(* Title: HOL/Isar_Examples/Expr_Compiler.thy
Author: Markus Wenzel, TU Muenchen
Correctness of a simple expression/stack-machine compiler.
*)
header {* Correctness of a simple expression compiler *}
theory Expr_Compiler
imports Main
begin
text {* This is a (rather trivial) example of program verification.
We model a compiler for translating expressions to stack machine
instructions, and prove its correctness wrt.\ some evaluation
semantics. *}
subsection {* Binary operations *}
text {* Binary operations are just functions over some type of values.
This is both for abstract syntax and semantics, i.e.\ we use a
``shallow embedding'' here. *}
type_synonym 'val binop = "'val \<Rightarrow> 'val \<Rightarrow> 'val"
subsection {* Expressions *}
text {* The language of expressions is defined as an inductive type,
consisting of variables, constants, and binary operations on
expressions. *}
datatype ('adr, 'val) expr =
Variable 'adr
| Constant 'val
| Binop "'val binop" "('adr, 'val) expr" "('adr, 'val) expr"
text {* Evaluation (wrt.\ some environment of variable assignments) is
defined by primitive recursion over the structure of expressions. *}
primrec eval :: "('adr, 'val) expr \<Rightarrow> ('adr \<Rightarrow> 'val) \<Rightarrow> 'val"
where
"eval (Variable x) env = env x"
| "eval (Constant c) env = c"
| "eval (Binop f e1 e2) env = f (eval e1 env) (eval e2 env)"
subsection {* Machine *}
text {* Next we model a simple stack machine, with three
instructions. *}
datatype ('adr, 'val) instr =
Const 'val
| Load 'adr
| Apply "'val binop"
text {* Execution of a list of stack machine instructions is easily
defined as follows. *}
primrec exec :: "(('adr, 'val) instr) list \<Rightarrow> 'val list \<Rightarrow> ('adr \<Rightarrow> 'val) \<Rightarrow> 'val list"
where
"exec [] stack env = stack"
| "exec (instr # instrs) stack env =
(case instr of
Const c \<Rightarrow> exec instrs (c # stack) env
| Load x \<Rightarrow> exec instrs (env x # stack) env
| Apply f \<Rightarrow> exec instrs (f (hd stack) (hd (tl stack))
# (tl (tl stack))) env)"
definition execute :: "(('adr, 'val) instr) list \<Rightarrow> ('adr \<Rightarrow> 'val) \<Rightarrow> 'val"
where "execute instrs env = hd (exec instrs [] env)"
subsection {* Compiler *}
text {* We are ready to define the compilation function of expressions
to lists of stack machine instructions. *}
primrec compile :: "('adr, 'val) expr \<Rightarrow> (('adr, 'val) instr) list"
where
"compile (Variable x) = [Load x]"
| "compile (Constant c) = [Const c]"
| "compile (Binop f e1 e2) = compile e2 @ compile e1 @ [Apply f]"
text {* The main result of this development is the correctness theorem
for @{text compile}. We first establish a lemma about @{text exec}
and list append. *}
lemma exec_append:
"exec (xs @ ys) stack env =
exec ys (exec xs stack env) env"
proof (induct xs arbitrary: stack)
case Nil
show ?case by simp
next
case (Cons x xs)
show ?case
proof (induct x)
case Const
from Cons show ?case by simp
next
case Load
from Cons show ?case by simp
next
case Apply
from Cons show ?case by simp
qed
qed
theorem correctness: "execute (compile e) env = eval e env"
proof -
have "\<And>stack. exec (compile e) stack env = eval e env # stack"
proof (induct e)
case Variable
show ?case by simp
next
case Constant
show ?case by simp
next
case Binop
then show ?case by (simp add: exec_append)
qed
then show ?thesis by (simp add: execute_def)
qed
text {* \bigskip In the proofs above, the @{text simp} method does
quite a lot of work behind the scenes (mostly ``functional program
execution''). Subsequently, the same reasoning is elaborated in
detail --- at most one recursive function definition is used at a
time. Thus we get a better idea of what is actually going on. *}
lemma exec_append':
"exec (xs @ ys) stack env = exec ys (exec xs stack env) env"
proof (induct xs arbitrary: stack)
case (Nil s)
have "exec ([] @ ys) s env = exec ys s env"
by simp
also have "\<dots> = exec ys (exec [] s env) env"
by simp
finally show ?case .
next
case (Cons x xs s)
show ?case
proof (induct x)
case (Const val)
have "exec ((Const val # xs) @ ys) s env = exec (Const val # xs @ ys) s env"
by simp
also have "\<dots> = exec (xs @ ys) (val # s) env"
by simp
also from Cons have "\<dots> = exec ys (exec xs (val # s) env) env" .
also have "\<dots> = exec ys (exec (Const val # xs) s env) env"
by simp
finally show ?case .
next
case (Load adr)
from Cons show ?case
by simp -- {* same as above *}
next
case (Apply fn)
have "exec ((Apply fn # xs) @ ys) s env =
exec (Apply fn # xs @ ys) s env" by simp
also have "\<dots> =
exec (xs @ ys) (fn (hd s) (hd (tl s)) # (tl (tl s))) env"
by simp
also from Cons have "\<dots> =
exec ys (exec xs (fn (hd s) (hd (tl s)) # tl (tl s)) env) env" .
also have "\<dots> = exec ys (exec (Apply fn # xs) s env) env"
by simp
finally show ?case .
qed
qed
theorem correctness': "execute (compile e) env = eval e env"
proof -
have exec_compile: "\<And>stack. exec (compile e) stack env = eval e env # stack"
proof (induct e)
case (Variable adr s)
have "exec (compile (Variable adr)) s env = exec [Load adr] s env"
by simp
also have "\<dots> = env adr # s"
by simp
also have "env adr = eval (Variable adr) env"
by simp
finally show ?case .
next
case (Constant val s)
show ?case by simp -- {* same as above *}
next
case (Binop fn e1 e2 s)
have "exec (compile (Binop fn e1 e2)) s env =
exec (compile e2 @ compile e1 @ [Apply fn]) s env"
by simp
also have "\<dots> = exec [Apply fn]
(exec (compile e1) (exec (compile e2) s env) env) env"
by (simp only: exec_append)
also have "exec (compile e2) s env = eval e2 env # s"
by fact
also have "exec (compile e1) \<dots> env = eval e1 env # \<dots>"
by fact
also have "exec [Apply fn] \<dots> env =
fn (hd \<dots>) (hd (tl \<dots>)) # (tl (tl \<dots>))"
by simp
also have "\<dots> = fn (eval e1 env) (eval e2 env) # s"
by simp
also have "fn (eval e1 env) (eval e2 env) =
eval (Binop fn e1 e2) env"
by simp
finally show ?case .
qed
have "execute (compile e) env = hd (exec (compile e) [] env)"
by (simp add: execute_def)
also from exec_compile have "exec (compile e) [] env = [eval e env]" .
also have "hd \<dots> = eval e env"
by simp
finally show ?thesis .
qed
end