PrintForm Definitions action sets Sections AutomataTheory Doc

At: pump theorem 1 1 1 1 1 1 1 1 1 1 1 2 1 1 1 1 1 1 1 1 1 1 1
1. Alph: Type
2. S: ActionSet(Alph)
3. N:
4. s: S.car
5. f: S.carN
6. g: NS.car
7. g o f = Id
8. f o g = Id
9. A: Alph*
10. N < ||A||
11. i: ||A||
12. j: ||A||
13. i < j
14. f((S:A[||A||-i..||A||]s)) = f((S:A[||A||-j..||A||]s))
15. (S:A[||A||-i..||A||]s) = (S:A[||A||-j..||A||]s)
16. 0 = 0

(S:((A[0..||A||-j]) @ nil) @ (A[||A||-i..||A||])s) = (S:As)
By: RWH (LemmaC Thm* as:T*. (as @ nil) = as) 0
Generated subgoal:

1 (S:(A[0..||A||-j]) @ (A[||A||-i..||A||])s) = (S:As)

About:
equalnatural_numbersubtractniluniverse
functionlistless_thanapplyint