| Quellcodebibliothek Statistik Leitseite products/Sources/formale Sprachen/Isabelle/Doc/Tutorial/Sets/ (Beweissystem Isabelle Version 2025-1©) Datei vom 16.11.2025 mit Größe 2 kB |
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Quelle Functions.thySprache: Isabelle |
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theory Functions imports Main begin text‹ {thm[display] id_def[no_vars]} rulename{id_def} {thm[display] o_def[no_vars]} rulename{o_def} {thm[display] o_assoc[no_vars]} rulename{o_assoc} › text‹ {thm[display] fun_upd_apply[no_vars]} rulename{fun_upd_apply} {thm[display] fun_upd_upd[no_vars]} rulename{fun_upd_upd} › text‹ of injective, surjective, bijective {thm[display] inj_on_def[no_vars]} rulename{inj_on_def} {thm[display] surj_def[no_vars]} rulename{surj_def} {thm[display] bij_def[no_vars]} rulename{bij_def} › text‹ interesting theorems about inv › text‹ {thm[display] inv_f_f[no_vars]} rulename{inv_f_f} {thm[display] inj_imp_surj_inv[no_vars]} rulename{inj_imp_surj_inv} {thm[display] surj_imp_inj_inv[no_vars]} rulename{surj_imp_inj_inv} {thm[display] surj_f_inv_f[no_vars]} rulename{surj_f_inv_f} {thm[display] bij_imp_bij_inv[no_vars]} rulename{bij_imp_bij_inv} {thm[display] inv_inv_eq[no_vars]} rulename{inv_inv_eq} {thm[display] o_inv_distrib[no_vars]} rulename{o_inv_distrib} › text‹ sample proof {thm[display] ext[no_vars]} rulename{ext} {thm[display] fun_eq_iff[no_vars]} rulename{fun_eq_iff} › lemma "inj f ==> (f o g = f o h) = (g = h)" apply (simp add: fun_eq_iff inj_on_def) apply (auto) done text‹ begin{isabelle} \ f\ \isasymLongrightarrow \ (f\ \isasymcirc \ g\ =\ f\ \isasymcirc \ h)\ =\ (g\ =\ h)\isanew 1.\ \isasymforall x\ y.\ f\ x\ =\ f\ y\ \isasymlongrightarrow \ x\ =\ y\ \isasymLongrightar \ \ \ (\isasymforall x.\ f\ (g\ x)\ =\ f\ (h\ x))\ =\ (\isasymforall x.\ g\ x\ =\ h\ x) end{isabelle} › text‹image, inverse image› text‹ {thm[display] image_def[no_vars]} rulename{image_def} › text‹ {thm[display] image_Un[no_vars]} rulename{image_Un} › text‹ {thm[display] image_comp[no_vars]} rulename{image_comp} {thm[display] image_Int[no_vars]} rulename{image_Int} {thm[display] bij_image_Compl_eq[no_vars]} rulename{bij_image_Compl_eq} › text‹ Union as well as image › lemma "f`A ∪ g`A = (∪x∈A. {f x, g x})" by blast lemma "f ` {(x,y). P x y} = {f(x,y) | x y. P x y}" by blast text‹actually a macro!› lemma "range f = f`UNIV" by blast text‹ image › text‹ {thm[display] vimage_def[no_vars]} rulename{vimage_def} {thm[display] vimage_Compl[no_vars]} rulename{vimage_Compl} › end
¤ Dauer der Verarbeitung: 0.10 Sekunden (vorverarbeitet am 2026-06-10) ¤*© Formatika GbR, Deutschland |
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2026-06-09