lean2/tests/lua/old/simp1.lua

add_rewrite_rules({"Nat", "add_zerol"})
add_rewrite_rules({"Nat", "add_zeror"})
parse_lean_cmds([[
  variable f : Nat -> Nat -> Nat
  variable g : Nat -> Nat
  variable b : Nat
  definition a := 1
  theorem a_eq_1 : a = 1
  := refl a
  definition c := 1
  set_opaque a true

  axiom f_id (x : Nat) : f x 1 = 2*x

  axiom g_g_x (x : Nat) : (not (x = 0)) -> g (g x) = 0
]])
add_rewrite_rules("a_eq_1")
add_rewrite_rules("f_id")
add_rewrite_rules("eq_id")

-- set_option({"lean", "pp", "implicit"}, true)
e, pr = simplify(parse_lean('fun x, f (f x (0 + a)) (g (b + 0))'))
print(e)
print(pr)
local env = get_environment()
print(env:type_check(pr))

e, pr = simplify(parse_lean('forall x, let d := a + 1 in f x a >= d'))
print(e)
print(pr)
local env = get_environment()
print(env:type_check(pr))

e, pr = simplify(parse_lean('(fun x, f (f x (0 + a)) (g (b + 0))) b'))
print(e)
print(pr)
local env = get_environment()
print(env:type_check(pr))

e, pr = simplify(parse_lean('(fun x y, f x y) = f'))
print(e)
print(pr)
local env = get_environment()
print(env:type_check(pr))
refactor(library/simplifier): cleanup rewrite_rule_set, and use it in the simplifier Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 04:52:33 +00:00			`add_rewrite_rules({"Nat", "add_zerol"})`
			`add_rewrite_rules({"Nat", "add_zeror"})`
			`parse_lean_cmds([[`
			`variable f : Nat -> Nat -> Nat`
			`variable g : Nat -> Nat`
			`variable b : Nat`
			`definition a := 1`
			`theorem a_eq_1 : a = 1`
			`:= refl a`
			`definition c := 1`
			`set_opaque a true`

			`axiom f_id (x : Nat) : f x 1 = 2*x`
feat(library/simplifier): add support for simplification by evaluation Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 18:34:55 +00:00
			`axiom g_g_x (x : Nat) : (not (x = 0)) -> g (g x) = 0`
refactor(library/simplifier): cleanup rewrite_rule_set, and use it in the simplifier Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 04:52:33 +00:00			`]])`
			`add_rewrite_rules("a_eq_1")`
			`add_rewrite_rules("f_id")`
feat(library/simplifier): add support for simplification by evaluation Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 18:34:55 +00:00			`add_rewrite_rules("eq_id")`
fix(library/simplifier): nontermination The example tests/lua/simp1.lua demonstrates the issue. The higher-order matcher matches closed terms that are definitionally equal. So, given a definition definition a := 1 it will match 'a' with '1' since they are definitionally equal. Then, if we have a theorem theorem a_eq_1 : a = 1 as a rewrite rule, it was triggering the following infinite loop when simplifying the expression "a" a --> 1 --> 1 --> 1 ... The first simplification is expected. The other ones are not. The problem is that "1" is definitionally equal to "a", and they match. The rewrite_rule_set manager accepts the rule a --> 1 since the left-hand-side does not occur in the right-hand-side. To avoid this loop, we test if the new expression is not equal to the previous one. Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-31 23:55:12 +00:00
refactor(library/simplifier): cleanup rewrite_rule_set, and use it in the simplifier Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 04:52:33 +00:00			`-- set_option({"lean", "pp", "implicit"}, true)`
			`e, pr = simplify(parse_lean('fun x, f (f x (0 + a)) (g (b + 0))'))`
			`print(e)`
			`print(pr)`
			`local env = get_environment()`
			`print(env:type_check(pr))`

			`e, pr = simplify(parse_lean('forall x, let d := a + 1 in f x a >= d'))`
			`print(e)`
			`print(pr)`
			`local env = get_environment()`
			`print(env:type_check(pr))`
feat(kernel/simplifier): add support for Beta-reduction in the simplifier Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 08:04:44 +00:00
			`e, pr = simplify(parse_lean('(fun x, f (f x (0 + a)) (g (b + 0))) b'))`
			`print(e)`
			`print(pr)`
			`local env = get_environment()`
			`print(env:type_check(pr))`
feat(library/simplifier): add support for Eta-reduction in the simplifier Signed-off-by: Leonardo de Moura <leonardo@microsoft.com> 2014-01-19 08:39:55 +00:00
			`e, pr = simplify(parse_lean('(fun x y, f x y) = f'))`
			`print(e)`
			`print(pr)`
			`local env = get_environment()`
			`print(env:type_check(pr))`