9 lines
330 B
Text
9 lines
330 B
Text
open nat
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theorem lt_trans : ∀ {a b c : nat}, a < b → b < c → a < c
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| lt_trans h (lt.base _) := lt.step h
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| lt_trans h₁ (lt.step h₂) := lt.step (lt_trans h₁ h₂)
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theorem lt_succ : ∀ {a b : nat}, a < b → succ a < succ b
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| lt_succ (lt.base a) := lt.base (succ a)
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| lt_succ (lt.step h) := lt.step (lt_succ h)
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