lean2/library/data/nat/order.lean

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--- Copyright (c) 2014 Floris van Doorn. All rights reserved.
--- Released under Apache 2.0 license as described in the file LICENSE.
--- Author: Floris van Doorn
-- data.nat.order
-- ==============
--
-- The ordering on the natural numbers
import .basic logic.classes.decidable
import tools.fake_simplifier
using nat eq_ops tactic
using fake_simplifier
using decidable (decidable inl inr)
namespace nat
-- Less than or equal
-- ------------------
definition le (n m : ) : Prop := exists k : nat, n + k = m
infix `<=` := le
infix `≤` := le
theorem le_intro {n m k : } (H : n + k = m) : n ≤ m :=
exists_intro k H
theorem le_elim {n m : } (H : n ≤ m) : ∃k, n + k = m :=
H
opaque_hint (hiding le)
-- ### partial order (totality is part of less than)
theorem le_refl (n : ) : n ≤ n :=
le_intro (add_zero_right n)
theorem zero_le (n : ) : 0 ≤ n :=
le_intro (add_zero_left n)
theorem le_zero {n : } (H : n ≤ 0) : n = 0 :=
obtain (k : ) (Hk : n + k = 0), from le_elim H,
add_eq_zero_left Hk
theorem not_succ_zero_le (n : ) : ¬ succ n ≤ 0 :=
not_intro
(assume H : succ n ≤ 0,
have H2 : succ n = 0, from le_zero H,
absurd H2 (succ_ne_zero n))
theorem le_trans {n m k : } (H1 : n ≤ m) (H2 : m ≤ k) : n ≤ k :=
obtain (l1 : ) (Hl1 : n + l1 = m), from le_elim H1,
obtain (l2 : ) (Hl2 : m + l2 = k), from le_elim H2,
le_intro
(calc
n + (l1 + l2) = n + l1 + l2 : symm (add_assoc n l1 l2)
... = m + l2 : {Hl1}
... = k : Hl2)
theorem le_antisym {n m : } (H1 : n ≤ m) (H2 : m ≤ n) : n = m :=
obtain (k : ) (Hk : n + k = m), from (le_elim H1),
obtain (l : ) (Hl : m + l = n), from (le_elim H2),
have L1 : k + l = 0, from
add_cancel_left
(calc
n + (k + l) = n + k + l : symm (add_assoc n k l)
... = m + l : {Hk}
... = n : Hl
... = n + 0 : symm (add_zero_right n)),
have L2 : k = 0, from add_eq_zero_left L1,
calc
n = n + 0 : symm (add_zero_right n)
... = n + k : {symm L2}
... = m : Hk
-- ### interaction with addition
theorem le_add_right (n m : ) : n ≤ n + m :=
le_intro (refl (n + m))
theorem le_add_left (n m : ) : n ≤ m + n :=
le_intro (add_comm n m)
theorem add_le_left {n m : } (H : n ≤ m) (k : ) : k + n ≤ k + m :=
obtain (l : ) (Hl : n + l = m), from (le_elim H),
le_intro
(calc
k + n + l = k + (n + l) : add_assoc k n l
... = k + m : {Hl})
theorem add_le_right {n m : } (H : n ≤ m) (k : ) : n + k ≤ m + k :=
add_comm k m ▸ add_comm k n ▸ add_le_left H k
theorem add_le {n m k l : } (H1 : n ≤ k) (H2 : m ≤ l) : n + m ≤ k + l :=
le_trans (add_le_right H1 m) (add_le_left H2 k)
theorem add_le_cancel_left {n m k : } (H : k + n ≤ k + m) : n ≤ m :=
obtain (l : ) (Hl : k + n + l = k + m), from (le_elim H),
le_intro (add_cancel_left
(calc
k + (n + l) = k + n + l : symm (add_assoc k n l)
... = k + m : Hl))
theorem add_le_cancel_right {n m k : } (H : n + k ≤ m + k) : n ≤ m :=
add_le_cancel_left (add_comm m k ▸ add_comm n k ▸ H)
theorem add_le_inv {n m k l : } (H1 : n + m ≤ k + l) (H2 : k ≤ n) : m ≤ l :=
obtain (a : ) (Ha : k + a = n), from le_elim H2,
have H3 : k + (a + m) ≤ k + l, from (add_assoc k a m) ▸ (symm Ha) ▸ H1,
have H4 : a + m ≤ l, from add_le_cancel_left H3,
show m ≤ l, from le_trans (le_add_left m a) H4
-- add_rewrite le_add_right le_add_left
-- ### interaction with successor and predecessor
theorem succ_le {n m : } (H : n ≤ m) : succ n ≤ succ m :=
add_one m ▸ add_one n ▸ add_le_right H 1
theorem succ_le_cancel {n m : } (H : succ n ≤ succ m) : n ≤ m :=
add_le_cancel_right (add_one m⁻¹ ▸ add_one n⁻¹ ▸ H)
theorem self_le_succ (n : ) : n ≤ succ n :=
le_intro (add_one n)
theorem le_imp_le_succ {n m : } (H : n ≤ m) : n ≤ succ m :=
le_trans H (self_le_succ m)
theorem le_imp_succ_le_or_eq {n m : } (H : n ≤ m) : succ n ≤ m n = m :=
obtain (k : ) (Hk : n + k = m), from (le_elim H),
discriminate
(assume H3 : k = 0,
have Heq : n = m,
from calc
n = n + 0 : symm (add_zero_right n)
... = n + k : {symm H3}
... = m : Hk,
or_intro_right _ Heq)
(take l : nat,
assume H3 : k = succ l,
have Hlt : succ n ≤ m, from
(le_intro
(calc
succ n + l = n + succ l : add_move_succ n l
... = n + k : {symm H3}
... = m : Hk)),
or_intro_left _ Hlt)
theorem le_ne_imp_succ_le {n m : } (H1 : n ≤ m) (H2 : n ≠ m) : succ n ≤ m :=
resolve_left (le_imp_succ_le_or_eq H1) H2
theorem le_succ_imp_le_or_eq {n m : } (H : n ≤ succ m) : n ≤ m n = succ m :=
or_imp_or_left (le_imp_succ_le_or_eq H)
(take H2 : succ n ≤ succ m, show n ≤ m, from succ_le_cancel H2)
theorem succ_le_imp_le_and_ne {n m : } (H : succ n ≤ m) : n ≤ m ∧ n ≠ m :=
obtain (k : ) (H2 : succ n + k = m), from (le_elim H),
and_intro
(have H3 : n + succ k = m,
from calc
n + succ k = succ n + k : symm (add_move_succ n k)
... = m : H2,
show n ≤ m, from le_intro H3)
(assume H3 : n = m,
have H4 : succ n ≤ n, from subst (symm H3) H,
have H5 : succ n = n, from le_antisym H4 (self_le_succ n),
show false, from absurd H5 (succ_ne_self n))
theorem le_pred_self (n : ) : pred n ≤ n :=
case n
(subst (symm pred_zero) (le_refl 0))
(take k : , subst (symm (pred_succ k)) (self_le_succ k))
theorem pred_le {n m : } (H : n ≤ m) : pred n ≤ pred m :=
discriminate
(take Hn : n = 0,
have H2 : pred n = 0,
from calc
pred n = pred 0 : {Hn}
... = 0 : pred_zero,
subst (symm H2) (zero_le (pred m)))
(take k : ,
assume Hn : n = succ k,
obtain (l : ) (Hl : n + l = m), from le_elim H,
have H2 : pred n + l = pred m,
from calc
pred n + l = pred (succ k) + l : {Hn}
... = k + l : {pred_succ k}
... = pred (succ (k + l)) : symm (pred_succ (k + l))
... = pred (succ k + l) : {symm (add_succ_left k l)}
... = pred (n + l) : {symm Hn}
... = pred m : {Hl},
le_intro H2)
theorem pred_le_imp_le_or_eq {n m : } (H : pred n ≤ m) : n ≤ m n = succ m :=
discriminate
(take Hn : n = 0,
or_inl (subst (symm Hn) (zero_le m)))
(take k : ,
assume Hn : n = succ k,
have H2 : pred n = k,
from calc
pred n = pred (succ k) : {Hn}
... = k : pred_succ k,
have H3 : k ≤ m, from subst H2 H,
have H4 : succ k ≤ m k = m, from le_imp_succ_le_or_eq H3,
show n ≤ m n = succ m, from
or_imp_or H4
(take H5 : succ k ≤ m, show n ≤ m, from subst (symm Hn) H5)
(take H5 : k = m, show n = succ m, from subst H5 Hn))
-- ### interaction with multiplication
theorem mul_le_left {n m : } (H : n ≤ m) (k : ) : k * n ≤ k * m :=
obtain (l : ) (Hl : n + l = m), from (le_elim H),
have H2 : k * n + k * l = k * m, from
calc
k * n + k * l = k * (n + l) : by simp
... = k * m : {Hl},
le_intro H2
theorem mul_le_right {n m : } (H : n ≤ m) (k : ) : n * k ≤ m * k :=
mul_comm k m ▸ mul_comm k n ▸ (mul_le_left H k)
theorem mul_le {n m k l : } (H1 : n ≤ k) (H2 : m ≤ l) : n * m ≤ k * l :=
le_trans (mul_le_right H1 m) (mul_le_left H2 k)
-- mul_le_[left|right]_inv below
theorem le_decidable [instance] (n m : ) : decidable (n ≤ m) :=
have general : ∀n, decidable (n ≤ m), from
rec_on m
(take n,
rec_on n
(inl (le_refl 0))
(take m iH, inr (not_succ_zero_le m)))
(take (m' : ) (iH1 : ∀n, decidable (n ≤ m')) (n : ),
rec_on n
(inl (zero_le (succ m')))
(take (n' : ) (iH2 : decidable (n' ≤ succ m')),
have d1 : decidable (n' ≤ m'), from iH1 n',
decidable.rec_on d1
(assume Hp : n' ≤ m', inl (succ_le Hp))
(assume Hn : ¬ n' ≤ m',
have H : ¬ succ n' ≤ succ m', from
assume Hle : succ n' ≤ succ m',
absurd (succ_le_cancel Hle) Hn,
inr H))),
general n
-- Less than, Greater than, Greater than or equal
-- ----------------------------------------------
-- ge and gt will be transparent, so we don't need to reprove theorems for le and lt for them
definition lt (n m : ) := succ n ≤ m
infix `<` := lt
abbreviation ge (n m : ) := m ≤ n
infix `>=` := ge
infix `≥` := ge
abbreviation gt (n m : ) := m < n
infix `>` := gt
theorem lt_def (n m : ) : (n < m) = (succ n ≤ m) := refl (n < m)
-- add_rewrite gt_def ge_def --it might be possible to remove this in Lean 0.2
theorem lt_intro {n m k : } (H : succ n + k = m) : n < m :=
le_intro H
theorem lt_elim {n m : } (H : n < m) : ∃ k, succ n + k = m :=
le_elim H
theorem lt_add_succ (n m : ) : n < n + succ m :=
lt_intro (add_move_succ n m)
-- ### basic facts
theorem lt_imp_ne {n m : } (H : n < m) : n ≠ m :=
and_elim_right (succ_le_imp_le_and_ne H)
theorem lt_irrefl (n : ) : ¬ n < n :=
not_intro (assume H : n < n, absurd (refl n) (lt_imp_ne H))
theorem succ_pos (n : ) : 0 < succ n :=
succ_le (zero_le n)
theorem not_lt_zero (n : ) : ¬ n < 0 :=
not_succ_zero_le n
theorem lt_imp_eq_succ {n m : } (H : n < m) : exists k, m = succ k :=
discriminate
(take (Hm : m = 0), absurd_elim _ (subst Hm H) (not_lt_zero n))
(take (l : ) (Hm : m = succ l), exists_intro l Hm)
-- ### interaction with le
theorem lt_imp_le_succ {n m : } (H : n < m) : succ n ≤ m :=
H
theorem le_succ_imp_lt {n m : } (H : succ n ≤ m) : n < m :=
H
theorem self_lt_succ (n : ) : n < succ n :=
le_refl (succ n)
theorem lt_imp_le {n m : } (H : n < m) : n ≤ m :=
and_elim_left (succ_le_imp_le_and_ne H)
theorem le_imp_lt_or_eq {n m : } (H : n ≤ m) : n < m n = m :=
le_imp_succ_le_or_eq H
theorem le_ne_imp_lt {n m : } (H1 : n ≤ m) (H2 : n ≠ m) : n < m :=
le_ne_imp_succ_le H1 H2
theorem le_imp_lt_succ {n m : } (H : n ≤ m) : n < succ m :=
succ_le H
theorem lt_succ_imp_le {n m : } (H : n < succ m) : n ≤ m :=
succ_le_cancel H
-- ### transitivity, antisymmmetry
theorem lt_le_trans {n m k : } (H1 : n < m) (H2 : m ≤ k) : n < k :=
le_trans H1 H2
theorem le_lt_trans {n m k : } (H1 : n ≤ m) (H2 : m < k) : n < k :=
le_trans (succ_le H1) H2
theorem lt_trans {n m k : } (H1 : n < m) (H2 : m < k) : n < k :=
lt_le_trans H1 (lt_imp_le H2)
theorem le_imp_not_gt {n m : } (H : n ≤ m) : ¬ n > m :=
not_intro (assume H2 : m < n, absurd (le_lt_trans H H2) (lt_irrefl n))
theorem lt_imp_not_ge {n m : } (H : n < m) : ¬ n ≥ m :=
not_intro (assume H2 : m ≤ n, absurd (lt_le_trans H H2) (lt_irrefl n))
theorem lt_antisym {n m : } (H : n < m) : ¬ m < n :=
le_imp_not_gt (lt_imp_le H)
-- ### interaction with addition
theorem add_lt_left {n m : } (H : n < m) (k : ) : k + n < k + m :=
add_succ_right k n ▸ add_le_left H k
theorem add_lt_right {n m : } (H : n < m) (k : ) : n + k < m + k :=
add_comm k m ▸ add_comm k n ▸ add_lt_left H k
theorem add_le_lt {n m k l : } (H1 : n ≤ k) (H2 : m < l) : n + m < k + l :=
le_lt_trans (add_le_right H1 m) (add_lt_left H2 k)
theorem add_lt_le {n m k l : } (H1 : n < k) (H2 : m ≤ l) : n + m < k + l :=
lt_le_trans (add_lt_right H1 m) (add_le_left H2 k)
theorem add_lt {n m k l : } (H1 : n < k) (H2 : m < l) : n + m < k + l :=
add_lt_le H1 (lt_imp_le H2)
theorem add_lt_cancel_left {n m k : } (H : k + n < k + m) : n < m :=
add_le_cancel_left (add_succ_right k n⁻¹ ▸ H)
theorem add_lt_cancel_right {n m k : } (H : n + k < m + k) : n < m :=
add_lt_cancel_left (add_comm m k ▸ add_comm n k ▸ H)
-- ### interaction with successor (see also the interaction with le)
theorem succ_lt {n m : } (H : n < m) : succ n < succ m :=
add_one m ▸ add_one n ▸ add_lt_right H 1
theorem succ_lt_cancel {n m : } (H : succ n < succ m) : n < m :=
add_lt_cancel_right (add_one m⁻¹ ▸ add_one n⁻¹ ▸ H)
theorem lt_imp_lt_succ {n m : } (H : n < m) : n < succ m
:= lt_trans H (self_lt_succ m)
-- ### totality of lt and le
theorem le_or_gt (n m : ) : n ≤ m n > m :=
induction_on n
(or_inl (zero_le m))
(take (k : ),
assume IH : k ≤ m m < k,
or_elim IH
(assume H : k ≤ m,
obtain (l : ) (Hl : k + l = m), from le_elim H,
discriminate
(assume H2 : l = 0,
have H3 : m = k,
from calc
m = k + l : symm Hl
... = k + 0 : {H2}
... = k : add_zero_right k,
have H4 : m < succ k, from subst H3 (self_lt_succ m),
or_inr H4)
(take l2 : ,
assume H2 : l = succ l2,
have H3 : succ k + l2 = m,
from calc
succ k + l2 = k + succ l2 : add_move_succ k l2
... = k + l : {symm H2}
... = m : Hl,
or_inl (le_intro H3)))
(assume H : m < k, or_inr (lt_imp_lt_succ H)))
theorem trichotomy_alt (n m : ) : (n < m n = m) n > m :=
or_imp_or_left (le_or_gt n m) (assume H : n ≤ m, le_imp_lt_or_eq H)
theorem trichotomy (n m : ) : n < m n = m n > m :=
iff_elim_left (or_assoc _ _ _) (trichotomy_alt n m)
theorem le_total (n m : ) : n ≤ m m ≤ n :=
or_imp_or_right (le_or_gt n m) (assume H : m < n, lt_imp_le H)
theorem not_lt_imp_ge {n m : } (H : ¬ n < m) : n ≥ m :=
resolve_left (le_or_gt m n) H
theorem not_le_imp_gt {n m : } (H : ¬ n ≤ m) : n > m :=
resolve_right (le_or_gt n m) H
-- The following three theorems are automatically proved using the instance le_decidable
theorem lt_decidable [instance] (n m : ) : decidable (n < m)
theorem gt_decidable [instance] (n m : ) : decidable (n > m)
theorem ge_decidable [instance] (n m : ) : decidable (n ≥ m)
-- Note: interaction with multiplication under "positivity"
-- ### misc
theorem strong_induction_on {P : nat → Prop} (n : ) (H : ∀n, (∀m, m < n → P m) → P n) : P n :=
have H1 : ∀n, ∀m, m < n → P m, from
take n,
induction_on n
(show ∀m, m < 0 → P m, from take m H, absurd_elim _ H (not_lt_zero _))
(take n',
assume IH : ∀m, m < n' → P m,
have H2: P n', from H n' IH,
show ∀m, m < succ n' → P m, from
take m,
assume H3 : m < succ n',
or_elim (le_imp_lt_or_eq (lt_succ_imp_le H3))
(assume H4: m < n', IH _ H4)
(assume H4: m = n', H4⁻¹ ▸ H2)),
H1 _ _ (self_lt_succ n)
theorem case_strong_induction_on {P : nat → Prop} (a : nat) (H0 : P 0)
(Hind : ∀(n : nat), (∀m, m ≤ n → P m) → P (succ n)) : P a :=
strong_induction_on a (
take n,
show (∀m, m < n → P m) → P n, from
case n
(assume H : (∀m, m < 0 → P m), show P 0, from H0)
(take n,
assume H : (∀m, m < succ n → P m),
show P (succ n), from
Hind n (take m, assume H1 : m ≤ n, H _ (le_imp_lt_succ H1))))
-- Positivity
-- ---------
--
-- Writing "t > 0" is the preferred way to assert that a natural number is positive.
-- ### basic
theorem case_zero_pos {P : → Prop} (y : ) (H0 : P 0) (H1 : ∀y, y > 0 → P y) : P y :=
case y H0 (take y', H1 _ (succ_pos _))
theorem zero_or_pos (n : ) : n = 0 n > 0 :=
or_imp_or_left (or_swap (le_imp_lt_or_eq (zero_le n))) (take H : 0 = n, symm H)
theorem succ_imp_pos {n m : } (H : n = succ m) : n > 0 :=
H⁻¹ ▸ (succ_pos m)
theorem ne_zero_imp_pos {n : } (H : n ≠ 0) : n > 0 :=
or_elim (zero_or_pos n) (take H2 : n = 0, absurd_elim _ H2 H) (take H2 : n > 0, H2)
theorem pos_imp_ne_zero {n : } (H : n > 0) : n ≠ 0 :=
ne_symm (lt_imp_ne H)
theorem pos_imp_eq_succ {n : } (H : n > 0) : exists l, n = succ l :=
lt_imp_eq_succ H
theorem add_pos_right (n : ) {k : } (H : k > 0) : n + k > n :=
(add_zero_right n) ▸ (add_lt_left H n)
theorem add_pos_left (n : ) {k : } (H : k > 0) : k + n > n :=
(add_comm n k) ▸ (add_pos_right n H)
-- ### multiplication
theorem mul_pos {n m : } (Hn : n > 0) (Hm : m > 0) : n * m > 0 :=
obtain (k : ) (Hk : n = succ k), from pos_imp_eq_succ Hn,
obtain (l : ) (Hl : m = succ l), from pos_imp_eq_succ Hm,
succ_imp_pos (calc
n * m = succ k * m : {Hk}
... = succ k * succ l : {Hl}
... = succ k * l + succ k : mul_succ_right (succ k) l
... = succ (succ k * l + k) : add_succ_right _ _)
theorem mul_pos_imp_pos_left {n m : } (H : n * m > 0) : n > 0 :=
discriminate
(assume H2 : n = 0,
have H3 : n * m = 0,
from calc
n * m = 0 * m : {H2}
... = 0 : mul_zero_left m,
have H4 : 0 > 0, from H3 ▸ H,
absurd_elim _ H4 (lt_irrefl 0))
(take l : nat,
assume Hl : n = succ l,
Hl⁻¹ ▸ (succ_pos l))
theorem mul_pos_imp_pos_right {m n : } (H : n * m > 0) : m > 0 :=
mul_pos_imp_pos_left ((mul_comm n m) ▸ H)
-- ### interaction of mul with le and lt
theorem mul_lt_left {n m k : } (Hk : k > 0) (H : n < m) : k * n < k * m :=
have H2 : k * n < k * n + k, from add_pos_right (k * n) Hk,
have H3 : k * n + k ≤ k * m, from (mul_succ_right k n) ▸ (mul_le_left H k),
lt_le_trans H2 H3
theorem mul_lt_right {n m k : } (Hk : k > 0) (H : n < m) : n * k < m * k :=
subst (mul_comm k m) (subst (mul_comm k n) (mul_lt_left Hk H))
theorem mul_le_lt {n m k l : } (Hk : k > 0) (H1 : n ≤ k) (H2 : m < l) : n * m < k * l :=
le_lt_trans (mul_le_right H1 m) (mul_lt_left Hk H2)
theorem mul_lt_le {n m k l : } (Hl : l > 0) (H1 : n < k) (H2 : m ≤ l) : n * m < k * l :=
le_lt_trans (mul_le_left H2 n) (mul_lt_right Hl H1)
theorem mul_lt {n m k l : } (H1 : n < k) (H2 : m < l) : n * m < k * l :=
have H3 : n * m ≤ k * m, from mul_le_right (lt_imp_le H1) m,
have H4 : k * m < k * l, from mul_lt_left (le_lt_trans (zero_le n) H1) H2,
le_lt_trans H3 H4
theorem mul_lt_cancel_left {n m k : } (H : k * n < k * m) : n < m :=
or_elim (le_or_gt m n)
(assume H2 : m ≤ n,
have H3 : k * m ≤ k * n, from mul_le_left H2 k,
absurd_elim _ H3 (lt_imp_not_ge H))
(assume H2 : n < m, H2)
theorem mul_lt_cancel_right {n m k : } (H : n * k < m * k) : n < m :=
mul_lt_cancel_left ((mul_comm m k) ▸ (mul_comm n k) ▸ H)
theorem mul_le_cancel_left {n m k : } (Hk : k > 0) (H : k * n ≤ k * m) : n ≤ m :=
have H2 : k * n < k * m + k, from le_lt_trans H (add_pos_right _ Hk),
have H3 : k * n < k * succ m, from (mul_succ_right k m)⁻¹ ▸ H2,
have H4 : n < succ m, from mul_lt_cancel_left H3,
show n ≤ m, from lt_succ_imp_le H4
theorem mul_le_cancel_right {n k m : } (Hm : m > 0) (H : n * m ≤ k * m) : n ≤ k :=
mul_le_cancel_left Hm ((mul_comm k m) ▸ (mul_comm n m) ▸ H)
theorem mul_cancel_left {m k n : } (Hn : n > 0) (H : n * m = n * k) : m = k :=
have H2 : n * m ≤ n * k, from H ▸ (le_refl (n * m)),
have H3 : n * k ≤ n * m, from H ▸ (le_refl (n * m)),
have H4 : m ≤ k, from mul_le_cancel_left Hn H2,
have H5 : k ≤ m, from mul_le_cancel_left Hn H3,
le_antisym H4 H5
theorem mul_cancel_left_or {n m k : } (H : n * m = n * k) : n = 0 m = k :=
or_imp_or_right (zero_or_pos n)
(assume Hn : n > 0, mul_cancel_left Hn H)
theorem mul_cancel_right {n m k : } (Hm : m > 0) (H : n * m = k * m) : n = k :=
mul_cancel_left Hm (subst (subst H (mul_comm n m)) (mul_comm k m))
theorem mul_cancel_right_or {n m k : } (H : n * m = k * m) : m = 0 n = k :=
mul_cancel_left_or (subst (subst H (mul_comm n m)) (mul_comm k m))
theorem mul_eq_one_left {n m : } (H : n * m = 1) : n = 1 :=
have H2 : n * m > 0, from H⁻¹ ▸ succ_pos 0,
have H3 : n > 0, from mul_pos_imp_pos_left H2,
have H4 : m > 0, from mul_pos_imp_pos_right H2,
or_elim (le_or_gt n 1)
(assume H5 : n ≤ 1,
show n = 1, from le_antisym H5 H3)
(assume H5 : n > 1,
have H6 : n * m ≥ 2 * 1, from mul_le H5 H4,
have H7 : 1 ≥ 2, from mul_one_right 2 ▸ H ▸ H6,
absurd_elim _ (self_lt_succ 1) (le_imp_not_gt H7))
theorem mul_eq_one_right {n m : } (H : n * m = 1) : m = 1 :=
mul_eq_one_left ((mul_comm n m) ▸ H)
end nat