nth goal to the front.

rotate moves the first goal to the back. rotate n will do this n times.

See also tactic.interactive.swap, which moves the nth goal to the front.

Clear all hypotheses starting with _, like _match and _let_match.

Clear all hypotheses starting with _, like _match and _let_match.

Acts like have, but removes a hypothesis with the same name as this one. For example if the state is h : p ⊢ goal and f : p → q, then after replace h := f h the goal will be h : q ⊢ goal, where have h := f h would result in the state h : p, h : q ⊢ goal. This can be used to simulate the specialize and apply at tactics of Coq.

Acts like have, but removes a hypothesis with the same name as this one. For example if the state is h : p ⊢ goal and f : p → q, then after replace h := f h the goal will be h : q ⊢ goal, where have h := f h would result in the state h : p, h : q ⊢ goal. This can be used to simulate the specialize and apply at tactics of Coq.

Make every proposition in the context decidable.

classical! does this more aggressively, such that even if a decidable instance is already available for a specific proposition, the noncomputable one will be used instead.

Make every proposition in the context decidable.

classical! does this more aggressively, such that even if a decidable instance is already available for a specific proposition, the noncomputable one will be used instead.

@[nolint]
noncomputable theorem tactic.interactive.generalize_a_aux {α : Sort u} (h : Π (x : Sort u), (α → x) → x) :
α

Like generalize but also considers assumptions specified by the user. The user can also specify to omit the goal.

Like generalize but also considers assumptions specified by the user. The user can also specify to omit the goal.

go from (x₀ : t₀) (x₁ : t₀) (x₂ : t₀) to (x₀ x₁ x₂ : t₀)

Remove identity functions from a term. These are normally automatically generated with terms like show t, from p or (p : t) which translate to some variant on @id t p in order to retain the type.

refine_struct { .. } acts like refine but works only with structure instance literals. It creates a goal for each missing field and tags it with the name of the field so that have_field can be used to generically refer to the field currently being refined.

As an example, we can use refine_struct to automate the construction of semigroup instances:

refine_struct ( { .. } : semigroup α ),
-- case semigroup, mul
-- α : Type u,
-- ⊢ α → α → α

-- case semigroup, mul_assoc
-- α : Type u,
-- ⊢ ∀ (a b c : α), a * b * c = a * (b * c)

have_field, used after refine_struct _, poses field as a local constant with the type of the field of the current goal:

refine_struct ({ .. } : semigroup α),
{ have_field, ... },
{ have_field, ... },

behaves like

refine_struct ({ .. } : semigroup α),
{ have field := @semigroup.mul, ... },
{ have field := @semigroup.mul_assoc, ... },

guard_hyp' h : t fails if the hypothesis h does not have type t. We use this tactic for writing tests. Fixes guard_hyp by instantiating meta variables

match_hyp h : t fails if the hypothesis h does not match the type t (which may be a pattern). We use this tactic for writing tests.

guard_expr_strict t := e fails if the expr t is not equal to e. By contrast to guard_expr, this tests strict (syntactic) equality. We use this tactic for writing tests.

guard_target_strict t fails if the target of the main goal is not syntactically t. We use this tactic for writing tests.

guard_hyp_strict h : t fails if the hypothesis h does not have type syntactically equal to t. We use this tactic for writing tests.

Tests that there are n hypotheses in the current context.

guard_hyp_mod_implicit h : t fails if the type of the hypothesis h is not definitionally equal to t modulo none transparency (i.e., unifying the implicit arguments modulo semireducible transparency). We use this tactic for writing tests.

guard_target_mod_implicit t fails if the target of the main goal is not definitionally equal to t modulo none transparency (i.e., unifying the implicit arguments modulo semireducible transparency). We use this tactic for writing tests.

Test that t is the tag of the main goal.

guard_proof_term { t } e applies tactic t and tests whether the resulting proof term unifies with p.

success_if_fail_with_msg { tac } msg succeeds if the interactive tactic tac fails with error message msg (for test writing purposes).

Get the field of the current goal.

have_field, used after refine_struct _ poses field as a local constant with the type of the field of the current goal:

refine_struct ({ .. } : semigroup α),
{ have_field, ... },
{ have_field, ... },

behaves like

refine_struct ({ .. } : semigroup α),
{ have field := @semigroup.mul, ... },
{ have field := @semigroup.mul_assoc, ... },

apply_field functions as have_field, apply field, clear field

refine_struct { .. } acts like refine but works only with structure instance literals. It creates a goal for each missing field and tags it with the name of the field so that have_field can be used to generically refer to the field currently being refined.

As an example, we can use refine_struct to automate the construction of semigroup instances:

refine_struct ( { .. } : semigroup α ),
-- case semigroup, mul
-- α : Type u,
-- ⊢ α → α → α

-- case semigroup, mul_assoc
-- α : Type u,
-- ⊢ ∀ (a b c : α), a * b * c = a * (b * c)

have_field, used after refine_struct _, poses field as a local constant with the type of the field of the current goal:

refine_struct ({ .. } : semigroup α),
{ have_field, ... },
{ have_field, ... },

behaves like

refine_struct ({ .. } : semigroup α),
{ have field := @semigroup.mul, ... },
{ have field := @semigroup.mul_assoc, ... },

apply_rules hs with attrs n applies the list of lemmas hs and all lemmas tagged with an attribute from the list attrs, as well as the assumption tactic on the first goal and the resulting subgoals, iteratively, at most n times. n is optional, equal to 50 by default. You can pass an apply_cfg option argument as apply_rules hs n opt. (A typical usage would be with apply_rules hs n { md := reducible }), which asks apply_rules to not unfold semireducible definitions (i.e. most) when checking if a lemma matches the goal.)

For instance:

@[user_attribute]
meta def mono_rules : user_attribute :=
{ name := `mono_rules,
  descr := "lemmas usable to prove monotonicity" }

attribute [mono_rules] add_le_add mul_le_mul_of_nonneg_right

lemma my_test {a b c d e : real} (h1 : a  b) (h2 : c  d) (h3 : 0  e) :
a + c * e + a + c + 0  b + d * e + b + d + e :=
-- any of the following lines solve the goal:
add_le_add (add_le_add (add_le_add (add_le_add h1 (mul_le_mul_of_nonneg_right h2 h3)) h1 ) h2) h3
by apply_rules [add_le_add, mul_le_mul_of_nonneg_right]
by apply_rules with mono_rules
by apply_rules [add_le_add] with mono_rules
```

apply_rules hs with attrs n applies the list of lemmas hs and all lemmas tagged with an attribute from the list attrs, as well as the assumption tactic on the first goal and the resulting subgoals, iteratively, at most n times. n is optional, equal to 50 by default. You can pass an apply_cfg option argument as apply_rules hs n opt. (A typical usage would be with apply_rules hs n { md := reducible }), which asks apply_rules to not unfold semireducible definitions (i.e. most) when checking if a lemma matches the goal.)

For instance:

@[user_attribute]
meta def mono_rules : user_attribute :=
{ name := `mono_rules,
  descr := "lemmas usable to prove monotonicity" }

attribute [mono_rules] add_le_add mul_le_mul_of_nonneg_right

lemma my_test {a b c d e : real} (h1 : a  b) (h2 : c  d) (h3 : 0  e) :
a + c * e + a + c + 0  b + d * e + b + d + e :=
-- any of the following lines solve the goal:
add_le_add (add_le_add (add_le_add (add_le_add h1 (mul_le_mul_of_nonneg_right h2 h3)) h1 ) h2) h3
by apply_rules [add_le_add, mul_le_mul_of_nonneg_right]
by apply_rules with mono_rules
by apply_rules [add_le_add] with mono_rules
```

h_generalize Hx : e == x matches on cast _ e in the goal and replaces it with x. It also adds Hx : e == x as an assumption. If cast _ e appears multiple times (not necessarily with the same proof), they are all replaced by x. cast eq.mp, eq.mpr, eq.subst, eq.substr, eq.rec and eq.rec_on are all treated as casts.

  • h_generalize Hx : e == x with h adds hypothesis α = β with e : α, x : β;
  • h_generalize Hx : e == x with _ chooses automatically chooses the name of assumption α = β;
  • h_generalize! Hx : e == x reverts Hx;
  • when Hx is omitted, assumption Hx : e == x is not added.

h_generalize Hx : e == x matches on cast _ e in the goal and replaces it with x. It also adds Hx : e == x as an assumption. If cast _ e appears multiple times (not necessarily with the same proof), they are all replaced by x. cast eq.mp, eq.mpr, eq.subst, eq.substr, eq.rec and eq.rec_on are all treated as casts.

  • h_generalize Hx : e == x with h adds hypothesis α = β with e : α, x : β;
  • h_generalize Hx : e == x with _ chooses automatically chooses the name of assumption α = β;
  • h_generalize! Hx : e == x reverts Hx;
  • when Hx is omitted, assumption Hx : e == x is not added.

Tests whether t is definitionally equal to p. The difference with guard_expr_eq is that this uses definitional equality instead of alpha-equivalence.

guard_target' t fails if the target of the main goal is not definitionally equal to t. We use this tactic for writing tests. The difference with guard_target is that this uses definitional equality instead of alpha-equivalence.

guard_target' t fails if the target of the main goal is not definitionally equal to t. We use this tactic for writing tests. The difference with guard_target is that this uses definitional equality instead of alpha-equivalence.

Tries to solve the goal using a canonical proof of true or the reflexivity tactic. Unlike trivial or trivial', does not the contradiction tactic.

Tries to solve the goal using a canonical proof of true or the reflexivity tactic. Unlike trivial or trivial', does not the contradiction tactic.

A weaker version of trivial that tries to solve the goal using a canonical proof of true or the reflexivity tactic (unfolding only reducible constants, so can fail faster than trivial), and otherwise tries the contradiction tactic.

A weaker version of trivial that tries to solve the goal using a canonical proof of true or the reflexivity tactic (unfolding only reducible constants, so can fail faster than trivial), and otherwise tries the contradiction tactic.

Similar to existsi. use x will instantiate the first term of an or Σ goal with x. It will then try to close the new goal using trivial', or try to simplify it by applying exists_prop. Unlike existsi, x is elaborated with respect to the expected type. use will alternatively take a list of terms [x0, ..., xn].

use will work with constructors of arbitrary inductive types.

Examples:

example (α : Type) :  S : set α, S = S :=
by use 

example :  x : , x = x :=
by use 42

example :  n > 0, n = n :=
begin
  use 1,
  -- goal is now 1 > 0 ∧ 1 = 1, whereas it would be ∃ (H : 1 > 0), 1 = 1 after existsi 1.
  exact zero_lt_one, rfl⟩,
end

example :  a b c : , a + b + c = 6 :=
by use [1, 2, 3]

example :  p :  × , p.1 = 1 :=
by use 1, 42

example : Σ x y : , ( × ) ×  :=
by use [1, 2, 3, 4, 5]

inductive foo
| mk :   bool ×     foo

example : foo :=
by use [100, tt, 4, 3]
```

Similar to existsi. use x will instantiate the first term of an or Σ goal with x. It will then try to close the new goal using trivial', or try to simplify it by applying exists_prop. Unlike existsi, x is elaborated with respect to the expected type. use will alternatively take a list of terms [x0, ..., xn].

use will work with constructors of arbitrary inductive types.

Examples:

example (α : Type) :  S : set α, S = S :=
by use 

example :  x : , x = x :=
by use 42

example :  n > 0, n = n :=
begin
  use 1,
  -- goal is now 1 > 0 ∧ 1 = 1, whereas it would be ∃ (H : 1 > 0), 1 = 1 after existsi 1.
  exact zero_lt_one, rfl⟩,
end

example :  a b c : , a + b + c = 6 :=
by use [1, 2, 3]

example :  p :  × , p.1 = 1 :=
by use 1, 42

example : Σ x y : , ( × ) ×  :=
by use [1, 2, 3, 4, 5]

inductive foo
| mk :   bool ×     foo

example : foo :=
by use [100, tt, 4, 3]
```

clear_aux_decl clears every aux_decl in the local context for the current goal. This includes the induction hypothesis when using the equation compiler and _let_match and _fun_match.

It is useful when using a tactic such as finish, simp * or subst that may use these auxiliary declarations, and produce an error saying the recursion is not well founded.

example (n m : ) (h₁ : n = m) (h₂ :  a : , a = n  a = m) : 2 * m = 2 * n :=
let a, ha := h₂ in
begin
  clear_aux_decl, -- subst will fail without this line
  subst h₁
end

example (x y : ) (h₁ :  n : , n * 1 = 2) (h₂ : 1 + 1 = 2  x * 1 = y) : x = y :=
let n, hn := h₁ in
begin
  clear_aux_decl, -- finish produces an error without this line
  finish
end
```

clear_aux_decl clears every aux_decl in the local context for the current goal. This includes the induction hypothesis when using the equation compiler and _let_match and _fun_match.

It is useful when using a tactic such as finish, simp * or subst that may use these auxiliary declarations, and produce an error saying the recursion is not well founded.

example (n m : ) (h₁ : n = m) (h₂ :  a : , a = n  a = m) : 2 * m = 2 * n :=
let a, ha := h₂ in
begin
  clear_aux_decl, -- subst will fail without this line
  subst h₁
end

example (x y : ) (h₁ :  n : , n * 1 = 2) (h₂ : 1 + 1 = 2  x * 1 = y) : x = y :=
let n, hn := h₁ in
begin
  clear_aux_decl, -- finish produces an error without this line
  finish
end
```

The logic of change x with y at l fails when there are dependencies. change' mimics the behavior of change, except in the case of change x with y at l. In this case, it will correctly replace occurences of x with y at all possible hypotheses in l. As long as x and y are defeq, it should never fail.

The logic of change x with y at l fails when there are dependencies. change' mimics the behavior of change, except in the case of change x with y at l. In this case, it will correctly replace occurences of x with y at all possible hypotheses in l. As long as x and y are defeq, it should never fail.

set a := t with h is a variant of let a := t. It adds the hypothesis h : a = t to the local context and replaces t with a everywhere it can.

set a := t with ←h will add h : t = a instead.

set! a := t with h does not do any replacing.

example (x : ) (h : x = 3)  : x + x + x = 9 :=
begin
  set y := x with h_xy,
/-
x : ℕ,
y : ℕ := x,
h_xy : x = y,
h : y = 3
⊢ y + y + y = 9
-/
end

set a := t with h is a variant of let a := t. It adds the hypothesis h : a = t to the local context and replaces t with a everywhere it can.

set a := t with ←h will add h : t = a instead.

set! a := t with h does not do any replacing.

example (x : ) (h : x = 3)  : x + x + x = 9 :=
begin
  set y := x with h_xy,
/-
x : ℕ,
y : ℕ := x,
h_xy : x = y,
h : y = 3
⊢ y + y + y = 9
-/
end

clear_except h₀ h₁ deletes all the assumptions it can except for h₀ and h₁.

clear_except h₀ h₁ deletes all the assumptions it can except for h₀ and h₁.

Format the current goal as a stand-alone example. Useful for testing tactics or creating minimal working examples.

  • extract_goal: formats the statement as an example declaration
  • extract_goal my_decl: formats the statement as a lemma or def declaration called my_decl
  • extract_goal with i j k: only use local constants i, j, k in the declaration

Examples:

example (i j k : ) (h₀ : i  j) (h₁ : j  k) : i  k :=
begin
  extract_goal,
     -- prints:
     -- example (i j k : ℕ) (h₀ : i ≤ j) (h₁ : j ≤ k) : i ≤ k :=
     -- begin
     --   admit,
     -- end
  extract_goal my_lemma
     -- prints:
     -- lemma my_lemma (i j k : ℕ) (h₀ : i ≤ j) (h₁ : j ≤ k) : i ≤ k :=
     -- begin
     --   admit,
     -- end
end

example {i j k x y z w p q r m n : } (h₀ : i  j) (h₁ : j  k) (h₁ : k  p) (h₁ : p  q) : i  k :=
begin
  extract_goal my_lemma,
    -- prints:
    -- lemma my_lemma {i j k x y z w p q r m n : ℕ}
    --   (h₀ : i ≤ j)
    --   (h₁ : j ≤ k)
    --   (h₁ : k ≤ p)
    --   (h₁ : p ≤ q) :
    --   i ≤ k :=
    -- begin
    --   admit,
    -- end

  extract_goal my_lemma with i j k
    -- prints:
    -- lemma my_lemma {p i j k : ℕ}
    --   (h₀ : i ≤ j)
    --   (h₁ : j ≤ k)
    --   (h₁ : k ≤ p) :
    --   i ≤ k :=
    -- begin
    --   admit,
    -- end
end

example : true :=
begin
  let n := 0,
  have m : , admit,
  have k : fin n, admit,
  have : n + m + k.1 = 0, extract_goal,
    -- prints:
    -- example (m : ℕ)  : let n : ℕ := 0 in ∀ (k : fin n), n + m + k.val = 0 :=
    -- begin
    --   intros n k,
    --   admit,
    -- end
end
```

Format the current goal as a stand-alone example. Useful for testing tactics or creating minimal working examples.

  • extract_goal: formats the statement as an example declaration
  • extract_goal my_decl: formats the statement as a lemma or def declaration called my_decl
  • extract_goal with i j k: only use local constants i, j, k in the declaration

Examples:

example (i j k : ) (h₀ : i  j) (h₁ : j  k) : i  k :=
begin
  extract_goal,
     -- prints:
     -- example (i j k : ℕ) (h₀ : i ≤ j) (h₁ : j ≤ k) : i ≤ k :=
     -- begin
     --   admit,
     -- end
  extract_goal my_lemma
     -- prints:
     -- lemma my_lemma (i j k : ℕ) (h₀ : i ≤ j) (h₁ : j ≤ k) : i ≤ k :=
     -- begin
     --   admit,
     -- end
end

example {i j k x y z w p q r m n : } (h₀ : i  j) (h₁ : j  k) (h₁ : k  p) (h₁ : p  q) : i  k :=
begin
  extract_goal my_lemma,
    -- prints:
    -- lemma my_lemma {i j k x y z w p q r m n : ℕ}
    --   (h₀ : i ≤ j)
    --   (h₁ : j ≤ k)
    --   (h₁ : k ≤ p)
    --   (h₁ : p ≤ q) :
    --   i ≤ k :=
    -- begin
    --   admit,
    -- end

  extract_goal my_lemma with i j k
    -- prints:
    -- lemma my_lemma {p i j k : ℕ}
    --   (h₀ : i ≤ j)
    --   (h₁ : j ≤ k)
    --   (h₁ : k ≤ p) :
    --   i ≤ k :=
    -- begin
    --   admit,
    -- end
end

example : true :=
begin
  let n := 0,
  have m : , admit,
  have k : fin n, admit,
  have : n + m + k.1 = 0, extract_goal,
    -- prints:
    -- example (m : ℕ)  : let n : ℕ := 0 in ∀ (k : fin n), n + m + k.val = 0 :=
    -- begin
    --   intros n k,
    --   admit,
    -- end
end
```

inhabit α tries to derive a nonempty α instance and then upgrades this to an inhabited α instance. If the target is a Prop, this is done constructively; otherwise, it uses classical.choice.

example (α) [nonempty α] :  a : α, true :=
begin
  inhabit α,
  existsi default,
  trivial
end

inhabit α tries to derive a nonempty α instance and then upgrades this to an inhabited α instance. If the target is a Prop, this is done constructively; otherwise, it uses classical.choice.

example (α) [nonempty α] :  a : α, true :=
begin
  inhabit α,
  existsi default,
  trivial
end

revert_deps n₁ n₂ ... reverts all the hypotheses that depend on one of n₁, n₂, ... It does not revert n₁, n₂, ... themselves (unless they depend on another nᵢ).

revert_deps n₁ n₂ ... reverts all the hypotheses that depend on one of n₁, n₂, ... It does not revert n₁, n₂, ... themselves (unless they depend on another nᵢ).

revert_after n reverts all the hypotheses after n.

revert_after n reverts all the hypotheses after n.

Reverts all local constants on which the target depends (recursively).

Reverts all local constants on which the target depends (recursively).

clear_value n₁ n₂ ... clears the bodies of the local definitions n₁, n₂ ..., changing them into regular hypotheses. A hypothesis n : α := t is changed to n : α.

clear_value n₁ n₂ ... clears the bodies of the local definitions n₁, n₂ ..., changing them into regular hypotheses. A hypothesis n : α := t is changed to n : α.

generalize' : e = x replaces all occurrences of e in the target with a new hypothesis x of the same type.

generalize' h : e = x in addition registers the hypothesis h : e = x.

generalize' is similar to generalize. The difference is that generalize' : e = x also succeeds when e does not occur in the goal. It is similar to set, but the resulting hypothesis x is not a local definition.

generalize' : e = x replaces all occurrences of e in the target with a new hypothesis x of the same type.

generalize' h : e = x in addition registers the hypothesis h : e = x.

generalize' is similar to generalize. The difference is that generalize' : e = x also succeeds when e does not occur in the goal. It is similar to set, but the resulting hypothesis x is not a local definition.

If the expression q is a local variable with type x = t or t = x, where x is a local constant, tactic.interactive.subst' q substitutes x by t everywhere in the main goal and then clears q. If q is another local variable, then we find a local constant with type q = t or t = q and substitute t for q.

Like tactic.interactive.subst, but fails with a nicer error message if the substituted variable is a local definition. It is trickier to fix this in core, since tactic.is_local_def is in mathlib.

If the expression q is a local variable with type x = t or t = x, where x is a local constant, tactic.interactive.subst' q substitutes x by t everywhere in the main goal and then clears q. If q is another local variable, then we find a local constant with type q = t or t = q and substitute t for q.

Like tactic.interactive.subst, but fails with a nicer error message if the substituted variable is a local definition. It is trickier to fix this in core, since tactic.is_local_def is in mathlib.