Diferencia entre revisiones de «Relación 5»
De Demostración automática de teoremas (2014-15)
(Página creada con '<source lang = "isar"> header {* R5: Cuantificadores sobre listas *} theory R5 imports Main begin text {* -----------------------------------------------------------------...') |
|||
| (No se muestran 5 ediciones intermedias del mismo usuario) | |||
| Línea 14: | Línea 14: | ||
todos (λx. 1<length x) [[2,1,4],[1,3]] | todos (λx. 1<length x) [[2,1,4],[1,3]] | ||
¬todos (λx. 1<length x) [[2,1,4],[3]] | ¬todos (λx. 1<length x) [[2,1,4],[3]] | ||
| − | + | ||
Nota: La función todos es equivalente a la predefinida list_all. | Nota: La función todos es equivalente a la predefinida list_all. | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| + | (*Solución M.Cumplido*) | ||
fun todos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where | fun todos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where | ||
| − | "todos p xs = | + | "todos p [] = True" | "todos p (x#xs) = (p x ∧ todos p xs)" |
| − | + | ||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 30: | Línea 31: | ||
algunos (λx. 1<length x) [[2,1,4],[3]] | algunos (λx. 1<length x) [[2,1,4],[3]] | ||
¬algunos (λx. 1<length x) [[],[3]]" | ¬algunos (λx. 1<length x) [[],[3]]" | ||
| − | + | ||
Nota: La función algunos es equivalente a la predefinida list_ex. | Nota: La función algunos es equivalente a la predefinida list_ex. | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | ||
| + | (*Solución M.Cumplido*) | ||
fun algunos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where | fun algunos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where | ||
| − | "algunos p xs = | + | "algunos p [] = False" | "algunos p (x#xs) = (p x ∨ algunos p xs)" |
| − | + | ||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 44: | Línea 46: | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | (*Solución M.Cumplido*) | |
lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)" | lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)" | ||
| − | + | by (induct xs) auto | |
| − | |||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 54: | Línea 55: | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | (*Solución M.Cumplido*) | |
lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)" | lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)" | ||
| − | + | proof (induct xs) | |
| + | show "todos (λx. P x ∧ Q x) [] = (todos P [] ∧ todos Q [])" by simp | ||
| + | next | ||
| + | fix xs | ||
| + | assume HI: "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)" | ||
| + | fix a | ||
| + | have "todos (λx. P x ∧ Q x) (a#xs) = ((P a ∧ Q a) ∧ todos (λx. P x ∧ Q x) xs) " by simp | ||
| + | also have "... = (P a ∧ Q a ∧ todos P xs ∧ todos Q xs)" using HI by simp | ||
| + | also have "... = ((P a ∧todos P xs)∧(Q a ∧ todos Q xs))" by arith | ||
| + | also have "... = (todos P (a#xs) ∧ (Q a ∧ todos Q xs))" by simp | ||
| + | also have "... = (todos P (a#xs) ∧ todos Q (a#xs))" by simp | ||
| + | finally show "todos (λx. P x ∧ Q x) (a#xs) = (todos P (a#xs) ∧ todos Q (a#xs))" by simp | ||
| + | qed | ||
text {* | text {* | ||
| Línea 64: | Línea 77: | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | (*Solución M.Cumplido*) | |
lemma "todos P (x @ y) = (todos P x ∧ todos P y)" | lemma "todos P (x @ y) = (todos P x ∧ todos P y)" | ||
| − | + | by (induct x) auto | |
| − | + | ||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 74: | Línea 87: | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | ||
lemma todos_append: | lemma todos_append: | ||
"todos P (x @ y) = (todos P x ∧ todos P y)" | "todos P (x @ y) = (todos P x ∧ todos P y)" | ||
| − | |||
| + | (*Solución M.Cumplido*) | ||
| + | proof(induct x) | ||
| + | show "todos P ([] @ y) = (todos P [] ∧ todos P y)" by simp | ||
| + | next | ||
| + | fix x | ||
| + | assume HI: "todos P (x @ y) = (todos P x ∧ todos P y)" | ||
| + | fix a | ||
| + | have "todos P ((a#x) @ y) = todos P (a#(x@y))" by simp | ||
| + | also have "... = (P a ∧ todos P (x @ y))" by simp | ||
| + | also have "... = (P a ∧ todos P x ∧ todos P y)" using HI by simp | ||
| + | also have "... = (todos P (a#x) ∧ todos P y)" by simp | ||
| + | finally show "todos P ((a#x) @ y) = (todos P (a#x) ∧ todos P y)" by simp | ||
| + | qed | ||
| + | |||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 86: | Línea 112: | ||
*} | *} | ||
| + | (*Solución M.Cumplido*) | ||
lemma "todos P (rev xs) = todos P xs" | lemma "todos P (rev xs) = todos P xs" | ||
| − | + | by (induct xs) (auto simp add: todos_append) | |
| − | + | ||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
| Línea 95: | Línea 122: | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
*} | *} | ||
| − | + | ||
| + | (*Solución M.Cumplido*) | ||
lemma "todos P (rev xs) = todos P xs" | lemma "todos P (rev xs) = todos P xs" | ||
| − | + | proof(induct xs) | |
| − | + | show "todos P (rev []) = todos P []" by simp | |
| + | next | ||
| + | fix xs x | ||
| + | assume HI: "todos P (rev xs) = todos P xs" | ||
| + | have "todos P (rev (x#xs)) = todos P ((rev xs) @ [x])" by simp | ||
| + | also have "... = (todos P (rev xs) ∧ todos P [x])" by (rule todos_append) | ||
| + | also have "... = (todos P xs ∧ todos P [x])" using HI by simp | ||
| + | also have "... = (todos P [x] ∧ todos P xs)" by arith | ||
| + | also have "... = (P x ∧ todos P xs)" by simp | ||
| + | also have "... = todos P (x#xs)" by simp | ||
| + | finally show "todos P (rev (x#xs)) = todos P (x#xs)" by simp | ||
| + | qed | ||
text {* | text {* | ||
--------------------------------------------------------------------- | --------------------------------------------------------------------- | ||
Revisión actual del 16:35 13 abr 2015
header {* R5: Cuantificadores sobre listas *}
theory R5
imports Main
begin
text {*
---------------------------------------------------------------------
Ejercicio 1. Definir la función
todos :: ('a ⇒ bool) ⇒ 'a list ⇒ bool
tal que (todos p xs) se verifica si todos los elementos de la lista
xs cumplen la propiedad p. Por ejemplo, se verifica
todos (λx. 1<length x) [[2,1,4],[1,3]]
¬todos (λx. 1<length x) [[2,1,4],[3]]
Nota: La función todos es equivalente a la predefinida list_all.
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
fun todos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where
"todos p [] = True" | "todos p (x#xs) = (p x ∧ todos p xs)"
text {*
---------------------------------------------------------------------
Ejercicio 2. Definir la función
algunos :: ('a ⇒ bool) ⇒ 'a list ⇒ bool
tal que (algunos p xs) se verifica si algunos elementos de la lista
xs cumplen la propiedad p. Por ejemplo, se verifica
algunos (λx. 1<length x) [[2,1,4],[3]]
¬algunos (λx. 1<length x) [[],[3]]"
Nota: La función algunos es equivalente a la predefinida list_ex.
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
fun algunos :: "('a ⇒ bool) ⇒ 'a list ⇒ bool" where
"algunos p [] = False" | "algunos p (x#xs) = (p x ∨ algunos p xs)"
text {*
---------------------------------------------------------------------
Ejercicio 3.1. Demostrar o refutar automáticamente
todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)"
by (induct xs) auto
text {*
---------------------------------------------------------------------
Ejercicio 3.2. Demostrar o refutar detalladamente
todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
lemma "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)"
proof (induct xs)
show "todos (λx. P x ∧ Q x) [] = (todos P [] ∧ todos Q [])" by simp
next
fix xs
assume HI: "todos (λx. P x ∧ Q x) xs = (todos P xs ∧ todos Q xs)"
fix a
have "todos (λx. P x ∧ Q x) (a#xs) = ((P a ∧ Q a) ∧ todos (λx. P x ∧ Q x) xs) " by simp
also have "... = (P a ∧ Q a ∧ todos P xs ∧ todos Q xs)" using HI by simp
also have "... = ((P a ∧todos P xs)∧(Q a ∧ todos Q xs))" by arith
also have "... = (todos P (a#xs) ∧ (Q a ∧ todos Q xs))" by simp
also have "... = (todos P (a#xs) ∧ todos Q (a#xs))" by simp
finally show "todos (λx. P x ∧ Q x) (a#xs) = (todos P (a#xs) ∧ todos Q (a#xs))" by simp
qed
text {*
---------------------------------------------------------------------
Ejercicio 4.1. Demostrar o refutar automáticamente
todos P (x @ y) = (todos P x ∧ todos P y)
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
lemma "todos P (x @ y) = (todos P x ∧ todos P y)"
by (induct x) auto
text {*
---------------------------------------------------------------------
Ejercicio 4.2. Demostrar o refutar detalladamente
todos P (x @ y) = (todos P x ∧ todos P y)
---------------------------------------------------------------------
*}
lemma todos_append:
"todos P (x @ y) = (todos P x ∧ todos P y)"
(*Solución M.Cumplido*)
proof(induct x)
show "todos P ([] @ y) = (todos P [] ∧ todos P y)" by simp
next
fix x
assume HI: "todos P (x @ y) = (todos P x ∧ todos P y)"
fix a
have "todos P ((a#x) @ y) = todos P (a#(x@y))" by simp
also have "... = (P a ∧ todos P (x @ y))" by simp
also have "... = (P a ∧ todos P x ∧ todos P y)" using HI by simp
also have "... = (todos P (a#x) ∧ todos P y)" by simp
finally show "todos P ((a#x) @ y) = (todos P (a#x) ∧ todos P y)" by simp
qed
text {*
---------------------------------------------------------------------
Ejercicio 5.1. Demostrar o refutar automáticamente
todos P (rev xs) = todos P xs
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
lemma "todos P (rev xs) = todos P xs"
by (induct xs) (auto simp add: todos_append)
text {*
---------------------------------------------------------------------
Ejercicio 5.2. Demostrar o refutar detalladamente
todos P (rev xs) = todos P xs
---------------------------------------------------------------------
*}
(*Solución M.Cumplido*)
lemma "todos P (rev xs) = todos P xs"
proof(induct xs)
show "todos P (rev []) = todos P []" by simp
next
fix xs x
assume HI: "todos P (rev xs) = todos P xs"
have "todos P (rev (x#xs)) = todos P ((rev xs) @ [x])" by simp
also have "... = (todos P (rev xs) ∧ todos P [x])" by (rule todos_append)
also have "... = (todos P xs ∧ todos P [x])" using HI by simp
also have "... = (todos P [x] ∧ todos P xs)" by arith
also have "... = (P x ∧ todos P xs)" by simp
also have "... = todos P (x#xs)" by simp
finally show "todos P (rev (x#xs)) = todos P (x#xs)" by simp
qed
text {*
---------------------------------------------------------------------
Ejercicio 6. Demostrar o refutar:
algunos (λx. P x ∧ Q x) xs = (algunos P xs ∧ algunos Q xs)
---------------------------------------------------------------------
*}
lemma "algunos (λx. P x ∧ Q x) xs = (algunos P xs ∧ algunos Q xs)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 7.1. Demostrar o refutar automáticamente
algunos P (map f xs) = algunos (P ∘ f) xs
---------------------------------------------------------------------
*}
lemma "algunos P (map f xs) = algunos (P o f) xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 7.2. Demostrar o refutar datalladamente
algunos P (map f xs) = algunos (P ∘ f) xs
---------------------------------------------------------------------
*}
lemma "algunos P (map f xs) = algunos (P o f) xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 8.1. Demostrar o refutar automáticamente
algunos P (xs @ ys) = (algunos P xs ∨ algunos P ys)
---------------------------------------------------------------------
*}
lemma "algunos P (xs @ ys) = (algunos P xs ∨ algunos P ys)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 8.2. Demostrar o refutar detalladamente
algunos P (xs @ ys) = (algunos P xs ∨ algunos P ys)
---------------------------------------------------------------------
*}
lemma algunos_append:
"algunos P (xs @ ys) = (algunos P xs ∨ algunos P ys)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 9.1. Demostrar o refutar automáticamente
algunos P (rev xs) = algunos P xs
---------------------------------------------------------------------
*}
lemma "algunos P (rev xs) = algunos P xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 9.2. Demostrar o refutar detalladamente
algunos P (rev xs) = algunos P xs
---------------------------------------------------------------------
*}
lemma "algunos P (rev xs) = algunos P xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 10. Encontrar un término no trivial Z tal que sea cierta la
siguiente ecuación:
algunos (λx. P x ∨ Q x) xs = Z
y demostrar la equivalencia de forma automática y detallada.
---------------------------------------------------------------------
*}
text {*
---------------------------------------------------------------------
Ejercicio 11.1. Demostrar o refutar automáticamente
algunos P xs = (¬ todos (λx. (¬ P x)) xs)
---------------------------------------------------------------------
*}
lemma "algunos P xs = (¬ todos (λx. (¬ P x)) xs)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 11.2. Demostrar o refutar datalladamente
algunos P xs = (¬ todos (λx. (¬ P x)) xs)
---------------------------------------------------------------------
*}
lemma "algunos P xs = (¬ todos (λx. (¬ P x)) xs)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 12. Definir la funcion primitiva recursiva
estaEn :: 'a ⇒ 'a list ⇒ bool
tal que (estaEn x xs) se verifica si el elemento x está en la lista
xs. Por ejemplo,
estaEn (2::nat) [3,2,4] = True
estaEn (1::nat) [3,2,4] = False
---------------------------------------------------------------------
*}
fun estaEn :: "'a ⇒ 'a list ⇒ bool" where
"estaEn x xs = undefined"
text {*
---------------------------------------------------------------------
Ejercicio 13. Expresar la relación existente entre estaEn y algunos.
Demostrar dicha relación de forma automática y detallada.
---------------------------------------------------------------------
*}
text {*
---------------------------------------------------------------------
Ejercicio 14. Definir la función primitiva recursiva
sinDuplicados :: 'a list ⇒ bool
tal que (sinDuplicados xs) se verifica si la lista xs no contiene
duplicados. Por ejemplo,
sinDuplicados [1::nat,4,2] = True
sinDuplicados [1::nat,4,2,4] = False
---------------------------------------------------------------------
*}
fun sinDuplicados :: "'a list ⇒ bool" where
"sinDuplicados xs = undefined"
text {*
---------------------------------------------------------------------
Ejercicio 15. Definir la función primitiva recursiva
borraDuplicados :: 'a list ⇒ bool
tal que (borraDuplicados xs) es la lista obtenida eliminando los
elementos duplicados de la lista xs. Por ejemplo,
borraDuplicados [1::nat,2,4,2,3] = [1,4,2,3]
Nota: La función borraDuplicados es equivalente a la predefinida
remdups.
---------------------------------------------------------------------
*}
fun borraDuplicados :: "'a list ⇒ 'a list" where
"borraDuplicados xs = undefined"
text {*
---------------------------------------------------------------------
Ejercicio 16.1. Demostrar o refutar automáticamente
length (borraDuplicados xs) ≤ length xs
---------------------------------------------------------------------
*}
lemma length_borraDuplicados:
"length (borraDuplicados xs) ≤ length xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 16.2. Demostrar o refutar detalladamente
length (borraDuplicados xs) ≤ length xs
---------------------------------------------------------------------
*}
lemma length_borraDuplicados:
"length (borraDuplicados xs) ≤ length xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 17.1. Demostrar o refutar automáticamente
estaEn a (borraDuplicados xs) = estaEn a xs
---------------------------------------------------------------------
*}
lemma "estaEn a (borraDuplicados xs) = estaEn a xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 17.2. Demostrar o refutar detalladamente
estaEn a (borraDuplicados xs) = estaEn a xs
---------------------------------------------------------------------
*}
lemma estaEn_borraDuplicados:
"estaEn a (borraDuplicados xs) = estaEn a xs"
oops
text {*
---------------------------------------------------------------------
Ejercicio 18.1. Demostrar o refutar automáticamente
sinDuplicados (borraDuplicados xs)
---------------------------------------------------------------------
*}
lemma "sinDuplicados (borraDuplicados xs)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 18.2. Demostrar o refutar detalladamente
sinDuplicados (borraDuplicados xs)
---------------------------------------------------------------------
*}
lemma sinDuplicados_borraDuplicados:
"sinDuplicados (borraDuplicados xs)"
oops
text {*
---------------------------------------------------------------------
Ejercicio 19. Demostrar o refutar:
borraDuplicados (rev xs) = rev (borraDuplicados xs)
---------------------------------------------------------------------
*}
lemma "borraDuplicados (rev xs) = rev (borraDuplicados xs)"
oops
end