2014-08-01 16:37:23 +00:00
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import standard
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2014-08-20 22:49:44 +00:00
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using num eq_ops
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2014-07-25 22:03:57 +00:00
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inductive nat : Type :=
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2014-08-22 22:46:10 +00:00
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zero : nat,
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succ : nat → nat
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2014-07-25 22:03:57 +00:00
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abbreviation plus (x y : nat) : nat
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:= nat_rec x (λn r, succ r) y
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definition to_nat [coercion] [inline] (n : num) : nat
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:= num_rec zero (λn, pos_num_rec (succ zero) (λn r, plus r (plus r (succ zero))) (λn r, plus r r) n) n
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definition add (x y : nat) : nat
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:= plus x y
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variable le : nat → nat → Prop
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infixl `+`:65 := add
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infix `≤`:50 := le
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axiom add_one (n:nat) : n + (succ zero) = succ n
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axiom add_le_right_inv {n m k : nat} (H : n + k ≤ m + k) : n ≤ m
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theorem succ_le_cancel {n m : nat} (H : succ n ≤ succ m) : n ≤ m
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:= add_le_right_inv (add_one m⁻¹ ▸ add_one n⁻¹ ▸ H)
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