:: Valuation Theory, Part {I}
:: by Grzegorz Bancerek , Hidetsune Kobayashi and Artur Korni{\l}owicz
::
:: Received April 7, 2011
:: Copyright (c) 2011 Association of Mizar Users
:: (Stowarzyszenie Uzytkownikow Mizara, Bialystok, Poland).
:: This code can be distributed under the GNU General Public Licence
:: version 3.0 or later, or the Creative Commons Attribution-ShareAlike
:: License version 3.0 or later, subject to the binding interpretation
:: detailed in file COPYING.interpretation.
:: See COPYING.GPL and COPYING.CC-BY-SA for the full text of these
:: licenses, or see http://www.gnu.org/licenses/gpl.html and
:: http://creativecommons.org/licenses/by-sa/3.0/.
environ
vocabularies INT_1, VECTSP_1, FUNCT_1, ARYTM_3, ZFMISC_1, RELAT_1, RLVECT_1,
FUNCOP_1, ARYTM_1, BINOP_1, FUNCSDOM, REALSET1, LATTICES, GROUP_1,
ORDINAL2, IDEAL_1, FINSEQ_1, SUBSET_1, VECTSP_2, FUNCT_3, NUMBERS,
GROUP_4, STRUCT_0, RLSUB_1, XXREAL_2, ALGSTR_0, XCMPLX_0, ORDINAL1,
REALSET2, NAT_1, REAL_1, INT_2, XXREAL_0, TARSKI, XREAL_0, XBOOLE_0,
NEWTON, CARD_FIL, RMOD_2, CARD_1, SUPINF_2, MESFUNC1, PARTFUN1, COMPLEX1,
MEMBERED, MSSUBFAM, FVALUAT1;
notations TARSKI, XBOOLE_0, ZFMISC_1, SUBSET_1, NUMBERS, ORDINAL1, DOMAIN_1,
RELAT_1, FUNCT_1, RELSET_1, PARTFUN1, FUNCT_2, FUNCOP_1, XXREAL_0,
XREAL_0, XXREAL_2, XXREAL_3, XCMPLX_0, REAL_1, INT_1, MEMBERED, SUPINF_2,
EXTREAL1, INT_2, NAT_1, MESFUNC1, FINSEQ_1, FINSEQ_4, REALSET1, BINOP_1,
STRUCT_0, ALGSTR_0, RLVECT_1, GRCAT_1, GROUP_1, YELLOW_9, VECTSP_1,
VECTSP_2, FUNCSDOM, REALSET2, RMOD_2, IDEAL_1, RING_1;
constructors REAL_1, FINSEQ_4, SUPINF_2, EXTREAL1, MESFUNC1, RMOD_2, YELLOW_9,
RING_1, BINOM, FUNCOP_1, REALSET2, RELSET_1, GRCAT_1;
registrations RELSET_1, VECTSP_1, INT_1, XREAL_0, ALGSTR_1, VECTSP_2,
STRUCT_0, NAT_1, SUBSET_1, WAYBEL_2, XBOOLE_0, RMOD_2, XCMPLX_0, IDEAL_1,
RING_1, XXREAL_0, NUMBERS, MEMBERED, ORDINAL1, ALGSTR_0, XXREAL_3,
REALSET2, FINSEQ_1;
requirements NUMERALS, ARITHM, REAL, BOOLE, SUBSET;
definitions TARSKI, XBOOLE_0, SUBSET_1, FUNCT_2, BINOP_1, XXREAL_0, XREAL_0,
XCMPLX_0, XXREAL_2, XXREAL_3, REALSET1, RING_1, MESFUNC1, STRUCT_0,
ALGSTR_0, RLVECT_1, GROUP_1, GRCAT_1, VECTSP_1, VECTSP_2, IDEAL_1,
RMOD_2;
theorems VECTSP_1, FUNCOP_1, TARSKI, FUNCT_1, INT_1, RLVECT_1, XREAL_0,
VECTSP_2, XBOOLE_0, FUNCT_2, ABSVALUE, NAT_1, ZFMISC_1, REALSET1,
FINSEQ_1, FINSEQ_3, XBOOLE_1, TOPREALA, FINSEQ_5, GROUP_1, IDEAL_1,
RMOD_2, YELLOW_9, RELAT_1, RING_1, XXREAL_0, ORDINAL1, XXREAL_3,
PARTFUN1, ALGSTR_0, XXREAL_2, SUBSET_1, CARD_1;
schemes NAT_1, INT_1, RECDEF_1, FUNCT_2;
begin :: Extended reals
reserve x, y, z, s for ext-real number;
reserve i, j for Integer;
reserve n, m for Nat;
theorem Th1:
x = -x implies x = 0
proof
per cases by XXREAL_0:14;
suppose x = +infty or x = -infty;
hence thesis;
end;
suppose x in REAL;
then reconsider y = x as Element of REAL;
-x = -y by XXREAL_3:def 3;
hence thesis;
end;
end;
theorem Th2:
x + x = 0 implies x = 0
proof
assume x + x = 0;
then x = -x by XXREAL_3:8;
hence thesis by Th1;
end;
theorem Th3:
0 <= x & x <= y & 0 <= s & s <= z implies x*s <= y*z
proof
assume that
A1: 0 <= x and
A2: x <= y and
A3: 0 <= s and
A4: s <= z;
A5: x*s <= y*s by A2,A3,XXREAL_3:71;
y*s <= y*z by A1,A2,A4,XXREAL_3:71;
hence thesis by A5,XXREAL_0:2;
end;
Lm1: now
let a,b be real number, c,d be ext-real number;
assume
A1: a = c & b = d;
then -b = -d by XXREAL_3:def 3;
hence a-b = c-d by A1,XXREAL_3:def 2;
end;
Lm2: now
let a,b be real number, c,d be ext-real number;
assume
A1: a = c & b = d;
then b" = d" by XXREAL_3:def 6;
hence a/b = c/d by A1,XXREAL_3:def 5;
end;
theorem
y <> +infty & 0 < x & 0 < y implies 0 < x / y
proof
assume that
A1: y <> +infty and
A2: 0 < x and
A3: 0 < y;
per cases by XXREAL_0:14;
suppose x in REAL;
then reconsider x1 = x as Real;
reconsider y1 = y as Real by A1,A3,XXREAL_0:14;
x/y = x1/y1 by Lm2;
hence thesis by A2,A3;
end;
suppose x = +infty;
hence thesis by A1,A3,XXREAL_3:83;
end;
suppose x = -infty;
hence thesis by A2;
end;
end;
theorem Th5:
y <> +infty & x < 0 & 0 < y implies x / y < 0
proof
assume that
A1: y <> +infty and
A2: x < 0 and
A3: 0 < y;
reconsider y1 = y as Real by A3,A1,XXREAL_0:14;
per cases by XXREAL_0:14;
suppose x in REAL;
then reconsider x1 = x as Real;
x/y = x1/y1 by Lm2;
hence thesis by A2,A3;
end;
suppose x = +infty;
hence thesis by A2;
end;
suppose x = -infty;
hence thesis by A1,A3,XXREAL_3:86;
end;
end;
theorem
y <> -infty & 0 < x & y < 0 implies x / y < 0
proof
assume that
A1: y <> -infty and
A2: 0 < x and
A3: y < 0;
reconsider y1 = y as Real by A1,A3,XXREAL_0:14;
per cases by XXREAL_0:14;
suppose x in REAL;
then reconsider x1 = x as Real;
x/y = x1/y1 by Lm2;
hence thesis by A2,A3;
end;
suppose x = +infty;
hence thesis by A1,A3,XXREAL_3:85;
end;
suppose x = -infty;
hence thesis by A2;
end;
end;
theorem Th7:
x in REAL & y in REAL or z in REAL implies
(x + y) / z = x/z + y/z
proof
assume
A1: x in REAL & y in REAL or z in REAL;
per cases by A1;
suppose x in REAL & y in REAL;
then reconsider x1 = x, y1 = y as Real;
per cases by XXREAL_0:14;
suppose z in REAL;
hence thesis by XXREAL_3:95;
end;
suppose
A2: z = +infty or z = -infty;
thus (x + y) / z = 0+0 by A2
.= x/z + y/z by A2;
end;
end;
suppose z in REAL;
hence thesis by XXREAL_3:95;
end;
end;
theorem Th8:
y <> +infty & y <> -infty & y <> 0 implies x / y * y = x
proof
assume that
A1: y <> +infty & y <> -infty and
A2: y <> 0;
thus x / y * y = x * (1 / y) * y by XXREAL_3:81
.= x * ((1 / y) * y) by XXREAL_3:66
.= x * 1 by A1,A2,XXREAL_3:87
.= x by XXREAL_3:81;
end;
theorem Th9:
y <> -infty & y <> +infty & x <> 0 & y <> 0 implies x / y <> 0
proof
assume that
A1: y <> -infty & y <> +infty and
A2: x <> 0 and
A3: y <> 0;
assume x / y = 0;
then y" = 0 by A2;
hence thesis by A1,A3,XXREAL_3:82;
end;
definition let x be number;
attr x is ext-integer means
:Def1: x is integer or x = +infty;
end;
registration
cluster ext-integer -> ext-real for number;
coherence
proof
let x be number;
assume x is integer or x = +infty;
hence thesis;
end;
end;
registration
cluster +infty -> ext-integer;
coherence by Def1;
cluster -infty -> non ext-integer;
coherence
proof
thus not -infty is integer & -infty <> +infty;
end;
cluster 1. -> ext-integer positive real;
coherence by Def1;
cluster integer -> ext-integer for number;
coherence by Def1;
cluster real ext-integer -> integer for number;
coherence
proof
let x be number;
assume x in REAL & (x is integer or x = +infty);
hence thesis;
end;
end;
registration
cluster real ext-integer positive for Element of ExtREAL;
existence
proof
take 1.;
thus thesis;
end;
cluster positive for ext-integer number;
existence
proof
take +infty;
thus thesis;
end;
end;
definition
mode ExtInt is ext-integer number;
end;
reserve x, y, v, u for ExtInt;
theorem Th11:
x < y implies x + 1 <= y
proof
assume
A1: x < y;
per cases;
suppose
x in REAL & y in REAL;
then reconsider x1 = x, y1 = y as Real;
ex p, q being Real st p = x+1. & q = y & p <= q
proof
take x1+1, y1;
thus x1+1 = x+1. by XXREAL_3:def 2;
thus y1 = y;
thus x1+1 <= y1 by A1,INT_1:7;
end;
hence thesis;
end;
suppose not x in REAL or not y in REAL;
then x = +infty or x = -infty or y = +infty or y = -infty by XXREAL_0:14;
hence thesis by A1,XXREAL_0:3;
end;
end;
theorem
-infty < x
proof
x is Integer or x = +infty by Def1;
then x in REAL or x = +infty by XREAL_0:def 1;
hence thesis by XXREAL_0:12;
end;
definition
let X be ext-real-membered set;
given i0 being positive ExtInt such that
A1: i0 in X;
func least-positive(X) -> positive ExtInt means
:Def4:
it in X &
for i being positive ExtInt st i in X holds it <= i;
existence
proof
defpred P[Integer] means $1 in X & $1 is positive;
per cases;
suppose ex i being positive Integer st i in X; then
A2: ex i being Integer st P[i];
A3: for i being Integer st P[i] holds 0 <= i;
consider j0 being Integer such that
A4: P[j0] and
A5: for i being Integer st P[i] holds j0 <= i from INT_1:sch 5(A3,A2);
reconsider j = j0 as positive ExtInt by A4;
take j;
thus j in X by A4;
let i be positive ExtInt;
assume
A6: i in X;
per cases;
suppose i is Integer;
then reconsider i1 = i as Integer;
j0 <= i1 by A6,A5;
hence j <= i;
end;
suppose i is not Integer; then
i = +infty by Def1;
hence thesis by XXREAL_0:3;
end;
end;
suppose
A7: not ex i being positive Integer st i in X;
take i0;
thus i0 in X by A1;
let i be positive ExtInt;
assume i in X; then
i is not positive Integer & +infty <= +infty by A7; then
i = +infty by Def1;
hence i0 <= i by XXREAL_0:3;
end;
end;
uniqueness
proof
let a, b be positive ExtInt;
assume a in X & (for i being positive ExtInt st i in X holds a <= i) &
b in X & for i being positive ExtInt st i in X holds b <= i;
then a <= b & b <= a;
hence thesis by XXREAL_0:1;
end;
end;
definition let f be Relation;
attr f is e.i.-valued means
:Def5:
for x being set st x in rng f holds x is ext-integer;
end;
registration
cluster e.i.-valued for Function;
existence
proof
take f = 0 --> 0.;
let x be set;
rng f c= {0} by FUNCOP_1:13;
hence thesis;
end;
end;
registration
let A be set;
cluster e.i.-valued for Function of A, ExtREAL;
existence
proof
take f = A --> 0.;
let x be set;
rng f c= {0} by FUNCOP_1:13;
hence thesis;
end;
end;
registration
let f be e.i.-valued Function, x be set;
cluster f.x -> ext-integer;
coherence
proof
per cases;
suppose x in dom f;
then f.x in rng f by FUNCT_1:def 3;
hence thesis by Def5;
end;
suppose not x in dom f;
hence thesis by FUNCT_1:def 2;
end;
end;
end;
begin :: Structures
theorem Th13:
for K being distributive left_unital add-associative right_zeroed
right_complementable non empty doubleLoopStr holds
(-1.K) * (-1.K) = 1.K
proof
let K be distributive left_unital add-associative right_zeroed
right_complementable non empty doubleLoopStr;
thus (-1.K) * (-1.K) = 1.K * 1.K by VECTSP_1:10
.= 1.K by VECTSP_1:def 8;
end;
definition
let K be non empty doubleLoopStr;
let S be Subset of K;
let n be Nat;
func S |^ n -> Subset of K means
:Def6:
it = the carrier of K if n = 0 otherwise
ex f being FinSequence of bool the carrier of K st
it = f.len f & len f = n & f.1 = S &
for i being Nat st i in dom f & i+1 in dom f holds
f.(i+1) = S *' (f/.i);
consistency;
existence
proof
hereby
assume n = 0;
take A = [#]K;
thus A = the carrier of K;
end;
assume
A1: n <> 0;
set D = bool the carrier of K;
reconsider n1 = n as Element of NAT by ORDINAL1:def 12;
defpred P[set,set,set] means
ex A being Subset of K st A = $2 & $3 = S *' A;
A2: for i being Element of NAT st 1 <= i & i < n1
for x being Element of D ex y being Element of D st P[i,x,y]
proof
let i be Element of NAT such that 1 <= i & i < n1;
let x be Element of D;
take S *' x;
thus thesis;
end;
consider f being FinSequence of D such that
A3: len f = n1 and
A4: f.1 = S or n1 = 0 and
A5: for i being Element of NAT st 1 <= i & i < n1 holds P[i,f.i,f.(i+1)]
from RECDEF_1:sch 4(A2);
take f/.len f, f;
len f in dom f by A1,A3,CARD_1:27,FINSEQ_5:6;
hence f/.len f = f.len f by PARTFUN1:def 6;
thus len f = n by A3;
thus f.1 = S by A1,A4;
let i be Nat such that
A6: i in dom f;
assume i+1 in dom f;
then i+1 <= n1 by A3,FINSEQ_3:25;
then
A7: i < n1 by NAT_1:13;
A8: i is Element of NAT by ORDINAL1:def 12;
1 <= i by A6,FINSEQ_3:25;
then P[i,f.i,f.(i+1)] by A5,A8,A7;
hence thesis by A6,PARTFUN1:def 6;
end;
uniqueness
proof
let S1, S2 be Subset of K;
thus n = 0 & S1 = the carrier of K & S2 = the carrier of K
implies S1 = S2;
assume n <> 0;
given f being FinSequence of bool the carrier of K such that
A9: S1 = f.len f and
A10: len f = n and
A11: f.1 = S and
A12: for i being Nat st i in dom f & i+1 in dom f holds
f.(i+1) = S *' (f/.i);
given g being FinSequence of bool the carrier of K such that
A13: S2 = g.len g and
A14: len g = n and
A15: g.1 = S and
A16: for i being Nat st i in dom g & i+1 in dom g holds
g.(i+1) = S *' (g/.i);
A17: dom f = dom g by A10,A14,FINSEQ_3:29;
for k being Nat st k in dom f holds f.k = g.k
proof
let k be Nat;
defpred P[Nat] means $1 in dom f implies f.$1 = g.$1;
A18: P[0] by FINSEQ_3:24;
A19: for a being Nat st P[a] holds P[a+1]
proof
let a be Nat such that
A20: P[a] and
A21: a+1 in dom f;
per cases;
suppose
A22: a in dom f;
then
A23: f/.a = f.a by PARTFUN1:def 6
.= g/.a by A17,A20,A22,PARTFUN1:def 6;
thus f.(a+1) = S *' (f/.a) by A12,A21,A22
.= g.(a+1) by A16,A17,A21,A22,A23;
end;
suppose not a in dom f;
then a = 0 by A21,TOPREALA:2;
hence thesis by A11,A15;
end;
end;
for a being Nat holds P[a] from NAT_1:sch 2(A18,A19);
hence thesis;
end;
hence S1 = S2 by A9,A13,A10,A14,A17,FINSEQ_1:13;
end;
end;
reserve
D for non empty doubleLoopStr,
A for Subset of D;
theorem
A |^ 1 = A
proof
set f = <*A*>;
A1: len f = 1 & f.1 = A by FINSEQ_1:40;
now
let i be Nat such that
A2: i in dom f & i+1 in dom f;
dom f = {1} by FINSEQ_1:2,38;
then i = 1 & i+1 = 1 by A2,TARSKI:def 1;
hence f.(i+1) = A *' (f/.i);
end;
hence thesis by A1,Def6;
end;
theorem
A |^ 2 = A *' A
proof
set f = <*A,A*'A*>;
A1: len f = 2 by FINSEQ_1:44;
A2: f.1 = A by FINSEQ_1:44;
A3: f.2 = A*'A by FINSEQ_1:44;
now
let i be Nat such that
A4: i in dom f and
A5: i+1 in dom f;
dom f = {1,2} by FINSEQ_1:2,89;
then (i = 1 or i = 2) & (i+1 = 1 or i+1 = 2) by A4,A5,TARSKI:def 2;
hence f.(i+1) = A *' (f/.i) by A2,A3,A4,PARTFUN1:def 6;
end;
hence thesis by A1,A2,A3,Def6;
end;
registration
let R be Ring;
let S be Ideal of R;
let n be Nat;
cluster S|^n -> non empty add-closed left-ideal right-ideal;
coherence
proof
per cases by NAT_1:6;
suppose
A1: n = 0;
A2: S|^0 = the carrier of R by Def6;
thus S|^n is non empty by A1,Def6;
thus S|^n is add-closed
proof
let x, y be Element of R;
thus thesis by A2,A1;
end;
thus S|^n is left-ideal
proof
let p, x be Element of R;
thus thesis by A2,A1;
end;
let p, x be Element of R;
thus thesis by A2,A1;
end;
suppose
A3: ex k being Nat st n = k + 1;
then consider f being FinSequence of bool the carrier of R such that
A4: S|^n = f.len f & len f = n & f.1 = S and
A5: for i being Nat st i in dom f & i+1 in dom f holds
f.(i+1) = S *' (f/.i) by Def6;
defpred P[Nat] means
$1 in dom f implies f.$1 is Ideal of R;
A6: P[0] by FINSEQ_3:24;
A7: for m st P[m] holds P[m+1]
proof
let m;
assume that
A8: P[m] and
A9: m+1 in dom f;
per cases by A9,TOPREALA:2;
suppose m = 0;
hence thesis by A4;
end;
suppose
A10: m in dom f;
then
A11: f/.m = f.m by PARTFUN1:def 6;
f.(m+1) = S*'(f/.m) by A5,A9,A10;
hence thesis by A10,A8,A11;
end;
end;
A12: for m holds P[m] from NAT_1:sch 2(A6,A7);
0+1 <= len f by A3,A4,NAT_1:13;
then len f in dom f by FINSEQ_3:25;
hence thesis by A4,A12;
end;
end;
end;
definition
let G be non empty doubleLoopStr,
g be Element of G,
i be Integer;
func g |^ i -> Element of G equals :Def7:
power(G).(g,abs(i)) if 0 <= i
otherwise (power(G).(g,abs(i)))";
correctness;
end;
definition
let G be non empty doubleLoopStr,
g be Element of G,
n be Nat;
redefine func g |^ n equals
power(G).(g,n);
compatibility
proof let g be Element of G;
abs(n) = n by ABSVALUE:def 1;
hence thesis by Def7;
end;
end;
reserve K for Field-like non degenerated
associative add-associative right_zeroed right_complementable
distributive Abelian non empty doubleLoopStr,
a, b, c for Element of K;
Lm4: a |^ (n + 1) = a |^ n * a
proof
reconsider n1 = n as Element of NAT by ORDINAL1:def 12;
thus a |^ (n + 1) = (power(K).(a,n1)) * a by GROUP_1:def 7
.= a |^ n * a;
end;
theorem
a |^ (n + m) = (a |^ n) * (a |^ m)
proof
defpred P[Nat] means
for n holds a |^ (n + $1) = (a |^ n) * (a |^ $1);
A1: P[0] proof let n;
thus a |^ (n + 0) = a |^ n * 1_K by VECTSP_1:def 4
.= a |^ n * (a |^ 0) by GROUP_1:def 7;
end;
A2: for m st P[m] holds P[m+1]
proof let m;
assume
A3: for n holds a |^ (n + m) = a |^ n * (a |^ m);
let n;
thus a |^ (n + (m + 1)) = a |^ (n + m + 1)
.= a |^ (n + m) * a by Lm4
.= a |^ n * (a |^ m) * a by A3
.= a |^ n * (a |^ m * a) by GROUP_1:def 3
.= a |^ n * (a |^ (m + 1)) by Lm4;
end;
for m holds P[m] from NAT_1:sch 2(A1,A2);
hence thesis;
end;
Lm5: a <> 0.K implies a|^n <> 0.K
proof
assume
A1: a <> 0.K;
defpred P[Nat] means a|^$1 <> 0.K;
a|^0 = 1_K by GROUP_1:def 7;
then
A2: P[0];
A3: for n holds P[n] implies P[n+1]
proof
let n;
assume
A4: P[n];
a|^(n+1) = a|^n*a by Lm4;
hence a|^(n+1) <> 0.K by A4,A1,VECTSP_1:12;
end;
for n holds P[n] from NAT_1:sch 2(A2,A3);
hence thesis;
end;
theorem Th17:
a <> 0.K implies a|^i <> 0.K
proof
assume
A1: a <> 0.K;
per cases;
suppose 0 <= i;
then reconsider n1 = i as Element of NAT by INT_1:3;
a |^ i = a |^ n1;
hence a |^ i <> 0.K by A1,Lm5;
end;
suppose
A2: i < 0;
then reconsider n1 = -i as Element of NAT by INT_1:3;
A3: a |^ i = (power(K).(a,abs(i)))" by A2,Def7
.= (a |^ n1)" by A2,ABSVALUE:def 1;
a |^ n1 <> 0.K by A1,Lm5;
hence a |^ i <> 0.K by A3,VECTSP_2:13;
end;
end;
begin :: Valuation
definition let K be doubleLoopStr;
attr K is having_valuation means
:Def9:
ex f being e.i.-valued Function of K, ExtREAL st
f.0.K = +infty &
(for a being Element of K st a <> 0.K holds f.a in INT) &
(for a,b being Element of K holds f.(a*b) = f.a + f.b) &
(for a being Element of K st 0 <= f.a holds 0 <= f.(1.K+a)) &
ex a being Element of K st f.a <> 0 & f.a <> +infty;
end;
definition let K be doubleLoopStr such that
A1: K is having_valuation;
mode Valuation of K -> e.i.-valued Function of K, ExtREAL means :Def10:
it.0.K = +infty &
(for a being Element of K st a <> 0.K holds it.a in INT) &
(for a,b being Element of K holds it.(a*b) = it.a + it.b) &
(for a being Element of K st 0 <= it.a holds 0 <= it.(1.K+a)) &
ex a being Element of K st it.a <> 0 & it.a <> +infty;
existence by A1,Def9;
end;
reserve v for Valuation of K;
theorem Th18:
K is having_valuation implies v.1.K = 0
proof
assume
A1: K is having_valuation;
A2: v.1.K = v.(1.K*1.K) by VECTSP_1:def 8
.= v.1.K + v.1.K by A1,Def10;
1.K <> 0.K;
then v.1.K in INT by A1,Def10;
then reconsider x = v.1.K as Element of REAL by XREAL_0:def 1;
x + 0 = x + x by A2,XXREAL_3:def 2;
hence thesis;
end;
theorem Th19:
K is having_valuation & a <> 0.K implies v.a <> +infty
proof
assume K is having_valuation & a <> 0.K;
then v.a in INT by Def10;
hence thesis;
end;
theorem Th20:
K is having_valuation implies v.-1.K = 0
proof
assume
A1: K is having_valuation;
(-1.K) * (-1.K) = 1.K by Th13;
then v.(-1.K) + v.(-1.K) = v.(1.K) by A1,Def10
.= 0 by A1,Th18;
hence thesis by Th2;
end;
theorem Th21:
K is having_valuation implies v.-a = v.a
proof
assume
A1: K is having_valuation;
(-1.K) * a = -a by VECTSP_2:29;
hence v.-a = v.(-1.K) + v.a by A1,Def10
.= 0 + v.a by A1,Th20
.= v.a by XXREAL_3:4;
end;
theorem Th22:
K is having_valuation & a <> 0.K implies v.(a") = -v.a
proof
assume that
A1: K is having_valuation and
A2: a <> 0.K;
a * a" = 1.K by A2,VECTSP_2:def 2;
then
A3: v.a + v.(a") = v.(1.K) by A1,Def10
.= 0 by A1,Th18;
now
assume a" = 0.K;
then 1.K = a*0.K by A2,VECTSP_2:def 2
.= 0.K by VECTSP_1:6;
hence contradiction;
end;
then v.a in INT & v.(a") in INT by A1,A2,Def10;
then reconsider w1 = v.a, w2 = v.(a") as Element of REAL by XREAL_0:def 1;
w1 + w2 = 0 by A3,XXREAL_3:def 2;
then -w1 = w2;
hence thesis by XXREAL_3:def 3;
end;
theorem Th23:
K is having_valuation & b <> 0.K implies v.(a/b) = v.a - v.b
proof
assume
A1: K is having_valuation;
assume
A2: b <> 0.K;
thus v.(a/b) = v.a + v.(b") by A1,Def10
.= v.a - v.b by A1,A2,Th22;
end;
theorem Th24:
K is having_valuation & a <> 0.K & b <> 0.K implies v.(a/b) = -v.(b/a)
proof
assume
A1: K is having_valuation;
assume
A2: a <> 0.K;
assume b <> 0.K;
hence v.(a/b) = v.a - v.b by A1,Th23
.= -(v.b-v.a) by XXREAL_3:26
.= -v.(b/a) by A1,A2,Th23;
end;
theorem Th25:
K is having_valuation & b <> 0.K & 0 <= v.(a/b) implies v.b <= v.a
proof
assume that
A1: K is having_valuation and
A2: b <> 0.K and
A3: 0 <= v.(a/b);
A4: v.(a/b) = v.a - v.b by A1,A2,Th23;
per cases;
suppose a = 0.K;
then v.a = +infty by A1,Def10;
hence v.b <= v.a by XXREAL_0:3;
end;
suppose a <> 0.K;
then v.a in INT & v.b in INT by A1,A2,Def10;
then reconsider a1 = v.a, b1 = v.b as Element of REAL by XREAL_0:def 1;
A5: a1 - b1 + b1 = a1;
a1 - b1 = v.a - v.b by Lm1;
then
A6: v.(a/b) + v.b = v.a by A4,A5,XXREAL_3:def 2;
0 + v.b <= v.(a/b) + v.b by A3,XXREAL_3:35;
hence v.b <= v.a by A6,XXREAL_3:4;
end;
end;
theorem Th26:
K is having_valuation & a <> 0.K & b <> 0.K & v.(a/b) <= 0 implies
0 <= v.(b/a)
proof
assume K is having_valuation & a <> 0.K & b <> 0.K;
then v.(a/b) = -v.(b/a) by Th24;
hence thesis;
end;
theorem Th27:
K is having_valuation & b <> 0.K & v.(a/b) <= 0 implies v.a <= v.b
proof
assume that
A1: K is having_valuation and
A2: b <> 0.K and
A3: v.(a/b) <= 0;
A4: now
assume
A5: a = 0.K;
a/b = a*b"
.= 0.K by A5,VECTSP_1:6;
hence contradiction by A1,Def10,A3;
end;
then 0 <= v.(b/a) by A1,A2,A3,Th26;
hence v.a <= v.b by A1,A4,Th25;
end;
theorem Th28:
K is having_valuation implies min(v.a,v.b) <= v.(a+b)
proof
assume
A1: K is having_valuation;
per cases;
suppose
A2: a = 0.K;
then v.a = +infty by A1,Def10;
then min(v.a,v.b) = v.b by XXREAL_0:42;
hence min(v.a,v.b) <= v.(a+b) by A2,RLVECT_1:def 4;
end;
suppose
A3: b = 0.K;
then v.b = +infty by A1,Def10;
then min(v.a,v.b) = v.a by XXREAL_0:42;
hence min(v.a,v.b) <= v.(a+b) by A3,RLVECT_1:def 4;
end;
suppose that
A4: a <> 0.K and
A5: 0 <= v.(b/a);
v.a <= v.b by A1,A4,A5,Th25;
then
A6: min(v.a,v.b) = v.a by XXREAL_0:def 9;
0 <= v.(1.K+b/a) by A5,A1,Def10;
then
A7: 0 + v.a <= v.(1.K+b/a) + v.a by XXREAL_3:36;
v.(1.K+b/a) + v.a = v.((1.K+b/a)* a) by A1,Def10
.= v.((1.K*a + b/a*a)) by VECTSP_1:def 3
.= v.(a + b/a*a) by VECTSP_1:def 8
.= v.(a + b) by A4,VECTSP_2:22;
hence min(v.a,v.b) <= v.(a+b) by A6,A7,XXREAL_3:4;
end;
suppose that
A8: a <> 0.K and
A9: b <> 0.K and
A10: v.(b/a) <= 0;
A11: 0 <= v.(a/b) by A1,A8,A9,A10,Th26;
v.b <= v.a by A1,A8,A10,Th27;
then
A12: min(v.a,v.b) = v.b by XXREAL_0:def 9;
0 <= v.(1.K+a/b) by A11,A1,Def10;
then
A13: 0 + v.b <= v.(1.K+a/b) + v.b by XXREAL_3:36;
v.(1.K+a/b) + v.b = v.((1.K+a/b)* b) by A1,Def10
.= v.((1.K*b + a/b*b)) by VECTSP_1:def 3
.= v.(b + a/b*b) by VECTSP_1:def 8
.= v.(b + a) by A9,VECTSP_2:22;
hence min(v.a,v.b) <= v.(a+b) by A12,A13,XXREAL_3:4;
end;
end;
theorem Th29:
K is having_valuation & v.a < v.b implies v.a = v.(a+b)
proof
assume
A1: K is having_valuation & v.a < v.b;
A2: min(v.a,v.b) = v.a by A1,XXREAL_0:def 9;
A3: v.a <= v.(a+b) by A2,A1,Th28;
A4: a = a + 0.K by RLVECT_1:def 4;
A5: 0.K = b - b by RLVECT_1:15;
A6: a = (a + b) - b by A4,A5,RLVECT_1:28
.= (a+b)+ -b;
A7: v.(-b) = v.b by A1,Th21;
A8: min(v.(a+b),v.b) <=v.a by A6,A7,A1,Th28;
then min(v.(a+b), v.b) = v.(a+b) by A1,XXREAL_0:def 9;
hence thesis by A3,A8,XXREAL_0:1;
end;
theorem Th30:
K is having_valuation & a <> 0.K implies v.(a|^i) = i * v.a
proof
assume that
A1: K is having_valuation and
A2: a <> 0.K;
defpred P[Nat] means v.(a|^$1) = $1 * v.a;
a|^0 = 1_K by GROUP_1:def 7;
then
A3: P[0] by A1,Th18;
A4: P[n] implies P[n+1]
proof
assume
A5: P[n];
A6: v.a in REAL by A1,A2,Th19,XXREAL_0:14;
reconsider N = n as ext-real number;
thus v.(a|^(n+1)) = v.(a|^n*a) by Lm4
.= n * v.a + v.a by A5,A1,Def10
.= n * v.a + 1. * v.a by XXREAL_3:81
.= v.a * (N+1.) by A6,XXREAL_3:95
.= (n+1) * v.a by XXREAL_3:def 2;
end;
A7: P[n] from NAT_1:sch 2(A3,A4);
per cases;
suppose i >= 0;
then reconsider j = i as Element of NAT by INT_1:3;
P[j] by A7;
hence thesis;
end;
suppose
A8: i < 0;
then reconsider n1 = -i as Element of NAT by INT_1:3;
reconsider I = i as ext-real number;
A9: v.(a |^ i) = v.((power(K).(a,abs(i)))") by A8,Def7
.= v.((a |^ n1)") by A8,ABSVALUE:def 1;
v.((a |^ n1)") = -v.(a |^ n1) by A1,A2,Th22,Lm5
.= -n1*v.a by A7
.= -((-I)*v.a) by XXREAL_3:def 3
.= --i*v.a by XXREAL_3:92;
hence thesis by A9;
end;
end;
theorem Th31:
K is having_valuation & 0 <= v.(1.K+a) implies 0 <= v.a
proof
assume that
A1: K is having_valuation & 0 <= v.(1.K+a) and
A2: v.a < 0;
0 = v.1.K by A1,Th18;
hence contradiction by A1,A2,Th29;
end;
theorem
K is having_valuation & 0 <= v.(1.K-a) implies 0 <= v.a
proof
assume that
A1: K is having_valuation and
A2: 0 <= v.(1.K-a);
1.K-a = 1.K + -a & v.-a = v.a by A1,Th21;
hence thesis by A1,A2,Th31;
end;
Lm6: for a,b being ExtInt st a <= b holds 0 <= b-a
proof
let a,b be ExtInt;
assume a <= b;
then a+-a <= b+-a by XXREAL_3:36;
hence thesis by XXREAL_3:7;
end;
theorem
K is having_valuation & a <> 0.K & v.a <= v.b implies 0 <= v.(b/a)
proof
assume that
A1: K is having_valuation and
A2: a <> 0.K;
assume v.a <= v.b;
then 0 <= v.b - v.a by Lm6;
hence thesis by A1,A2,Th23;
end;
theorem Th34:
K is having_valuation implies +infty in rng v
proof
assume K is having_valuation;
then
A1: v.0.K = +infty by Def10;
dom v = the carrier of K by FUNCT_2:def 1;
hence thesis by A1,FUNCT_1:def 3;
end;
Th35:
K is having_valuation implies least-positive(rng v) in rng v
proof
assume K is having_valuation;
then +infty in rng v by Th34;
hence thesis by Def4;
end;
theorem Th36:
v.a = 1 implies least-positive(rng v) = 1
proof
assume
A1: v.a = 1;
dom v = the carrier of K by FUNCT_2:def 1;
then
A2: v.a in rng v by FUNCT_1:def 3;
now
let i be positive ExtInt;
assume i in rng v;
per cases by XXREAL_3:1;
suppose i is positive real number;
then reconsider i1 = i as positive real number;
ex p, q being Real st p = 1. & q = i & p <= q
proof
reconsider i1 as Real by XREAL_0:def 1;
take 1, i1;
0+1 <= i1 by INT_1:7;
hence thesis;
end;
hence 1. <= i;
end;
suppose i = +infty;
hence 1. <= i by XXREAL_0:3;
end;
end;
hence thesis by A1,A2,Def4;
end;
theorem Th38:
K is having_valuation implies least-positive(rng v) is integer
proof
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then consider a such that
A2: v.a <> 0 and
A3: v.a <> +infty by Def10;
A4: dom v = the carrier of K by FUNCT_2:def 1;
then
A5: v.a in rng v by FUNCT_1:def 3;
assume not thesis;
then
A6: l = +infty by Def1;
A7: a <> 0.K by A1,A3,Def10;
then v.a in INT by A1,Def10;
then reconsider va = v.a as Real by XREAL_0:def 1;
per cases;
suppose va is positive;
then l <= v.a by A5,Def4;
hence contradiction by A3,A6,XXREAL_0:4;
end;
suppose not va is positive;
then reconsider va as non positive real number;
reconsider va as negative real number by A2;
set b = a";
b <> 0.K by A7,VECTSP_2:13;
then
A9: v.b in INT by A1,Def10;
A10: v.b in rng v by A4,FUNCT_1:def 3;
v.b = -v.a by A1,A7,Th22
.= -va by XXREAL_3:def 3;
then l <= v.b by A10,Def4;
hence contradiction by A9,A6,XXREAL_0:4;
end;
end;
Lm7:
K is having_valuation implies least-positive(rng v) in REAL
proof
assume K is having_valuation;
then least-positive(rng v) is integer by Th38;
then least-positive(rng v) in INT by INT_1:def 2;
hence thesis by XREAL_0:def 1;
end;
theorem Th39:
K is having_valuation implies
for x being Element of K st x <> 0.K
ex i being Integer st v.x = i * least-positive(rng v)
proof
assume
A1: K is having_valuation;
let x be Element of K such that
A2: x <> 0.K;
reconsider vx = v.x as Element of INT by A1,A2,Def10;
reconsider l = least-positive(rng v) as Integer by A1,Th38;
A3: v.x = (vx div l) * l + (vx mod l) by INT_1:59;
per cases;
suppose
A4: vx mod l = 0;
take vx div l;
thus thesis by A3,A4,XXREAL_3:def 5;
end;
suppose
A5: vx mod l <> 0;
consider k being Element of K such that
A6: l = v.k by A1,Th35,FUNCT_2:113;
set d = vx div l;
set kd = k|^d;
set kD = kd";
A7: k <> 0.K by A1,A6,Def10;
then
A8: d * v.k = v.kd by A1,Th30;
A9: -v.kd = v.kD by A1,A7,Th17,Th22;
A10: d * l = d * v.k by A6,XXREAL_3:def 5;
A11: v.(x*kD) = v.x - d * l by A8,A9,A10,A1,Def10
.= vx - d * l by Lm1
.= vx mod l by A3;
then
A12: 0 <= v.(x*kD) by INT_1:57;
A13: v.(x*kD) < l by A11,INT_1:58;
v.(x*kD) in rng v by FUNCT_2:4;
hence thesis by A12,A5,A11,A13,Def4;
end;
end;
definition
let K, v;
assume
A1: K is having_valuation;
func Pgenerator(v) -> Element of K equals
:Def11:
the Element of v"{least-positive(rng v)};
coherence
proof
set l = least-positive(rng v);
l in rng v by A1,Th35;
then {l} c= rng v by ZFMISC_1:31;
then v"{l} is non empty by RELAT_1:139;
then the Element of v"{l} in v"{l};
hence thesis;
end;
end;
definition
let K, v;
assume
A1: K is having_valuation;
func normal-valuation(v) -> Valuation of K means
:Def12:
v.a = (it.a) * least-positive(rng v);
existence
proof
set l = least-positive(rng v);
reconsider ll = l as Element of ExtREAL by XXREAL_0:def 1;
reconsider l1 = l as Integer by A1,Th38;
A2: l1 in REAL by XREAL_0:def 1;
deffunc F(Element of K) = v.$1 / ll;
consider f being Function of K, ExtREAL such that
A3: for x being Element of K holds f.x = F(x) from FUNCT_2:sch 4;
for y being set st y in rng f holds y is ext-integer
proof
let y be set;
assume y in rng f;
then consider x being set such that
A4: x in dom f and
A5: f.x = y by FUNCT_1:def 3;
reconsider x as Element of K by A4;
A6: f.x = v.x / l by A3;
per cases by Def1;
suppose v.x is integer;
then x <> 0.K by A1,Def10;
then consider r being Integer such that
A7: v.x = r*l by A1,Th39;
v.x / l = r by A2,A7,XXREAL_3:88;
hence thesis by A5,A3;
end;
suppose v.x = +infty;
hence thesis by A5,A6,A2,XXREAL_3:83;
end;
end;
then reconsider f as e.i.-valued Function of K, ExtREAL by Def5;
f is Valuation of K
proof
thus K is having_valuation by A1;
thus f.0.K = v.0.K/l by A3
.= +infty/l by A1,Def10
.= +infty by A2,XXREAL_3:83;
thus for a st a <> 0.K holds f.a in INT
proof
let a;
assume a <> 0.K;
then v.a in INT by A1,Def10;
then reconsider va = v.a as Integer;
f.a = v.a / l by A3
.= va / l1 by Lm2;
hence thesis by INT_1:def 2;
end;
thus for a, b holds f.(a*b) = f.a + f.b
proof
let a, b;
thus f.(a*b) = v.(a*b) / l by A3
.= (v.a+v.b) / l by A1,Def10
.= v.a/l + v.b/l by A2,Th7
.= f.a + v.b/l by A3
.= f.a + f.b by A3;
end;
thus for a st 0 <= f.a holds 0 <= f.(1.K+a)
proof
let a such that
A8: 0 <= f.a;
A9: f.(1.K+a) = v.(1.K+a) / l by A3;
f.a = v.a / l by A3;
then 0 <= v.a by A2,A8,Th5;
then 0 <= v.(1.K+a) by A1,Def10;
hence thesis by A9;
end;
consider a such that
A10: v.a <> 0 and
A11: v.a <> +infty by A1,Def10;
take a;
A12: f.a = v.a / l by A3;
hence f.a <> 0 by A2,A10,Th9;
reconsider va = v.a as Integer by A11,Def1;
A13: va in REAL by XREAL_0:def 1;
l in REAL by A1,Lm7;
hence f.a <> +infty by A12,A13;
end;
then reconsider f as Valuation of K;
take f;
let a;
thus v.a = v.a/l*l by A2,Th8
.= f.a*l by A3;
end;
uniqueness
proof
let f, g be Valuation of K such that
A14: for a holds v.a = (f.a)*least-positive(rng v) and
A15: for a holds v.a = (g.a)*least-positive(rng v);
A16: least-positive(rng v) in REAL by A1,Lm7;
let x be Element of K;
(f.x)*least-positive(rng v) = v.x by A14
.= (g.x)*least-positive(rng v) by A15;
hence thesis by A16,XXREAL_3:68;
end;
end;
theorem Th40:
K is having_valuation implies
(v.a = 0 iff normal-valuation(v).a = 0)
proof
assume K is having_valuation;
then v.a = (normal-valuation(v).a)*least-positive(rng v) by Def12;
hence thesis;
end;
theorem Th41:
K is having_valuation implies
(v.a = +infty iff normal-valuation(v).a = +infty)
proof
assume
A1: K is having_valuation;
set f = normal-valuation(v);
set l = least-positive(rng v);
A2: v.a = (f.a)*l by A1,Def12;
l is integer by A1,Th38;
hence v.a = +infty implies f.a = +infty by A2,XXREAL_3:69;
thus thesis by A2,XXREAL_3:def 5;
end;
theorem
K is having_valuation implies
(v.a = v.b iff normal-valuation(v).a = normal-valuation(v).b)
proof
set f = normal-valuation(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: l in REAL by Lm7;
v.a = (f.a)*l & v.b = (f.b)*l by A1,Def12;
hence thesis by A2,XXREAL_3:68;
end;
theorem Th43:
K is having_valuation implies
(v.a is positive iff normal-valuation(v).a is positive)
proof
set f = normal-valuation(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: v.a = f.a*l by Def12;
reconsider l1 = l as Real by A1,Lm7;
hereby
assume
A3: v.a is positive;
per cases by A3,XXREAL_3:1;
suppose v.a is positive real number;
then reconsider va = v.a as positive real number;
A4: va in REAL by XREAL_0:def 1;
then f.a in REAL by A2,XXREAL_3:73;
then consider c, b being complex number such that
A5: f.a = c & l1 = b & f.a*l1 = c*b by XXREAL_3:def 5;
reconsider c as Real by A4,A5,A2,XXREAL_3:73;
va = c*b by A1,Def12,A5;
hence f.a is positive by A5;
end;
suppose v.a = +infty;
hence f.a is positive by A1,Th41;
end;
end;
assume
A6: f.a is positive;
per cases by A6,XXREAL_3:1;
suppose f.a is positive real number;
then reconsider fa = f.a as positive real number;
v.a = fa*l1 by A2,XXREAL_3:def 5;
hence v.a is positive;
end;
suppose f.a = +infty;
hence v.a is positive by A1,Th41;
end;
end;
theorem Th44:
K is having_valuation implies
(0 <= v.a iff 0 <= normal-valuation(v).a)
proof
set f = normal-valuation(v);
assume
A1: K is having_valuation;
hereby
assume 0 <= v.a;
then v.a is positive or 0 = v.a;
hence 0 <= f.a by A1,Th43,Th40;
end;
assume 0 <= f.a;
then f.a is positive or 0 = f.a;
hence thesis by A1,Th43,Th40;
end;
theorem
K is having_valuation implies
(v.a is non negative iff normal-valuation(v).a is non negative)
proof
set f = normal-valuation(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: v.a = f.a*l by Def12;
per cases;
suppose v.a is empty or f.a is empty;
thus thesis by A2;
end;
suppose that
A3: v.a is non empty and
A4: f.a is non empty;
thus v.a is non negative implies f.a is non negative by A1,A3,Th43;
thus thesis by A4,A1,Th43;
end;
end;
theorem Th46:
K is having_valuation implies normal-valuation(v).Pgenerator(v) = 1
proof
set f = normal-valuation(v);
set a = Pgenerator(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: v.a = (f.a)*l by Def12;
A3: l is Real by A1,Lm7;
l in rng v by A1,Th35;
then {l} c= rng v by ZFMISC_1:31;
then
A4: v"{l} is non empty by RELAT_1:139;
a = the Element of v"{l} by A1,Def11;
then v.a in {l} by A4,FUNCT_1:def 7;
then v.a = l by TARSKI:def 1
.= 1*l by XXREAL_3:81;
hence f.a = 1 by A2,A3,XXREAL_3:68;
end;
theorem
K is having_valuation & 0 <= v.a implies normal-valuation(v).a <= v.a
proof
set f = normal-valuation(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: v.a = f.a*l by Def12;
assume 0 <= v.a;
then
A3: 0 <= f.a by A1,Th44;
0.qua ExtInt+1 <= l by Th11;
then f.a*1 <= f.a*l by A3,Th3;
hence thesis by A2,XXREAL_3:81;
end;
theorem
K is having_valuation & v.a = 1 implies normal-valuation(v) = v
proof
set f = normal-valuation(v);
assume that
A1: K is having_valuation and
A2: v.a = 1;
let a be Element of K;
thus v.a = (f.a)*least-positive(rng v) by A1,Def12
.= f.a*1 by A2,Th36
.= f.a by XXREAL_3:81;
end;
theorem
K is having_valuation implies
normal-valuation(normal-valuation(v)) = normal-valuation(v)
proof
assume
A1: K is having_valuation;
set f = normal-valuation(v);
set g = normal-valuation(f);
let a be Element of K;
set k = least-positive(rng f);
A2: f.a = (g.a)*k by A1,Def12;
f.Pgenerator(v) = 1 by A1,Th46;
then k = 1 by Th36;
hence thesis by A2,XXREAL_3:81;
end;
begin :: Valuation Ring
definition
let K be non empty doubleLoopStr;
let v be Valuation of K;
func NonNegElements v equals
{x where x is Element of K: 0 <= v.x};
coherence;
end;
theorem Th50:
for K being non empty doubleLoopStr,
v being Valuation of K,
a being Element of K holds
a in NonNegElements v iff 0 <= v.a
proof
let K be non empty doubleLoopStr,
v be Valuation of K,
a be Element of K;
hereby
assume a in NonNegElements v;
then ex x being Element of K st a = x & 0 <= v.x;
hence 0 <= v.a;
end;
thus thesis;
end;
theorem Th51:
for K being non empty doubleLoopStr,
v being Valuation of K holds
NonNegElements v c= the carrier of K
proof
let K be non empty doubleLoopStr,
v be Valuation of K;
let a be set;
assume a in NonNegElements v;
then ex x being Element of K st a = x & 0 <= v.x;
hence thesis;
end;
theorem Th52:
for K being non empty doubleLoopStr,
v being Valuation of K holds
K is having_valuation implies 0.K in NonNegElements v
proof
let K be non empty doubleLoopStr,
v be Valuation of K;
assume K is having_valuation;
then v.0.K = +infty by Def10;
hence thesis;
end;
theorem Th53:
K is having_valuation implies 1.K in NonNegElements v
proof
assume K is having_valuation;
then v.1.K = 0 by Th18;
hence thesis;
end;
definition
let K, v such that
A1: K is having_valuation;
func ValuatRing v -> strict commutative non degenerated Ring means
:Def14:
the carrier of it = NonNegElements v &
the addF of it = (the addF of K) | [:NonNegElements v,NonNegElements v:] &
the multF of it = (the multF of K) | [:NonNegElements v,NonNegElements v:] &
the ZeroF of it = 0.K &
the OneF of it = 1.K;
existence
proof
set c = NonNegElements v;
set a = (the addF of K) | [:c,c:];
set m = (the multF of K) | [:c,c:];
set j = 1.K;
set z = 0.K;
A2: c c= the carrier of K by Th51;
now
let x be set such that
A3: x in [:c,c:];
set q = (the addF of K).x;
consider x1, x2 being set such that
A4: x1 in c and
A5: x2 in c and
A6: x = [x1,x2] by A3,ZFMISC_1:def 2;
consider y1 being Element of K such that
A7: y1 = x1 and
A8: 0 <= v.y1 by A4;
consider y2 being Element of K such that
A9: y2 = x2 and
A10: 0 <= v.y2 by A5;
A11: min(v.y1,v.y2) <= v.(y1+y2) by A1,Th28;
0 <= min(v.y1,v.y2) by A8,A10,XXREAL_0:20;
hence q in c by A6,A7,A11,A9;
end;
then reconsider ca = c as Preserv of the addF of K by A2,REALSET1:def 1;
(the addF of K)||ca is BinOp of c;
then reconsider a as BinOp of c;
now
let x be set such that
A12: x in [:c,c:];
set q = (the multF of K).x;
consider x1, x2 being set such that
A13: x1 in c and
A14: x2 in c and
A15: x = [x1,x2] by A12,ZFMISC_1:def 2;
consider y1 being Element of K such that
A16: y1 = x1 and
A17: 0 <= v.y1 by A13;
consider y2 being Element of K such that
A18: y2 = x2 and
A19: 0 <= v.y2 by A14;
0+0 <= v.y1+v.y2 by A17,A19;
then 0 <= v.(y1*y2) by A1,Def10;
hence q in c by A15,A16,A18;
end;
then reconsider cm = c as Preserv of the multF of K by A2,REALSET1:def 1;
(the multF of K)||cm is BinOp of c;
then reconsider m as BinOp of c;
A20: v.z = +infty by A1,Def10;
reconsider j, z as Element of c by A1,Th52,Th53;
set R = doubleLoopStr(#c,a,m,j,z#);
z in c by A20;
then reconsider R as non empty doubleLoopStr;
A21: now
let x, y be Element of R,
x1, y1 be Element of K such that
A22: x = x1 & y = y1;
[x,y] in [:c,c:];
hence x+y = x1+y1 by A22,FUNCT_1:49;
end;
A23: now
let x, y be Element of R,
x1, y1 be Element of K such that
A24: x = x1 & y = y1;
[x,y] in [:c,c:];
hence x*y = x1*y1 by A24,FUNCT_1:49;
end;
A25: now
let x, e be Element of R;
assume
A26: e = j;
x in c & e in c;
then reconsider x1 = x, e1 = e as Element of K by A2;
thus x*e = x1*e1 by A23
.= x by A26,VECTSP_1:def 4;
thus e*x = e1*x1 by A23
.= x by A26,VECTSP_1:def 4;
end;
R is well-unital
proof
let x be Element of R;
thus x * 1.R = x & 1.R * x = x by A25;
end;
then reconsider R as well-unital non empty doubleLoopStr;
R is Abelian add-associative right_zeroed right_complementable
commutative associative distributive non degenerated
proof
hereby
let x, y be Element of R;
x in c & y in c;
then reconsider x1 = x, y1 = y as Element of K by A2;
thus x+y = x1+y1 by A21
.= y+x by A21;
end;
hereby
let x, y, z be Element of R;
x in c & y in c & z in c;
then reconsider x1 = x, y1 = y, z1 = z as Element of K by A2;
A27: y+z = y1+z1 by A21;
x+y = x1+y1 by A21;
hence x+y+z = x1+y1+z1 by A21
.= x1+(y1+z1) by RLVECT_1:def 3
.= x+(y+z) by A27,A21;
end;
hereby
let x be Element of R;
x in c;
then reconsider x1 = x as Element of K by A2;
thus x+0.R = x1 + 0.K by A21
.= x by RLVECT_1:def 4;
end;
thus R is right_complementable
proof
let x be Element of R;
x in c;
then reconsider x1 = x as Element of K by A2;
consider w1 being Element of K such that
A28: x1 + w1 = 0.K by ALGSTR_0:def 11;
A29: v.(x1+w1) = +infty by A1,A28,Def10;
per cases;
suppose v.w1 < v.x1;
then v.w1 = v.(w1+x1) by A1,Th29;
then reconsider w = w1 as Element of R by A29,Th50;
take w;
thus x + w = 0.R by A28,A21;
end;
suppose
A30: v.x1 <= v.w1;
0 <= v.x1 by Th50;
then reconsider w = w1 as Element of R by A30,Th50;
take w;
thus x + w = 0.R by A28,A21;
end;
end;
hereby
let x, y be Element of R;
x in c & y in c;
then reconsider x1 = x, y1 = y as Element of K by A2;
thus x*y = x1*y1 by A23
.= y*x by A23;
end;
hereby
let x, y, z be Element of R;
x in c & y in c & z in c;
then reconsider x1 = x, y1 = y, z1 = z as Element of K by A2;
A31: y*z = y1*z1 by A23;
x*y = x1*y1 by A23;
hence x*y*z = x1*y1*z1 by A23
.= x1*(y1*z1) by GROUP_1:def 3
.= x*(y*z) by A31,A23;
end;
hereby
let x, y, z be Element of R;
x in c & y in c & z in c;
then reconsider x1 = x, y1 = y, z1 = z as Element of K by A2;
A32: y+z = y1+z1 by A21;
A33: x*y = x1*y1 by A23;
A34: x*z = x1*z1 by A23;
A35: y*x = y1*x1 by A23;
A36: z*x = z1*x1 by A23;
thus x*(y+z) = x1*(y1+z1) by A32,A23
.= x1*y1 + x1*z1 by VECTSP_1:def 2
.= x*y + x*z by A21,A33,A34;
thus (y+z)*x = (y1+z1)*x1 by A32,A23
.= y1*x1 + z1*x1 by VECTSP_1:def 2
.= y*x + z*x by A21,A35,A36;
end;
thus 0.R <> 1.R;
end;
hence thesis;
end;
uniqueness;
end;
theorem Th54:
K is having_valuation implies
for x being Element of ValuatRing v holds x is Element of K
proof
assume
A1: K is having_valuation;
let x be Element of ValuatRing v;
the carrier of ValuatRing v = NonNegElements v by A1,Def14; then
x in NonNegElements v & NonNegElements v c= the carrier of K by Th51;
hence thesis;
end;
theorem Th55:
K is having_valuation implies
(0 <= v.a iff a is Element of ValuatRing v)
proof
assume K is having_valuation;
then the carrier of ValuatRing v = NonNegElements v by Def14;
hence thesis by Th50;
end;
theorem Th56:
K is having_valuation implies
for S being Subset of ValuatRing v holds 0 is LowerBound of v.:S
proof
assume
A1: K is having_valuation;
let S be Subset of ValuatRing v;
let x be ext-real number;
assume x in v.:S;
then
A2: ex c being Element of K st c in S & x = v.c by FUNCT_2:65;
the carrier of ValuatRing v = NonNegElements v by A1,Def14;
hence thesis by A2,Th50;
end;
theorem Th57:
K is having_valuation implies
for x, y being Element of K,
x1, y1 being Element of ValuatRing v st x = x1 & y = y1 holds
x + y = x1 + y1
proof
set R = ValuatRing v;
set c = NonNegElements v;
assume
A1: K is having_valuation;
let x, y be Element of K,
x1, y1 be Element of R such that
A2: x = x1 & y = y1;
A3: c = the carrier of R by A1,Def14;
A4: the addF of R = (the addF of K) | [:c,c:] by A1,Def14;
thus x1+y1 = (the addF of R).[x1,y1]
.= x+y by A3,A4,A2,FUNCT_1:49;
end;
theorem Th58:
K is having_valuation implies
for x, y being Element of K,
x1, y1 being Element of ValuatRing v st x = x1 & y = y1 holds
x * y = x1 * y1
proof
set R = ValuatRing v;
set c = NonNegElements v;
assume
A1: K is having_valuation;
let x, y be Element of K,
x1, y1 be Element of R such that
A2: x = x1 & y = y1;
A3: c = the carrier of R by A1,Def14;
A4: the multF of R = (the multF of K) | [:c,c:] by A1,Def14;
thus x1*y1 = (the multF of R).[x1,y1]
.= x*y by A3,A4,A2,FUNCT_1:49;
end;
theorem
K is having_valuation implies 0.ValuatRing v = 0.K by Def14;
theorem
K is having_valuation implies 1.ValuatRing v = 1.K by Def14;
theorem
K is having_valuation implies
for x being Element of K, y being Element of ValuatRing v
st x = y holds -x = -y
proof
set R = ValuatRing v;
set c = NonNegElements v;
assume
A1: K is having_valuation;
let x be Element of K,
y be Element of R such that
A2: x = y;
A3: 0 <= v.y by A1,A2,Th55;
v.-x = v.x by A1,Th21;
then reconsider x1 = -x as Element of R by A1,A2,A3,Th55;
x+-x = 0.K by RLVECT_1:def 10;
then y+x1 = 0.K by A2,A1,Th57
.= 0.ValuatRing v by A1,Def14;
hence thesis by RLVECT_1:def 10;
end;
Lm8:
a <> 0.K implies a"*(a*b) = b
proof
assume
A1: a <> 0.K;
thus a"*(a*b) = a"*a*b by GROUP_1:def 3
.= 1.K*b by A1,VECTSP_2:def 2
.= b by VECTSP_1:def 8;
end;
Lm9:
for x, v being Element of K st
x <> 0.K holds x*(x"*v)=v
proof
let x, v be Element of K such that
A1: x <> 0.K;
thus x*(x"*v) = x*x"*v by GROUP_1:def 3
.= 1.K*v by A1,VECTSP_2:def 2
.= v by VECTSP_1:def 8;
end;
theorem
K is having_valuation implies ValuatRing v is domRing-like
proof
set R = ValuatRing v;
assume
A1: K is having_valuation;
let x, y be Element of R;
assume that
A2: x*y = 0.R and
A3: x <> 0.R;
reconsider x1 = x, y1 = y as Element of K by A1,Th54;
A4: 0.R = 0.K by A1,Def14;
A5: x1*y1 = x*y by A1,Th58;
y1 = x1"*(x1*y1) by A3,A4,Lm8
.= 0.K by A2,A4,A5,VECTSP_1:6;
hence thesis by A1,Def14;
end;
theorem Th63:
K is having_valuation implies
for y being Element of ValuatRing v holds
power(K).(y,n) = power(ValuatRing v).(y,n)
proof
set R = ValuatRing v;
assume
A1: K is having_valuation;
let y be Element of R;
defpred P[Nat] means
power(K).(y,$1) = power(ValuatRing v).(y,$1);
reconsider x = y as Element of K by A1,Th54;
power(K).(x,0) = 1_K & power(R).(y,0) = 1_R by GROUP_1:def 7; then
A2: P[0] by A1,Def14;
A3: for n being Nat st P[n] holds P[n+1]
proof
let n be Nat;
assume
A4: P[n];
reconsider m = n as Element of NAT by ORDINAL1:def 12;
power(K).(y,n+1) = (power(K).(x,m))*x &
power(ValuatRing v).(y,n+1) = (power(ValuatRing v)).(y,m)*y
by GROUP_1:def 7;
hence P[n+1] by A1,A4,Th58;
end;
for n being Nat holds P[n] from NAT_1:sch 2(A2,A3);
hence thesis;
end;
Lm10: now
let K,v;
assume K is having_valuation;
then v.0.K = +infty by Def10;
hence 0.K in {x where x is Element of K: 0 < v.x};
end;
definition
let K, v; assume
A1: K is having_valuation;
func PosElements v -> Ideal of ValuatRing v equals
:Def15:
{x where x is Element of K: 0 < v.x};
coherence
proof
set R = ValuatRing v;
set I = {x where x is Element of K: 0 < v.x};
A2: the carrier of R = NonNegElements v by A1,Def14;
I c= the carrier of R
proof
let a be set;
assume a in I;
then ex x being Element of K st a = x & 0 < v.x;
hence thesis by A2;
end;
then reconsider I as non empty Subset of R by A1,Lm10;
A3: the carrier of R c= the carrier of K by A2,Th51;
I is add-closed left-ideal right-ideal
proof
hereby
let x, y be Element of R;
assume x in I;
then consider x1 being Element of K such that
A4: x1 = x and
A5: 0 < v.x1;
assume y in I;
then consider y1 being Element of K such that
A6: y1 = y and
A7: 0 < v.y1;
A8: x+y = x1+y1 by A1,A4,A6,Th57;
A9: min(v.x1,v.y1) <= v.(x1+y1) by A1,Th28;
0 < min(v.x1,v.y1) by A5,A7,XXREAL_0:21;
hence x+y in I by A8,A9;
end;
hereby
let p, x be Element of R;
assume x in I;
then consider x1 being Element of K such that
A10: x1 = x and
A11: 0 < v.x1;
p in the carrier of R;
then reconsider p1 = p as Element of K by A3;
A12: p*x = p1*x1 by A1,A10,Th58;
A13: v.(p1*x1) = v.p1 + v.x1 by A1,Def10;
0 <= v.p1 by A2,Th50;
hence p*x in I by A11,A12,A13;
end;
let p, x be Element of R;
assume x in I;
then consider x1 being Element of K such that
A14: x1 = x and
A15: 0 < v.x1;
p in the carrier of R;
then reconsider p1 = p as Element of K by A3;
A16: p*x = p1*x1 by A1,A14,Th58;
A17: v.(p1*x1) = v.p1 + v.x1 by A1,Def10;
0 <= v.p1 by A2,Th50;
hence x*p in I by A15,A16,A17;
end;
hence thesis;
end;
end;
notation let K, v;
synonym vp v for PosElements v;
end;
theorem Th64:
K is having_valuation implies
(a in vp v iff 0 < v.a)
proof
assume K is having_valuation;
then
A1: vp v = {x where x is Element of K: 0 < v.x} by Def15;
hereby
assume a in vp v;
then ex b being Element of K st b = a & 0 < v.b by A1;
hence 0 < v.a;
end;
thus thesis by A1;
end;
theorem
K is having_valuation implies 0.K in vp v
proof
assume
A1: K is having_valuation;
then vp v = {x where x is Element of K: 0 < v.x} by Def15;
hence thesis by A1,Lm10;
end;
theorem Th66:
K is having_valuation implies not 1.K in vp v
proof
assume
A1: K is having_valuation;
then
A2: vp v = {x where x is Element of K: 0 < v.x} by Def15;
assume 1.K in vp v;
then ex x being Element of K st x = 1.K & 0 < v.x by A2;
hence thesis by A1,Th18;
end;
definition
let K, v;
let S be non empty Subset of K;
assume that
A1: K is having_valuation and
A2: S is Subset of ValuatRing v;
func min(S,v) -> Subset of ValuatRing v equals
:Def16:
v"{inf(v.:S)} /\ S;
coherence
proof
v"{inf(v.:S)} /\ S c= NonNegElements v
proof
let a be set;
assume
A3: a in v"{inf(v.:S)} /\ S; then
A4: a in v"{inf(v.:S)} by XBOOLE_0:def 4;
reconsider a as Element of K by A3;
reconsider vS = v.:S as non empty Subset of ExtREAL;
v.a in {inf(v.:S)} by A4,FUNCT_2:38;
then
A5: v.a = inf(vS) by TARSKI:def 1;
0 is LowerBound of vS by A1,A2,Th56;
then 0 <= inf(vS) by XXREAL_2:def 4;
hence thesis by A5;
end;
hence thesis by A1,Def14;
end;
end;
theorem Th67:
for S being non empty Subset of K st
K is having_valuation & S is Subset of ValuatRing v
holds min(S,v) c= S
proof
let S be non empty Subset of K;
assume K is having_valuation & S is Subset of ValuatRing v; then
min(S,v) = v"{inf(v.:S)} /\ S by Def16;
hence min(S,v) c= S by XBOOLE_1:17;
end;
theorem Th68:
for S being non empty Subset of K st
K is having_valuation & S is Subset of ValuatRing v
for x being Element of K holds x in min(S,v) iff x in S &
for y being Element of K st y in S holds v.x <= v.y
proof
let S be non empty Subset of K;
assume
A1: K is having_valuation;
assume
A2: S is Subset of ValuatRing v;
A3: min(S,v) = v"{inf(v.:S)} /\ S by A1,A2,Def16;
A4: inf(v.:S) is LowerBound of v.:S by XXREAL_2:def 4;
let x be Element of K;
hereby
assume
A5: x in min(S,v); then
x in v"{inf(v.:S)} by A3,XBOOLE_0:def 4;
then v.x in {inf(v.:S)} by FUNCT_2:38;
then
A6: v.x = inf(v.:S) by TARSKI:def 1;
min(S,v) c= S by A1,A2,Th67;
hence x in S by A5;
let y be Element of K;
assume y in S;
hence v.x <= v.y by A6,A4,FUNCT_2:35,XXREAL_2:def 2;
end;
assume that
A7: x in S and
A8: for y being Element of K st y in S holds v.x <= v.y;
A9: v.x is LowerBound of v.:S
proof
let a be ext-real number;
assume a in v.:S; then
ex y being Element of K st y in S & a = v.y by FUNCT_2:65;
hence v.x <= a by A8;
end;
for y being LowerBound of v.:S holds y <= v.x
by A7,FUNCT_2:35,XXREAL_2:def 2;
then v.x = inf(v.:S) by A9,XXREAL_2:def 4; then
v.x in {inf(v.:S)} by TARSKI:def 1; then
x in v"{inf(v.:S)} by FUNCT_2:38;
hence x in min(S,v) by A7,A3;
end;
theorem
K is having_valuation implies
for I being non empty Subset of K, x being Element of ValuatRing v st
I is Ideal of ValuatRing v & x in min(I,v) holds
I = {x}-Ideal
proof
assume
A1: K is having_valuation;
let I be non empty Subset of K;
let x be Element of ValuatRing v;
assume
A2: I is Ideal of ValuatRing v;
assume
A3: x in min(I,v);
A4: min(I,v) c= I by A1,A2,Th67;
thus I c= {x}-Ideal
proof
let a be set;
assume
A5: a in I;
then reconsider y = a as Element of ValuatRing v by A2;
reconsider x1 = x, y1 = y as Element of K by A1,Th54;
per cases by A1,Def14;
suppose
A6: x <> 0.K;
set r1 = y1/x1;
v.x1 <= v.y1 by A1,A2,A3,A5,Th68;
then 0 <= v.y1 - v.x1 by Lm6;
then 0 <= v.r1 by A6,A1,Th23;
then reconsider r0 = r1 as Element of ValuatRing v
by A1,Th55;
x1*r1 = y1*(x1"*x1) by GROUP_1:def 3
.= y1*1_K by A6,VECTSP_2:9
.= y1 by GROUP_1:def 4; then
A7: y = x*r0 by A1,Th58;
{x}-Ideal = {x*r where r is Element of ValuatRing v: not contradiction}
by IDEAL_1:64;
hence a in {x}-Ideal by A7;
end;
suppose
A8: x = 0.ValuatRing v;
then
A9: {x}-Ideal = {0.ValuatRing v} by IDEAL_1:47;
A10: 0.ValuatRing v = 0.K by A1,Def14; then
A11: v.x1 = +infty by A1,A8,Def10;
v.x1 <= v.y1 by A1,A5,A2,A3,Th68; then
y = 0.ValuatRing v by A1,A10,Th19,A11,XXREAL_0:4;
hence a in {x}-Ideal by A9,TARSKI:def 1;
end;
end;
{x} c= I by A4,A3,ZFMISC_1:31;
hence {x}-Ideal c= I by A2,IDEAL_1:def 14;
end;
theorem
for R being non empty doubleLoopStr,
I being add-closed non empty Subset of R holds
I is Preserv of the addF of R
proof
let R be non empty doubleLoopStr, I be add-closed non empty Subset of R;
let x be set;
assume x in [:I,I:];
then consider y, z being set such that
A1: y in I & z in I and
A2: x = [y,z] by ZFMISC_1:def 2;
reconsider y, z as Element of I by A1;
(the addF of R).x = y+z by A2;
hence (the addF of R).x in I by IDEAL_1:def 1;
end;
Lm11: now
let R be Ring;
let P be RightIdeal of R;
thus ex S being strict Submodule of RightModule R st
the carrier of S = P
proof
reconsider V1 = P as Subset of RightModule R;
V1 is linearly-closed
proof
hereby
let v, u be Vector of RightModule R such that
A1: v in V1 & u in V1;
reconsider v1 = v, u1 = u as Element of R;
v1+u1 = v+u;
hence v + u in V1 by A1,IDEAL_1:def 1;
end;
let a be Scalar of R, v be Vector of RightModule R such that
A2: v in V1;
reconsider v1 = v as Element of R;
v1*a = v*a;
hence v * a in V1 by A2,IDEAL_1:def 3;
end;
hence thesis by RMOD_2:34;
end;
end;
definition
let R be Ring;
let P be RightIdeal of R;
mode Submodule of P -> Submodule of RightModule R means
:Def17:
the carrier of it = P;
existence
proof
ex S being strict Submodule of RightModule R st the carrier of S = P
by Lm11;
hence thesis;
end;
end;
registration
let R be Ring;
let P be RightIdeal of R;
cluster strict for Submodule of P;
existence
proof
consider S being strict Submodule of RightModule R such that
A1: the carrier of S = P by Lm11;
reconsider T = the RightModStr of S as Submodule of P by A1,Def17;
take T;
thus thesis;
end;
end;
theorem
for R being Ring, P being Ideal of R, M being Submodule of P
for a being BinOp of P, z be Element of P
for m being Function of [:P,the carrier of R:], P
st a = (the addF of R)|[:P,P:] &
m = (the multF of R)|[:P,the carrier of R:] & z = the ZeroF of R
holds the RightModStr of M = RightModStr(#P,a,z,m#)
proof
let R be Ring;
let P be Ideal of R;
let M be Submodule of P;
A1: the carrier of M = P by Def17;
set V = RightModule R;
0.M = 0.V &
the addF of M = (the addF of V) |[:P,P:] &
the rmult of M = (the rmult of V) | [:P, the carrier of R:]
by A1,RMOD_2:def 2;
hence thesis by Def17;
end;
definition
let R be Ring;
let M1,M2 be RightMod of R;
let h be Function of M1,M2;
attr h is scalar-linear means
for x being Element of M1, r being Element of R holds h.(x*r) = (h.x)*r;
end;
registration
let R be Ring, M1 be RightMod of R, M2 be Submodule of M1;
cluster incl(M2,M1) -> additive scalar-linear;
coherence
proof
set h = incl(M2,M1);
the carrier of M2 c= the carrier of M1 by RMOD_2:def 2; then
A1: h = id the carrier of M2 by YELLOW_9:def 1;
thus incl(M2,M1) is additive
proof
let x,y be Element of M2;
h.x = x & h.y = y & h.(x+y) = x+y by A1,FUNCT_1:17;
hence thesis by RMOD_2:13;
end;
let x be Element of M2, r be Element of R;
h.x = x & h.(x*r) = x*r by A1,FUNCT_1:17;
hence thesis by RMOD_2:14;
end;
end;
theorem
K is having_valuation & b is Element of ValuatRing v
implies v.a <= v.a + v.b
proof
assume
A1: K is having_valuation;
assume b is Element of ValuatRing v;
then 0 <= v.b by A1,Th55;
then v.a+0 <= v.a+v.b by XXREAL_3:35;
hence thesis by XXREAL_3:4;
end;
theorem
K is having_valuation & a is Element of ValuatRing v implies
power(K).(a,n) is Element of ValuatRing v
proof
assume
A1: K is having_valuation;
assume a is Element of ValuatRing v;
then reconsider y = a as Element of ValuatRing v;
reconsider n as Element of NAT by ORDINAL1:def 12;
power(ValuatRing v).(y,n) is Element of ValuatRing v;
hence thesis by A1,Th63;
end;
theorem
K is having_valuation implies
for x being Element of ValuatRing v st x <> 0.K
holds power(K).(x,n) <> 0.K
proof
assume
A1: K is having_valuation;
let x be Element of ValuatRing v;
reconsider y = x as Element of K by A1,Th54;
power(K).(y,n) = y|^n;
hence thesis by Th17;
end;
theorem Th75:
K is having_valuation & v.a = 0 implies
a is Element of ValuatRing v & a" is Element of ValuatRing v
proof
assume
A1: K is having_valuation;
assume
A2: v.a = 0;
thus a is Element of ValuatRing v by A1,A2,Th55;
a <> 0.K by A1,A2,Def10;
then v.a" = -v.a by A1,Th22;
hence thesis by A1,A2,Th55;
end;
theorem
K is having_valuation & a <> 0.K &
a is Element of ValuatRing v & a" is Element of ValuatRing v implies
v.a = 0
proof
assume
A1: K is having_valuation;
assume that
A2: a <> 0.K and
A3: a is Element of ValuatRing v;
assume a" is Element of ValuatRing v;
then 0 <= v.a" by A1,Th55;
then --v.a <= -0 by A1,A2,Th22;
hence thesis by A3,A1,Th55;
end;
theorem Th77:
K is having_valuation & v.a = 0 implies
for I being Ideal of ValuatRing v holds
a in I iff I = the carrier of ValuatRing v
proof
assume
A1: K is having_valuation;
assume
A2: v.a = 0;
let I be Ideal of ValuatRing v;
thus a in I implies I = the carrier of ValuatRing v
proof
assume
A3: a in I;
thus I c= the carrier of ValuatRing v;
let x be set;
assume x in the carrier of ValuatRing v;
then reconsider x as Element of ValuatRing v;
reconsider b = x as Element of K by A1,Th54;
A4: a <> 0.K by A1,A2,Def10;
reconsider y = a, z = a" as Element of ValuatRing v
by A1,A2,Th75;
A5: y*(z*x) in I by A3,IDEAL_1:def 2;
reconsider za = z*x as Element of K by A1,Th54;
z*x = a"*b by A1,Th58;
then y*(z*x) = a*(a"*b) by A1,Th58;
hence thesis by A5,A4,Lm9;
end;
the carrier of ValuatRing v = NonNegElements v by A1,Def14;
hence thesis by A2;
end;
theorem
K is having_valuation implies Pgenerator(v) is Element of ValuatRing v
proof
set a = Pgenerator(v);
set l = least-positive(rng v);
assume
A1: K is having_valuation;
then
A2: a = the Element of (v"{l}) by Def11;
l in rng v by A1,Th35;
then {l} c= rng v by ZFMISC_1:31;
then v"{l} is non empty by RELAT_1:139;
then v.a in {l} by A2,FUNCT_1:def 7;
then v.a = l by TARSKI:def 1;
hence thesis by A1,Th55;
end;
theorem Th79:
K is having_valuation implies vp(v) is proper
proof
assume
A1: K is having_valuation;
then 1.K is Element of ValuatRing v by Def14;
hence vp(v) <> the carrier of ValuatRing v by A1,Th66;
end;
theorem Th80:
K is having_valuation implies
for x being Element of ValuatRing v st not x in vp(v)
holds v.x = 0
proof
assume
A1: K is having_valuation;
let x be Element of ValuatRing v;
reconsider y = x as Element of K by A1,Th54;
assume not x in vp(v);
then v.y <= 0 by A1,Th64;
hence thesis by A1,Th55;
end;
theorem
K is having_valuation implies vp(v) is prime
proof
assume
A1: K is having_valuation;
hence vp(v) is proper by Th79;
let a, b be Element of ValuatRing v such that
A2: a*b in vp(v);
assume not a in vp(v);
then
A3: v.a = 0 by A1,Th80;
assume
A4: not b in vp(v);
reconsider x = a, y = b as Element of K by A1,Th54;
A5: a*b = x*y by A1,Th58;
A6: v.y = 0 by A1,A4,Th80;
v.(x*y) = v.x+v.y by A1,Def10
.= 0 by A3,A6;
hence thesis by A1,A2,A5,Th64;
end;
theorem Th82:
K is having_valuation implies
for I being proper Ideal of ValuatRing v holds I c= vp(v)
proof
assume
A1: K is having_valuation;
let I be proper Ideal of ValuatRing v;
A2: I <> the carrier of ValuatRing v by SUBSET_1:def 6;
assume not I c= vp(v);
then consider x being set such that
A3: x in I and
A4: not x in vp(v) by TARSKI:def 3;
A5: x is Element of K by A1,A3,Th54;
v.x = 0 by A1,A4,A3,Th80;
hence thesis by A1,A2,A3,A5,Th77;
end;
theorem
K is having_valuation implies vp(v) is maximal
proof
assume
A1: K is having_valuation;
thus vp(v) is proper
proof
1.ValuatRing v = 1.K by A1,Def14;
hence vp(v) <> the carrier of ValuatRing v by A1,Th66;
end;
let J be Ideal of ValuatRing v;
assume
A2: vp(v) c= J;
J is non proper or J = vp(v)
proof
assume J is proper;
then J c= vp(v) by A1,Th82;
hence J = vp(v) by A2,XBOOLE_0:def 10;
end;
hence thesis;
end;
theorem
K is having_valuation implies
for I being maximal Ideal of ValuatRing v holds I = vp(v)
proof
assume
A1: K is having_valuation;
let I be maximal Ideal of ValuatRing v;
assume
A2: not thesis;
per cases;
suppose not I c= vp(v);
hence contradiction by A1,Th82;
end;
suppose I c= vp(v);
then vp(v) is non proper or I = vp(v) by RING_1:def 3;
then
A3: vp(v) = the carrier of ValuatRing v or I = vp(v) by SUBSET_1:def 6;
1.ValuatRing v = 1.K by A1,Def14;
hence contradiction by A3,A1,A2,Th66;
end;
end;
theorem Th85:
K is having_valuation implies
NonNegElements(normal-valuation v) = NonNegElements(v)
proof
assume
A1: K is having_valuation;
set f = normal-valuation v;
thus NonNegElements f c= NonNegElements v
proof
let a be set;
assume a in NonNegElements f;
then consider x being Element of K such that
A2: a = x and
A3: 0 <= f.x;
0 <= v.x by A1,A3,Th44;
hence thesis by A2;
end;
let a be set;
assume a in NonNegElements v;
then consider x being Element of K such that
A4: a = x and
A5: 0 <= v.x;
0 <= f.x by A1,A5,Th44;
hence thesis by A4;
end;
theorem
K is having_valuation implies
ValuatRing(normal-valuation v) = ValuatRing v
proof
assume
A1: K is having_valuation;
set f = normal-valuation v;
set R = ValuatRing(v);
set S = ValuatRing(f);
A2: the carrier of S = NonNegElements f by A1,Def14;
A3: NonNegElements(f) = NonNegElements(v) by A1,Th85;
A4: the addF of R = (the addF of K) | [:NonNegElements v,NonNegElements v:]
by A1,Def14
.= the addF of S by A1,A3,Def14;
A5: the multF of R = (the multF of K) | [:NonNegElements v,NonNegElements v:]
by A1,Def14
.= the multF of S by A1,A3,Def14;
A6: the ZeroF of R = 0.K by A1,Def14
.= the ZeroF of S by A1,Def14;
the OneF of R = 1.K by A1,Def14
.= the OneF of S by A1,Def14;
hence thesis by A3,A2,A4,A5,A6,A1,Def14;
end;