import logic using num (num pos_num num_rec pos_num_rec) using tactic inductive nat : Type := zero : nat, succ : nat → nat definition add [inline] (a b : nat) : nat := nat_rec a (λ n r, succ r) b infixl `+`:65 := add definition one [inline] := succ zero -- Define coercion from num -> nat -- By default the parser converts numerals into a binary representation num definition pos_num_to_nat [inline] (n : pos_num) : nat := pos_num_rec one (λ n r, r + r) (λ n r, r + r + one) n definition num_to_nat [inline] (n : num) : nat := num_rec zero (λ n, pos_num_to_nat n) n coercion num_to_nat -- Now we can write 2 + 3, the coercion will be applied check 2 + 3 -- Define an assump as an alias for the eassumption tactic definition assump : tactic := eassumption theorem T1 {p : nat → Prop} {a : nat } (H : p (a+2)) : ∃ x, p (succ x) := by apply exists_intro; assump definition is_zero (n : nat) := nat_rec true (λ n r, false) n theorem T2 : ∃ a, (is_zero a) = true := by apply exists_intro; apply refl