| author | nipkow |
| Fri, 07 Feb 2003 16:40:23 +0100 | |
| changeset 13810 | c3fbfd472365 |
| parent 12018 | ec054019c910 |
| child 15082 | 6c3276a2735b |
| permissions | -rw-r--r-- |
| 10751 | 1 |
(* Title : SEQ.thy |
2 |
Author : Jacques D. Fleuriot |
|
3 |
Copyright : 1998 University of Cambridge |
|
4 |
Description : Convergence of sequences and series |
|
5 |
*) |
|
6 |
||
7 |
SEQ = NatStar + HyperPow + |
|
8 |
||
9 |
constdefs |
|
10 |
||
11 |
(* Standard definition of convergence of sequence *) |
|
12 |
LIMSEQ :: [nat=>real,real] => bool ("((_)/ ----> (_))" [60, 60] 60)
|
|
|
12018
ec054019c910
Numerals and simprocs for types real and hypreal. The abstract
paulson
parents:
11701
diff
changeset
|
13 |
"X ----> L == (ALL r. 0 < r --> (EX no. ALL n. no <= n --> abs (X n + -L) < r))" |
| 10751 | 14 |
|
15 |
(* Nonstandard definition of convergence of sequence *) |
|
16 |
NSLIMSEQ :: [nat=>real,real] => bool ("((_)/ ----NS> (_))" [60, 60] 60)
|
|
| 13810 | 17 |
"X ----NS> L == (ALL N: HNatInfinite. ( *fNat* X) N @= hypreal_of_real L)" |
| 10751 | 18 |
|
19 |
(* define value of limit using choice operator*) |
|
20 |
lim :: (nat => real) => real |
|
21 |
"lim X == (@L. (X ----> L))" |
|
22 |
||
23 |
nslim :: (nat => real) => real |
|
24 |
"nslim X == (@L. (X ----NS> L))" |
|
25 |
||
26 |
(* Standard definition of convergence *) |
|
27 |
convergent :: (nat => real) => bool |
|
28 |
"convergent X == (EX L. (X ----> L))" |
|
29 |
||
30 |
(* Nonstandard definition of convergence *) |
|
31 |
NSconvergent :: (nat => real) => bool |
|
32 |
"NSconvergent X == (EX L. (X ----NS> L))" |
|
33 |
||
34 |
(* Standard definition for bounded sequence *) |
|
35 |
Bseq :: (nat => real) => bool |
|
|
12018
ec054019c910
Numerals and simprocs for types real and hypreal. The abstract
paulson
parents:
11701
diff
changeset
|
36 |
"Bseq X == (EX K. (0 < K & (ALL n. abs(X n) <= K)))" |
| 10751 | 37 |
|
38 |
(* Nonstandard definition for bounded sequence *) |
|
39 |
NSBseq :: (nat=>real) => bool |
|
| 13810 | 40 |
"NSBseq X == (ALL N: HNatInfinite. ( *fNat* X) N : HFinite)" |
| 10751 | 41 |
|
42 |
(* Definition for monotonicity *) |
|
43 |
monoseq :: (nat=>real)=>bool |
|
44 |
"monoseq X == ((ALL (m::nat) n. m <= n --> X m <= X n) | |
|
45 |
(ALL m n. m <= n --> X n <= X m))" |
|
46 |
||
47 |
(* Definition of subsequence *) |
|
48 |
subseq :: (nat => nat) => bool |
|
49 |
"subseq f == (ALL m n. m < n --> (f m) < (f n))" |
|
50 |
||
51 |
(** Cauchy condition **) |
|
52 |
||
53 |
(* Standard definition *) |
|
54 |
Cauchy :: (nat => real) => bool |
|
|
12018
ec054019c910
Numerals and simprocs for types real and hypreal. The abstract
paulson
parents:
11701
diff
changeset
|
55 |
"Cauchy X == (ALL e. (0 < e --> |
| 10751 | 56 |
(EX M. (ALL m n. M <= m & M <= n |
57 |
--> abs((X m) + -(X n)) < e))))" |
|
58 |
||
59 |
NSCauchy :: (nat => real) => bool |
|
60 |
"NSCauchy X == (ALL M: HNatInfinite. ALL N: HNatInfinite. |
|
| 13810 | 61 |
( *fNat* X) M @= ( *fNat* X) N)" |
| 10751 | 62 |
end |
63 |