adding termination proofs to series functions in LSC; commenting out momentarily unused term refinement functions in LSC
(* Title: HOL/ex/LSC_Examples.thy
Author: Lukas Bulwahn
Copyright 2011 TU Muenchen
*)
header {* Examples for invoking lazysmallcheck (LSC) *}
theory LSC_Examples
imports "~~/src/HOL/Library/LSC"
begin
subsection {* Simple list examples *}
lemma "rev xs = xs"
quickcheck[tester = lazy_exhaustive, finite_types = false, default_type = nat, expect = counterexample]
oops
text {* Example fails due to some strange thing... *}
(*
lemma "rev xs = xs"
quickcheck[tester = lazy_exhaustive, finite_types = true]
oops
*)
subsection {* AVL Trees *}
datatype 'a tree = ET | MKT 'a "'a tree" "'a tree" nat
primrec set_of :: "'a tree \<Rightarrow> 'a set"
where
"set_of ET = {}" |
"set_of (MKT n l r h) = insert n (set_of l \<union> set_of r)"
primrec height :: "'a tree \<Rightarrow> nat"
where
"height ET = 0" |
"height (MKT x l r h) = max (height l) (height r) + 1"
primrec avl :: "'a tree \<Rightarrow> bool"
where
"avl ET = True" |
"avl (MKT x l r h) =
((height l = height r \<or> height l = 1+height r \<or> height r = 1+height l) \<and>
h = max (height l) (height r) + 1 \<and> avl l \<and> avl r)"
primrec is_ord :: "('a::order) tree \<Rightarrow> bool"
where
"is_ord ET = True" |
"is_ord (MKT n l r h) =
((\<forall>n' \<in> set_of l. n' < n) \<and> (\<forall>n' \<in> set_of r. n < n') \<and> is_ord l \<and> is_ord r)"
primrec is_in :: "('a::order) \<Rightarrow> 'a tree \<Rightarrow> bool"
where
"is_in k ET = False" |
"is_in k (MKT n l r h) = (if k = n then True else
if k < n then (is_in k l)
else (is_in k r))"
primrec ht :: "'a tree \<Rightarrow> nat"
where
"ht ET = 0" |
"ht (MKT x l r h) = h"
definition
mkt :: "'a \<Rightarrow> 'a tree \<Rightarrow> 'a tree \<Rightarrow> 'a tree" where
"mkt x l r = MKT x l r (max (ht l) (ht r) + 1)"
(* replaced MKT lrn lrl lrr by MKT lrr lrl *)
fun l_bal where
"l_bal(n, MKT ln ll lr h, r) =
(if ht ll < ht lr
then case lr of ET \<Rightarrow> ET (* impossible *)
| MKT lrn lrr lrl lrh \<Rightarrow>
mkt lrn (mkt ln ll lrl) (mkt n lrr r)
else mkt ln ll (mkt n lr r))"
fun r_bal where
"r_bal(n, l, MKT rn rl rr h) =
(if ht rl > ht rr
then case rl of ET \<Rightarrow> ET (* impossible *)
| MKT rln rll rlr h \<Rightarrow> mkt rln (mkt n l rll) (mkt rn rlr rr)
else mkt rn (mkt n l rl) rr)"
primrec insrt :: "'a::order \<Rightarrow> 'a tree \<Rightarrow> 'a tree"
where
"insrt x ET = MKT x ET ET 1" |
"insrt x (MKT n l r h) =
(if x=n
then MKT n l r h
else if x<n
then let l' = insrt x l; hl' = ht l'; hr = ht r
in if hl' = 2+hr then l_bal(n,l',r)
else MKT n l' r (1 + max hl' hr)
else let r' = insrt x r; hl = ht l; hr' = ht r'
in if hr' = 2+hl then r_bal(n,l,r')
else MKT n l r' (1 + max hl hr'))"
subsubsection {* Necessary setup for code generation *}
primrec set_of'
where
"set_of' ET = []"
| "set_of' (MKT n l r h) = n # (set_of' l @ set_of' r)"
lemma set_of':
"set (set_of' t) = set_of t"
by (induct t) auto
lemma is_ord_mkt:
"is_ord (MKT n l r h) = ((ALL n': set (set_of' l). n' < n) & (ALL n': set (set_of' r). n < n') & is_ord l & is_ord r)"
by (simp add: set_of')
declare is_ord.simps(1)[code] is_ord_mkt[code]
subsection {* Necessary instantiation for quickcheck generator *}
instantiation tree :: (serial) serial
begin
function series_tree
where
"series_tree d = sum (cons ET) (apply (apply (apply (apply (cons MKT) series) series_tree) series_tree) series) d"
by pat_completeness auto
termination proof (relation "measure nat_of")
qed (auto simp add: of_int_inverse nat_of_def)
instance ..
end
subsubsection {* Invalid Lemma due to typo in lbal *}
lemma is_ord_l_bal:
"\<lbrakk> is_ord(MKT (x :: nat) l r h); height l = height r + 2 \<rbrakk> \<Longrightarrow> is_ord(l_bal(x,l,r))"
quickcheck[tester = lazy_exhaustive, finite_types = false, default_type = nat, size = 1, timeout = 80, expect = counterexample]
oops
end