author  wenzelm 
Tue, 10 Feb 2015 14:48:26 +0100  
changeset 59498  50b60f501b05 
parent 58889  5b7a9633cfa8 
child 59499  14095f771781 
permissions  rwrr 
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section \<open>Lambda Cube Examples\<close> 
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theory Example 

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imports Cube 

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begin 

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text \<open>Examples taken from: 
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H. Barendregt. Introduction to Generalised Type Systems. 

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J. Functional Programming.\<close> 
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method_setup depth_solve = 
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\<open>Attrib.thms >> (fn thms => K (METHOD (fn facts => 

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(DEPTH_SOLVE (HEADGOAL (ares_tac (facts @ thms)))))))\<close> 

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method_setup depth_solve1 = 
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\<open>Attrib.thms >> (fn thms => K (METHOD (fn facts => 

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(DEPTH_SOLVE_1 (HEADGOAL (ares_tac (facts @ thms)))))))\<close> 

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method_setup strip_asms = 
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\<open>Attrib.thms >> (fn thms => fn ctxt => METHOD (fn facts => 
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REPEAT (resolve_tac ctxt [@{thm strip_b}, @{thm strip_s}] 1 THEN 
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DEPTH_SOLVE_1 (ares_tac (facts @ thms) 1))))\<close> 
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subsection \<open>Simple types\<close> 
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schematic_lemma "A:* \<turnstile> A\<rightarrow>A : ?T" 
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by (depth_solve rules) 
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schematic_lemma "A:* \<turnstile> \<Lambda> a:A. a : ?T" 
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by (depth_solve rules) 
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schematic_lemma "A:* B:* b:B \<turnstile> \<Lambda> x:A. b : ?T" 
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by (depth_solve rules) 
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schematic_lemma "A:* b:A \<turnstile> (\<Lambda> a:A. a)^b: ?T" 
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by (depth_solve rules) 
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schematic_lemma "A:* B:* c:A b:B \<turnstile> (\<Lambda> x:A. b)^ c: ?T" 
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by (depth_solve rules) 
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schematic_lemma "A:* B:* \<turnstile> \<Lambda> a:A. \<Lambda> b:B. a : ?T" 
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by (depth_solve rules) 
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subsection \<open>Secondorder types\<close> 
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schematic_lemma (in L2) "\<turnstile> \<Lambda> A:*. \<Lambda> a:A. a : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in L2) "A:* \<turnstile> (\<Lambda> B:*.\<Lambda> b:B. b)^A : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in L2) "A:* b:A \<turnstile> (\<Lambda> B:*.\<Lambda> b:B. b) ^ A ^ b: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in L2) "\<turnstile> \<Lambda> B:*.\<Lambda> a:(\<Pi> A:*.A).a ^ ((\<Pi> A:*.A)\<rightarrow>B) ^ a: ?T" 
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by (depth_solve rules) 
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subsection \<open>Weakly higherorder propositional logic\<close> 
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schematic_lemma (in Lomega) "\<turnstile> \<Lambda> A:*.A\<rightarrow>A : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega) "B:* \<turnstile> (\<Lambda> A:*.A\<rightarrow>A) ^ B : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega) "B:* b:B \<turnstile> (\<Lambda> y:B. b): ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega) "A:* F:*\<rightarrow>* \<turnstile> F^(F^A): ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega) "A:* \<turnstile> \<Lambda> F:*\<rightarrow>*.F^(F^A): ?T" 
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by (depth_solve rules) 
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subsection \<open>LP\<close> 
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schematic_lemma (in LP) "A:* \<turnstile> A \<rightarrow> * : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* a:A \<turnstile> P^a: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>A\<rightarrow>* a:A \<turnstile> \<Pi> a:A. P^a^a: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* Q:A\<rightarrow>* \<turnstile> \<Pi> a:A. P^a \<rightarrow> Q^a: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* \<turnstile> \<Pi> a:A. P^a \<rightarrow> P^a: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* \<turnstile> \<Lambda> a:A. \<Lambda> x:P^a. x: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* Q:* \<turnstile> (\<Pi> a:A. P^a\<rightarrow>Q) \<rightarrow> (\<Pi> a:A. P^a) \<rightarrow> Q : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP) "A:* P:A\<rightarrow>* Q:* a0:A \<turnstile> 
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\<Lambda> x:\<Pi> a:A. P^a\<rightarrow>Q. \<Lambda> y:\<Pi> a:A. P^a. x^a0^(y^a0): ?T" 

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by (depth_solve rules) 
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subsection \<open>Omegaorder types\<close> 
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schematic_lemma (in L2) "A:* B:* \<turnstile> \<Pi> C:*.(A\<rightarrow>B\<rightarrow>C)\<rightarrow>C : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega2) "\<turnstile> \<Lambda> A:*.\<Lambda> B:*.\<Pi> C:*.(A\<rightarrow>B\<rightarrow>C)\<rightarrow>C : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega2) "\<turnstile> \<Lambda> A:*.\<Lambda> B:*.\<Lambda> x:A. \<Lambda> y:B. x : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in Lomega2) "A:* B:* \<turnstile> ?p : (A\<rightarrow>B) \<rightarrow> ((B\<rightarrow>\<Pi> P:*.P)\<rightarrow>(A\<rightarrow>\<Pi> P:*.P))" 
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apply (strip_asms rules) 
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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (rule lam_ss) 

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apply assumption 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (erule pi_elim) 

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apply assumption 

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apply (erule pi_elim) 

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apply assumption 

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apply assumption 

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done 

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subsection \<open>Secondorder Predicate Logic\<close> 
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schematic_lemma (in LP2) "A:* P:A\<rightarrow>* \<turnstile> \<Lambda> a:A. P^a\<rightarrow>(\<Pi> A:*.A) : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LP2) "A:* P:A\<rightarrow>A\<rightarrow>* \<turnstile> 
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(\<Pi> a:A. \<Pi> b:A. P^a^b\<rightarrow>P^b^a\<rightarrow>\<Pi> P:*.P) \<rightarrow> \<Pi> a:A. P^a^a\<rightarrow>\<Pi> P:*.P : ?T" 

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by (depth_solve rules) 
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schematic_lemma (in LP2) "A:* P:A\<rightarrow>A\<rightarrow>* \<turnstile> 
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?p: (\<Pi> a:A. \<Pi> b:A. P^a^b\<rightarrow>P^b^a\<rightarrow>\<Pi> P:*.P) \<rightarrow> \<Pi> a:A. P^a^a\<rightarrow>\<Pi> P:*.P" 

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 \<open>Antisymmetry implies irreflexivity:\<close> 
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apply (strip_asms rules) 
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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (rule lam_ss) 

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apply assumption 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (erule pi_elim, assumption, assumption?)+ 

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done 

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subsection \<open>LPomega\<close> 
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schematic_lemma (in LPomega) "A:* \<turnstile> \<Lambda> P:A\<rightarrow>A\<rightarrow>*.\<Lambda> a:A. P^a^a : ?T" 
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by (depth_solve rules) 
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schematic_lemma (in LPomega) "\<turnstile> \<Lambda> A:*.\<Lambda> P:A\<rightarrow>A\<rightarrow>*.\<Lambda> a:A. P^a^a : ?T" 
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by (depth_solve rules) 
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subsection \<open>Constructions\<close> 
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schematic_lemma (in CC) "\<turnstile> \<Lambda> A:*.\<Lambda> P:A\<rightarrow>*.\<Lambda> a:A. P^a\<rightarrow>\<Pi> P:*.P: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in CC) "\<turnstile> \<Lambda> A:*.\<Lambda> P:A\<rightarrow>*.\<Pi> a:A. P^a: ?T" 
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by (depth_solve rules) 
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schematic_lemma (in CC) "A:* P:A\<rightarrow>* a:A \<turnstile> ?p : (\<Pi> a:A. P^a)\<rightarrow>P^a" 
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apply (strip_asms rules) 
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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (erule pi_elim, assumption, assumption) 

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done 

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subsection \<open>Some random examples\<close> 
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schematic_lemma (in LP2) "A:* c:A f:A\<rightarrow>A \<turnstile> 
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\<Lambda> a:A. \<Pi> P:A\<rightarrow>*.P^c \<rightarrow> (\<Pi> x:A. P^x\<rightarrow>P^(f^x)) \<rightarrow> P^a : ?T" 

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by (depth_solve rules) 
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schematic_lemma (in CC) "\<Lambda> A:*.\<Lambda> c:A. \<Lambda> f:A\<rightarrow>A. 
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\<Lambda> a:A. \<Pi> P:A\<rightarrow>*.P^c \<rightarrow> (\<Pi> x:A. P^x\<rightarrow>P^(f^x)) \<rightarrow> P^a : ?T" 

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by (depth_solve rules) 
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schematic_lemma (in LP2) 
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"A:* a:A b:A \<turnstile> ?p: (\<Pi> P:A\<rightarrow>*.P^a\<rightarrow>P^b) \<rightarrow> (\<Pi> P:A\<rightarrow>*.P^b\<rightarrow>P^a)" 
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 \<open>Symmetry of Leibnitz equality\<close> 
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apply (strip_asms rules) 
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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (erule_tac a = "\<Lambda> x:A. \<Pi> Q:A\<rightarrow>*.Q^x\<rightarrow>Q^a" in pi_elim) 
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apply (depth_solve1 rules) 
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apply (unfold beta) 

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apply (erule imp_elim) 

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apply (rule lam_bs) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply (rule lam_ss) 

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apply (depth_solve1 rules) 

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prefer 2 

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apply (depth_solve1 rules) 

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apply assumption 

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apply assumption 

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done 

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end 