# HG changeset patch
# User fahad
# Date 1423749645 0
# Node ID b31b224fa0e6c5e11865ef4e77dafd1f32ce3851
# Parent  4c6af8ca13eab2ab9086b111a1be2e2cb0d3d1e5
ch3

diff -r 4c6af8ca13ea -r b31b224fa0e6 thys/Chap03.thy
--- a/thys/Chap03.thy	Wed Feb 11 12:29:59 2015 +0000
+++ b/thys/Chap03.thy	Thu Feb 12 14:00:45 2015 +0000
@@ -1,8 +1,77 @@
-(* test *)
 theory Chap03
 imports Main
 begin
 
+(* 2.5.6 Case Study: Boolean Expressions *)
+
+datatype boolex = Const bool | Var nat | Neg boolex
+| And boolex boolex
+
+primrec "value2" :: "boolex \<Rightarrow> (nat \<Rightarrow> bool) \<Rightarrow> bool" where
+"value2 (Const b)  env = b" |
+"value2 (Var x)    env = env x" |
+"value2 (Neg b)    env = (\<not> value2 b env)" |
+"value2 (And b c)  env = (value2 b env \<and> value2 c env)"
+
+value "Const true"
+value "Var (Suc(0))"
+value "value2 (Const False) (\<lambda>x. False)"
+value "value2 (Var 11) (\<lambda>x. if (x = 10 | x = 11) then True else False)"
+value "value2 (Var 11) (\<lambda>x. True )"
+
+definition
+  "en1 \<equiv>  (\<lambda>x. if x = 10 | x = 11 then True else False)"
+  
+abbreviation
+  "en2 \<equiv>  (\<lambda>x. if x = 10 | x = 11 then True else False)"
+  
+value "value2 (And (Var 10) (Var 11)) en2"
+
+lemma "value2 (And (Var 10) (Var 11)) en2 = True"
+apply(simp)
+done
+
+datatype ifex = 
+  CIF bool 
+| VIF nat 
+| IF ifex ifex ifex
+
+primrec valif :: "ifex \<Rightarrow> (nat \<Rightarrow> bool) \<Rightarrow> bool" where
+"valif (CIF b)    env = b" |
+"valif (VIF x)    env = env x" |
+"valif (IF b t e) env = (if valif b env then valif t env else valif e env)"
+
+abbreviation "vif1 \<equiv> valif (CIF False) (\<lambda>x. False)"
+abbreviation "vif2 \<equiv> valif (VIF 11) (\<lambda>x. False)"
+abbreviation "vif3 \<equiv> valif (VIF 13) (\<lambda>x. True)"
+
+value "valif (CIF False) (\<lambda>x. False)"
+value "valif (VIF 11) (\<lambda>x. True)"
+value "valif (IF (CIF False) (CIF True) (CIF True))"
+
+primrec bool2if :: "boolex \<Rightarrow> ifex" where
+"bool2if (Const b)  = CIF b" |
+"bool2if (Var x)    = VIF x" |
+"bool2if (Neg b)    = IF (bool2if b) (CIF False) (CIF True)" |
+"bool2if (And b c)  = IF (bool2if b) (bool2if c) (CIF False)"
+
+lemma "valif (bool2if b) env = value2 b env"
+apply(induct_tac b)
+apply(auto)
+done
+
+primrec normif :: "ifex \<Rightarrow> ifex \<Rightarrow> ifex \<Rightarrow> ifex" where
+"normif (CIF b)     t e = IF (CIF b) t e" |
+"normif (VIF x)     t e = IF (VIF x) t e" |
+"normif (IF b t e)  u f = normif b (normif t u f) (normif e u f)"
+
+primrec norm :: "ifex \<Rightarrow> ifex" where
+"norm (CIF b)     = CIF b" |
+"norm (VIF x)     = VIF x" |
+"norm (IF b t e)  = normif b (norm t) (norm e)"  
+
+(***************   CHAPTER-3   ********************************)
+
 lemma "\<lbrakk> xs @ zs = ys @ xs; [] @ xs = [] @ [] \<rbrakk> \<Longrightarrow> ys = zs"
 apply simp
 done
@@ -125,7 +194,9 @@
 apply(simp add: abc3)
 done
 
-(* added test *)
+find_theorems "_ \<and> _ "
+
+(* added anottest *)
 
 lemma abc5: "add2 m n = m + n"
 apply(induction n)
@@ -147,6 +218,8 @@
 "value (Vex a) env = env a" |
 "value (Bex f e1 e2) env = f (value e1 env) (value e2 env)"
 
+value "value (Cex a) (\<lambda>x. True)"
+
 datatype ('a,'v)instr = 
   Const 'v
 | Load 'a
@@ -182,34 +255,41 @@
 apply(simp split: instr.split)
 done
 
-(* 2.5.6 Case Study: Boolean Expressions *)
-
-datatype boolex = Const bool | Var nat | Neg boolex
-| And boolex boolex
+(* 3.4 Advanced Datatypes  *)
 
-primrec "value2" :: "boolex \<Rightarrow> (nat \<Rightarrow> bool) \<Rightarrow> bool" where
-"value2 (Const b)  env = b" |
-"value2 (Var x)    env = env x" |
-"value2 (Neg b)    env = (\<not> value2 b env)" |
-"value2 (And b c)  env = (value2 b env \<and> value2 c env)"
+datatype 'a aexp = IF "'a bexp" "'a aexp" "'a aexp" 
+                | Sum "'a aexp" "'a aexp"
+                | Diff "'a aexp" "'a aexp"
+                | Var 'a
+                | Num nat
+and      'a bexp = Less "'a aexp" "'a aexp"
+                | And "'a bexp" "'a bexp"
+                | Neg "'a bexp"
+                
+(*  Total Recursive Functions: Fun  *)
+(*  3.5.1 Definition    *)
 
-value "Const true"
-value "Var (Suc(0))"
-
-
+fun fib :: "nat \<Rightarrow> nat" where
+"fib 0 = 0" |
+"fib (Suc 0) = 1" |
+"fib (Suc(Suc x)) = fib x + fib (Suc x)"
 
-value "value2 (Const False) (\<lambda>x. False)"
-value "value2 (Var 11) (\<lambda>x. if (x = 10 | x = 11) then True else False)"
+value "fib (Suc(Suc(Suc(Suc(Suc 0)))))"
+
+fun sep :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
+"sep a [] = []" |
+"sep a [x] = [x]" |
+"sep a (x#y#zs) = x # a # sep a (y#zs)"
 
-definition
-  "en1 \<equiv>  (\<lambda>x. if x = 10 | x = 11 then True else False)"
-  
-abbreviation
-  "en2 \<equiv>  (\<lambda>x. if x = 10 | x = 11 then True else False)"
-  
-value "value2 (And (Var 10) (Var 11)) en2"
+fun last :: "'a list \<Rightarrow> 'a" where
+"last [x] = x" |
+"last (_#y#zs) = last (y#zs)"
 
-lemma "value2 (And (Var 10) (Var 11)) en2 = True"
-apply(simp)
-done
+fun sep1 :: "'a \<Rightarrow> 'a list \<Rightarrow> 'a list" where
+"sep1 a (x#y#zs) = x # a # sep1 a (y#zs)" |
+"sep1 _ xs = xs"
 
+fun swap12:: "'a list \<Rightarrow> 'a list" where
+"swap12 (x#y#zs) = y#x#zs" |
+"swap12 zs = zs"
+
diff -r 4c6af8ca13ea -r b31b224fa0e6 thys/Test.txt
--- a/thys/Test.txt	Wed Feb 11 12:29:59 2015 +0000
+++ b/thys/Test.txt	Thu Feb 12 14:00:45 2015 +0000
@@ -1,1 +1,1 @@
-test
+test2