Journal of Formalized Mathematics
Volume 12, 2000
University of Bialystok
Copyright (c) 2000
Association of Mizar Users
The abstract of the Mizar article:
-
- by
- Adam Grabowski
- Received July 17, 2000
- MML identifier: HEYTING3
- [
Mizar article,
MML identifier index
]
environ
vocabulary ORDERS_1, FUNCT_1, MATRIX_2, FINSET_1, SQUARE_1, FINSEQ_1, BOOLE,
FUNCT_5, MCART_1, LATTICES, LATTICE3, RELAT_2, FINSUB_1, PARTFUN1,
HEYTING1, TARSKI, RELAT_1, SUBSTLAT, NORMFORM, BINOP_1, FILTER_1, CAT_1,
YELLOW_0, WELLORD1, HEYTING2, BHSP_3, HEYTING3;
notation TARSKI, XBOOLE_0, ZFMISC_1, SUBSET_1, NUMBERS, XCMPLX_0, XREAL_0,
RELAT_1, FUNCT_1, ORDERS_1, NAT_1, FINSEQ_1, BINOP_1, FINSET_1, FINSUB_1,
PARTFUN1, LATTICES, DOMAIN_1, STRUCT_0, SUBSTLAT, MCART_1, FUNCT_5,
WELLORD1, YELLOW_0, ABIAN, PRE_CIRC, LATTICE3, HEYTING2;
constructors NAT_1, SETWISEO, DOMAIN_1, ABIAN, INT_1, TOLER_1, PRE_CIRC,
WAYBEL_1, HEYTING1, HEYTING2, YELLOW_4;
clusters RELSET_1, LATTICES, FINSET_1, SUBSET_1, FINSUB_1, SUBSTLAT, PARTFUN1,
STRUCT_0, LATTICE3, ABIAN, NAT_1, YELLOW_1, YELLOW_3, BINARITH, FINSEQ_1,
YELLOW_0, XREAL_0, MEMBERED, PRE_CIRC, ORDINAL2;
requirements SUBSET, BOOLE, NUMERALS, REAL, ARITHM;
begin :: Preliminaries
scheme SSubsetUniq { R() -> RelStr, P[set] } :
for A1, A2 being Subset of R() st
(for x being set holds x in A1 iff P[x]) &
(for x being set holds x in A2 iff P[x]) holds
A1 = A2;
definition let A, x be set;
cluster [:A, {x}:] -> Function-like;
end;
theorem :: HEYTING3:1
for n being odd Nat holds 1 <= n;
theorem :: HEYTING3:2
for X being finite non empty Subset of NAT holds max X in X;
theorem :: HEYTING3:3
for X being finite non empty Subset of NAT holds
ex n being Nat st X c= Seg n \/ {0};
theorem :: HEYTING3:4
for X being finite Subset of NAT holds
ex k being odd Nat st not k in X;
theorem :: HEYTING3:5
for k being Nat,
X being finite non empty Subset of [:NAT,{k}:] holds
ex n being non empty Nat st X c= [:Seg n \/ {0},{k}:];
theorem :: HEYTING3:6
for m being Nat,
X being finite non empty Subset of [:NAT,{m}:] holds
ex k being non empty Nat st not [2*k+1,m] in X;
theorem :: HEYTING3:7
for m being Nat,
X being finite Subset of [:NAT,{m}:]
ex k being Nat st
for l being Nat st l >= k holds not [l,m] in X;
theorem :: HEYTING3:8
for L being upper-bounded Lattice holds Top L = Top LattPOSet L;
theorem :: HEYTING3:9
for L being lower-bounded Lattice holds Bottom L = Bottom LattPOSet L;
begin :: Poset of Substitutions
canceled;
theorem :: HEYTING3:11
for V being set, C being finite set,
A, B being Element of Fin PFuncs (V, C) st A = {} & B <> {} holds
B =>> A = {};
theorem :: HEYTING3:12
for V, V', C, C' being set st V c= V' & C c= C' holds
SubstitutionSet (V, C) c= SubstitutionSet (V', C');
theorem :: HEYTING3:13
for V, V', C, C' being set,
A being Element of Fin PFuncs (V, C),
B being Element of Fin PFuncs (V', C') st V c= V' & C c= C' & A = B
holds mi A = mi B;
theorem :: HEYTING3:14
for V, V', C, C' being set st V c= V' & C c= C' holds
the L_join of SubstLatt (V, C) = (the L_join of SubstLatt (V', C'))
| [:the carrier of SubstLatt (V, C), the carrier of SubstLatt (V, C):];
definition let V, C be set;
func SubstPoset (V, C) -> RelStr equals
:: HEYTING3:def 1
LattPOSet SubstLatt (V, C);
end;
definition let V, C be set;
cluster SubstPoset (V, C) -> with_suprema with_infima;
end;
definition let V, C be set;
cluster SubstPoset (V, C) -> reflexive antisymmetric transitive;
end;
theorem :: HEYTING3:15
for V, C being set,
a, b being Element of SubstPoset (V, C) holds
a <= b iff for x being set st x in a ex y being set st y in b & y c= x;
theorem :: HEYTING3:16
for V, V', C, C' being set st V c= V' & C c= C' holds
SubstPoset (V, C) is full SubRelStr of SubstPoset (V', C');
definition let n, k be Nat;
func PFArt (n, k) -> Element of PFuncs (NAT, {k}) means
:: HEYTING3:def 2
for x being set holds x in it iff
( ex m being odd Nat st m <= 2*n & [m,k] = x ) or [2*n,k] = x;
end;
definition let n, k be Nat;
cluster PFArt (n, k) -> finite;
end;
definition let n, k be Nat;
func PFCrt (n, k) -> Element of PFuncs (NAT, {k}) means
:: HEYTING3:def 3
for x being set holds x in it iff
( ex m being odd Nat st m <= 2*n + 1 & [m,k] = x );
end;
definition let n,k be Nat;
cluster PFCrt (n,k) -> finite;
end;
theorem :: HEYTING3:17
for n, k being Nat holds [2*n+1,k] in PFCrt (n,k);
theorem :: HEYTING3:18
for n, k being Nat holds PFCrt (n,k) misses {[2*n+3,k]};
theorem :: HEYTING3:19
for n, k being Nat holds PFCrt (n+1,k) = PFCrt (n,k) \/ {[2*n+3,k]};
theorem :: HEYTING3:20
for n, k being Nat holds PFCrt (n,k) c< PFCrt (n+1,k);
definition let n, k be Nat;
cluster PFArt (n, k) -> non empty;
end;
theorem :: HEYTING3:21
for n, m, k being Nat holds not PFArt (n, m) c= PFCrt (k, m);
theorem :: HEYTING3:22
for n, m, k being Nat st n <= k holds PFCrt (n,m) c= PFCrt (k,m);
theorem :: HEYTING3:23
for n being Nat holds PFArt (1,n) = { [1,n], [2,n] };
definition let n, k be Nat;
func PFBrt (n,k) -> Element of Fin PFuncs (NAT, {k}) means
:: HEYTING3:def 4
for x being set holds x in it iff
( ex m being non empty Nat st m <= n & x = PFArt (m,k) ) or
x = PFCrt (n,k);
end;
theorem :: HEYTING3:24
for n, k being Nat,
x being set st x in PFBrt (n+1,k) holds
ex y being set st y in PFBrt (n,k) & y c= x;
theorem :: HEYTING3:25
for n, k being Nat holds
not PFCrt (n,k) in PFBrt (n+1,k);
theorem :: HEYTING3:26
for n, m, k being Nat st PFArt (n,m) c= PFArt (k,m) holds n = k;
theorem :: HEYTING3:27
for n, m, k being Nat holds
PFCrt (n,m) c= PFArt (k,m) iff n < k;
begin :: Uncompleteness
theorem :: HEYTING3:28
for n, k being Nat holds PFBrt (n,k) is Element of SubstPoset (NAT, {k});
definition let k be Nat;
func PFDrt k -> Subset of SubstPoset (NAT, {k}) means
:: HEYTING3:def 5
for x being set holds x in it iff ex n being non empty Nat st
x = PFBrt (n,k);
end;
theorem :: HEYTING3:29
for k being Nat holds PFBrt (1,k) = { PFArt (1,k), PFCrt (1,k) };
theorem :: HEYTING3:30
for k being Nat holds PFBrt (1,k) <> {{}};
definition let k be Nat;
cluster PFBrt (1,k) -> non empty;
end;
theorem :: HEYTING3:31
for n, k being Nat holds { PFArt (n,k) } is Element of SubstPoset (NAT, {k});
theorem :: HEYTING3:32
for k being Nat,
V, X being set,
a being Element of SubstPoset (V, {k}) st X in a holds
X is finite Subset of [:V, {k}:];
theorem :: HEYTING3:33
for m being Nat,
a being Element of SubstPoset (NAT, {m}) st PFDrt m is_>=_than a holds
for X being non empty set st X in a holds
not ( for n being Nat st [n,m] in X holds n is odd );
theorem :: HEYTING3:34
for k being Nat,
a, b being Element of SubstPoset (NAT, {k}),
X being Subset of SubstPoset (NAT, {k}) st
a is_<=_than X & b is_<=_than X holds a "\/" b is_<=_than X;
definition let k be Nat;
cluster non empty Element of SubstPoset (NAT, {k});
end;
theorem :: HEYTING3:35
for n being Nat,
a being Element of SubstPoset (NAT, {n}) st {} in a holds a = {{}};
theorem :: HEYTING3:36
for k being Nat,
a being non empty Element of SubstPoset (NAT, {k}) st a <> {{}}
ex f being finite Function st f in a & f <> {};
theorem :: HEYTING3:37
for k being Nat,
a being non empty Element of SubstPoset (NAT, {k}),
a' being Element of Fin PFuncs (NAT, {k}) st a <> {{}} & a = a' holds
Involved a' is finite non empty Subset of NAT;
theorem :: HEYTING3:38
for k being Nat,
a being Element of SubstPoset (NAT, {k}),
a' being Element of Fin PFuncs (NAT, {k}),
B being finite non empty Subset of NAT st
B = Involved a' & a' = a holds for X being set st X in a
for l being Nat st l > max B + 1 holds not [l,k] in X;
theorem :: HEYTING3:39
for k being Nat holds Top SubstPoset (NAT, {k}) = {{}};
theorem :: HEYTING3:40
for k being Nat holds Bottom SubstPoset (NAT, {k}) = {};
theorem :: HEYTING3:41
for k being Nat, a, b being Element of SubstPoset (NAT, {k}) st
a <= b & a = {{}} holds b = {{}};
theorem :: HEYTING3:42
for k being Nat, a, b being Element of SubstPoset (NAT, {k}) st
a <= b & b = {} holds a = {};
theorem :: HEYTING3:43
for m being Nat,
a being Element of SubstPoset (NAT, {m}) st
PFDrt m is_>=_than a holds a <> {{}};
definition let m be Nat;
cluster SubstPoset (NAT, {m}) -> non complete;
end;
definition let m be Nat;
cluster SubstLatt (NAT, {m}) -> non complete;
end;
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