import GameServer.Commands -- Wird im Level "Implication 11" ohne Beweis angenommen. LemmaDoc not_not as not_not in "Logic" " ### Aussage `¬¬A ↔ A` ### Annahmen `(A : Prop)` " -- Wird im Level "Implication 10" ohne Beweis angenommen. LemmaDoc not_or_of_imp as not_or_of_imp in "Logic" " ### Aussage `¬A ∨ B` ### Annahmen `(A B : Prop)`\\ `(h : A → B)` " -- Wird im Level "Implication 12" bewiesen. LemmaDoc imp_iff_not_or as imp_iff_not_or in "Logic" " ### Aussage `(A → B) ↔ ¬A ∨ B` ### Annahmen `(A B : Prop)` " LemmaDoc Nat.succ_pos as Nat.succ_pos in "Nat" " " LemmaDoc Nat.pos_iff_ne_zero as Nat.pos_iff_ne_zero in "Nat" " " LemmaDoc zero_add as zero_add in "Addition" "This lemma says `∀ a : ℕ, 0 + a = a`." LemmaDoc add_zero as add_zero in "Addition" "This lemma says `∀ a : ℕ, a + 0 = a`." LemmaDoc add_succ as add_succ in "Addition" "This lemma says `∀ a b : ℕ, a + succ b = succ (a + b)`." LemmaDoc not_forall as not_forall in "Logic" "`∀ (A : Prop), ¬(∀ x, A) ↔ ∃x, (¬A)`." LemmaDoc not_exists as not_exists in "Logic" "`∀ (A : Prop), ¬(∃ x, A) ↔ ∀x, (¬A)`." DefinitionDoc Even " `even n` ist definiert als `∃ r, a = 2 * r`. Die Definition kann man mit `unfold even at *` einsetzen. " DefinitionDoc Odd " `odd n` ist definiert als `∃ r, a = 2 * r + 1`. Die Definition kann man mit `unfold odd at *` einsetzen. " DefinitionDoc Injective " `Injective f` ist definiert als ``` ∀ a b, f a = f b → a = b ``` definiert. " DefinitionDoc Surjective " `Surjective f` ist definiert als ``` ∀ a, (∃ b, f a = b) ``` " DefinitionDoc Bijective " " DefinitionDoc LeftInverse " " DefinitionDoc RightInverse " " DefinitionDoc StrictMono " `StrictMono f` ist definiert als ``` ∀ a b, a < b → f a < f b ``` " LemmaDoc even_iff_not_odd as even_iff_not_odd in "Nat" "`Even n ↔ ¬ (Odd n)`" LemmaDoc odd_iff_not_even as odd_iff_not_even in "Nat" "`Odd n ↔ ¬ (Even n)`" LemmaDoc even_square as even_square in "Nat" "`∀ (n : ℕ), Even n → Even (n ^ 2)`" LemmaDoc mem_univ as mem_univ in "Set" "x ∈ @univ α" LemmaDoc not_mem_empty as not_mem_empty in "Set" "" LemmaDoc empty_subset as empty_subset in "Set" "" LemmaDoc Subset.antisymm_iff as Subset.antisymm_iff in "Set" "" LemmaDoc Nat.prime_def_lt'' as Nat.prime_def_lt'' in "Nat" "" LemmaDoc Finset.sum_add_distrib as Finset.sum_add_distrib in "Sum" "" LemmaDoc Fin.sum_univ_castSucc as Fin.sum_univ_castSucc in "Sum" "" LemmaDoc Nat.succ_eq_add_one as Nat.succ_eq_add_one in "Sum" "" LemmaDoc add_comm as add_comm in "Nat" "" LemmaDoc mul_add as mul_add in "Nat" "" LemmaDoc add_mul as add_mul in "Nat" "" LemmaDoc arithmetic_sum as arithmetic_sum in "Sum" "" LemmaDoc add_pow_two as add_pow_two in "Nat" "" LemmaDoc Finset.sum_comm as Finset.sum_comm in "Sum" "" LemmaDoc Function.comp_apply as Function.comp_apply in "Function" "" LemmaDoc not_le as not_le in "Logic" "" LemmaDoc if_pos as if_pos in "Logic" "" LemmaDoc if_neg as if_neg in "Logic" "" LemmaDoc StrictMono.injective as StrictMono.injective in "Function" "" LemmaDoc StrictMono.add as StrictMono.add in "Function" "" LemmaDoc Odd.strictMono_pow as Odd.strictMono_pow in "Function" "" LemmaDoc Exists.choose as Exists.choose in "Function" "" LemmaDoc Exists.choose_spec as Exists.choose_spec in "Function" "" LemmaDoc congrArg as congrArg in "Function" "" LemmaDoc congrFun as congrFun in "Function" "" LemmaDoc Iff.symm as Iff.symm in "Logic" ""