isabelle: src/HOL/IMP/Vars.thy@1210309fddab (annotated)

43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	1	(* Author: Tobias Nipkow *)
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	2
50303 5c4c35321e87 tuned nipkow parents: 50173 diff changeset	3	header "Definite Initialization Analysis"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	4
45716 ccf2cbe86d70 merged IMP/Util into IMP/Vars nipkow parents: 45212 diff changeset	5	theory Vars imports BExp
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	6	begin
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	7
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	8	subsection "The Variables in an Expression"
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	9
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	10	text{* We need to collect the variables in both arithmetic and boolean
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	11	expressions. For a change we do not introduce two functions, e.g.\ @{text
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	12	avars} and @{text bvars}, but we overload the name @{text vars}
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	13	via a \emph{type class}, a device that originated with Haskell: *}
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	14
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	15	class vars =
45212 e87feee00a4c renamed name -> vname nipkow parents: 45200 diff changeset	16	fixes vars :: "'a \<Rightarrow> vname set"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	17
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	18	text{* This defines a type class ``vars'' with a single
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	19	function of (coincidentally) the same name. Then we define two separated
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	20	instances of the class, one for @{typ aexp} and one for @{typ bexp}: *}
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	21
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	22	instantiation aexp :: vars
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	23	begin
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	24
45212 e87feee00a4c renamed name -> vname nipkow parents: 45200 diff changeset	25	fun vars_aexp :: "aexp \<Rightarrow> vname set" where
45774 9b11989f38b0 tuned nipkow parents: 45716 diff changeset	26	"vars (N n) = {}" \|
9b11989f38b0 tuned nipkow parents: 45716 diff changeset	27	"vars (V x) = {x}" \|
9b11989f38b0 tuned nipkow parents: 45716 diff changeset	28	"vars (Plus a\<^isub>1 a\<^isub>2) = vars a\<^isub>1 \<union> vars a\<^isub>2"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	29
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	30	instance ..
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	31
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	32	end
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	33
50173 e014009fbd93 tuned nipkow parents: 50006 diff changeset	34	value "vars (Plus (V ''x'') (V ''y''))"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	35
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	36	instantiation bexp :: vars
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	37	begin
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	38
45212 e87feee00a4c renamed name -> vname nipkow parents: 45200 diff changeset	39	fun vars_bexp :: "bexp \<Rightarrow> vname set" where
45774 9b11989f38b0 tuned nipkow parents: 45716 diff changeset	40	"vars (Bc v) = {}" \|
9b11989f38b0 tuned nipkow parents: 45716 diff changeset	41	"vars (Not b) = vars b" \|
9b11989f38b0 tuned nipkow parents: 45716 diff changeset	42	"vars (And b\<^isub>1 b\<^isub>2) = vars b\<^isub>1 \<union> vars b\<^isub>2" \|
9b11989f38b0 tuned nipkow parents: 45716 diff changeset	43	"vars (Less a\<^isub>1 a\<^isub>2) = vars a\<^isub>1 \<union> vars a\<^isub>2"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	44
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	45	instance ..
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	46
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	47	end
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	48
50173 e014009fbd93 tuned nipkow parents: 50006 diff changeset	49	value "vars (Less (Plus (V ''z'') (V ''y'')) (V ''x''))"
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	50
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	51	abbreviation
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	52	eq_on :: "('a \<Rightarrow> 'b) \<Rightarrow> ('a \<Rightarrow> 'b) \<Rightarrow> 'a set \<Rightarrow> bool"
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	53	("(_ =/ _/ on _)" [50,0,50] 50) where
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	54	"f = g on X == \<forall> x \<in> X. f x = g x"
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	55
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	56	lemma aval_eq_if_eq_on_vars[simp]:
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	57	"s\<^isub>1 = s\<^isub>2 on vars a \<Longrightarrow> aval a s\<^isub>1 = aval a s\<^isub>2"
45015 fdac1e9880eb Updated IMP to use new induction method nipkow parents: 43158 diff changeset	58	apply(induction a)
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	59	apply simp_all
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	60	done
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	61
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	62	lemma bval_eq_if_eq_on_vars:
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	63	"s\<^isub>1 = s\<^isub>2 on vars b \<Longrightarrow> bval b s\<^isub>1 = bval b s\<^isub>2"
45015 fdac1e9880eb Updated IMP to use new induction method nipkow parents: 43158 diff changeset	64	proof(induction b)
43158 686fa0a0696e imported rest of new IMP kleing parents: diff changeset	65	case (Less a1 a2)
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	66	hence "aval a1 s\<^isub>1 = aval a1 s\<^isub>2" and "aval a2 s\<^isub>1 = aval a2 s\<^isub>2" by simp_all
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	67	thus ?case by simp
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	68	qed simp_all
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	69
686fa0a0696e imported rest of new IMP kleing parents: diff changeset	70	end

author	hoelzl
	Fri, 22 Mar 2013 10:41:43 +0100
changeset 51473	1210309fddab
parent 50303	5c4c35321e87
child 51698	c0af8bbc5825
permissions	-rw-r--r--