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Theorem infxrnegsupex 11973
Description: The infimum of a set of extended reals  A is the negative of the supremum of the negatives of its elements. (Contributed by Jim Kingdon, 2-May-2023.)
Hypotheses
Ref Expression
infxrnegsupex.ex  |-  ( ph  ->  E. x  e.  RR*  ( A. y  e.  A  -.  y  <  x  /\  A. y  e.  RR*  (
x  <  y  ->  E. z  e.  A  z  <  y ) ) )
infxrnegsupex.ss  |-  ( ph  ->  A  C_  RR* )
Assertion
Ref Expression
infxrnegsupex  |-  ( ph  -> inf ( A ,  RR* ,  <  )  =  -e sup ( { z  e.  RR*  |  -e
z  e.  A } ,  RR* ,  <  )
)
Distinct variable groups:    x, A, y, z    ph, x, y, z

Proof of Theorem infxrnegsupex
Dummy variables  f  g  w are mutually distinct and distinct from all other variables.
StepHypRef Expression
1 xrlttri3 10149 . . . . 5  |-  ( ( f  e.  RR*  /\  g  e.  RR* )  ->  (
f  =  g  <->  ( -.  f  <  g  /\  -.  g  <  f ) ) )
21adantl 277 . . . 4  |-  ( (
ph  /\  ( f  e.  RR*  /\  g  e. 
RR* ) )  -> 
( f  =  g  <-> 
( -.  f  < 
g  /\  -.  g  <  f ) ) )
3 infxrnegsupex.ex . . . 4  |-  ( ph  ->  E. x  e.  RR*  ( A. y  e.  A  -.  y  <  x  /\  A. y  e.  RR*  (
x  <  y  ->  E. z  e.  A  z  <  y ) ) )
42, 3infclti 7327 . . 3  |-  ( ph  -> inf ( A ,  RR* ,  <  )  e.  RR* )
5 xnegneg 10185 . . 3  |-  (inf ( A ,  RR* ,  <  )  e.  RR*  ->  -e  -einf ( A ,  RR* ,  <  )  = inf ( A ,  RR* ,  <  ) )
64, 5syl 14 . 2  |-  ( ph  -> 
-e  -einf ( A ,  RR* ,  <  )  = inf ( A ,  RR* ,  <  ) )
7 xnegeq 10179 . . . . . . . . 9  |-  ( w  =  z  ->  -e
w  =  -e
z )
87cbvmptv 4211 . . . . . . . 8  |-  ( w  e.  RR*  |->  -e
w )  =  ( z  e.  RR*  |->  -e
z )
98mptpreima 5261 . . . . . . 7  |-  ( `' ( w  e.  RR*  |->  -e w ) " A )  =  {
z  e.  RR*  |  -e z  e.  A }
10 eqid 2234 . . . . . . . . . 10  |-  ( w  e.  RR*  |->  -e
w )  =  ( w  e.  RR*  |->  -e
w )
1110xrnegiso 11972 . . . . . . . . 9  |-  ( ( w  e.  RR*  |->  -e
w )  Isom  <  ,  `'  <  ( RR* ,  RR* )  /\  `' ( w  e.  RR*  |->  -e
w )  =  ( w  e.  RR*  |->  -e
w ) )
1211simpri 113 . . . . . . . 8  |-  `' ( w  e.  RR*  |->  -e
w )  =  ( w  e.  RR*  |->  -e
w )
1312imaeq1i 5103 . . . . . . 7  |-  ( `' ( w  e.  RR*  |->  -e w ) " A )  =  ( ( w  e.  RR*  |->  -e w ) " A )
149, 13eqtr3i 2257 . . . . . 6  |-  { z  e.  RR*  |  -e
z  e.  A }  =  ( ( w  e.  RR*  |->  -e
w ) " A
)
1514supeq1i 7292 . . . . 5  |-  sup ( { z  e.  RR*  | 
-e z  e.  A } ,  RR* ,  <  )  =  sup ( ( ( w  e.  RR*  |->  -e
w ) " A
) ,  RR* ,  <  )
1611simpli 111 . . . . . . . . 9  |-  ( w  e.  RR*  |->  -e
w )  Isom  <  ,  `'  <  ( RR* ,  RR* )
17 isocnv 5990 . . . . . . . . 9  |-  ( ( w  e.  RR*  |->  -e
w )  Isom  <  ,  `'  <  ( RR* ,  RR* )  ->  `' ( w  e.  RR*  |->  -e
w )  Isom  `'  <  ,  <  ( RR* ,  RR* ) )
1816, 17ax-mp 5 . . . . . . . 8  |-  `' ( w  e.  RR*  |->  -e
w )  Isom  `'  <  ,  <  ( RR* ,  RR* )
19 isoeq1 5980 . . . . . . . . 9  |-  ( `' ( w  e.  RR*  |->  -e w )  =  ( w  e.  RR*  |->  -e w )  -> 
( `' ( w  e.  RR*  |->  -e
w )  Isom  `'  <  ,  <  ( RR* ,  RR* ) 
<->  ( w  e.  RR*  |->  -e w )  Isom  `'  <  ,  <  ( RR* ,  RR* ) ) )
2012, 19ax-mp 5 . . . . . . . 8  |-  ( `' ( w  e.  RR*  |->  -e w )  Isom  `'  <  ,  <  ( RR* ,  RR* )  <->  ( w  e.  RR*  |->  -e w ) 
Isom  `'  <  ,  <  (
RR* ,  RR* ) )
2118, 20mpbi 145 . . . . . . 7  |-  ( w  e.  RR*  |->  -e
w )  Isom  `'  <  ,  <  ( RR* ,  RR* )
2221a1i 9 . . . . . 6  |-  ( ph  ->  ( w  e.  RR*  |->  -e w )  Isom  `'  <  ,  <  ( RR* ,  RR* ) )
23 infxrnegsupex.ss . . . . . 6  |-  ( ph  ->  A  C_  RR* )
243cnvinfex 7322 . . . . . 6  |-  ( ph  ->  E. x  e.  RR*  ( A. y  e.  A  -.  x `'  <  y  /\  A. y  e.  RR*  ( y `'  <  x  ->  E. z  e.  A  y `'  <  z ) ) )
252cnvti 7323 . . . . . 6  |-  ( (
ph  /\  ( f  e.  RR*  /\  g  e. 
RR* ) )  -> 
( f  =  g  <-> 
( -.  f `'  <  g  /\  -.  g `'  <  f ) ) )
2622, 23, 24, 25supisoti 7314 . . . . 5  |-  ( ph  ->  sup ( ( ( w  e.  RR*  |->  -e
w ) " A
) ,  RR* ,  <  )  =  ( ( w  e.  RR*  |->  -e
w ) `  sup ( A ,  RR* ,  `'  <  ) ) )
2715, 26eqtrid 2279 . . . 4  |-  ( ph  ->  sup ( { z  e.  RR*  |  -e
z  e.  A } ,  RR* ,  <  )  =  ( ( w  e.  RR*  |->  -e
w ) `  sup ( A ,  RR* ,  `'  <  ) ) )
28 df-inf 7289 . . . . . . 7  |- inf ( A ,  RR* ,  <  )  =  sup ( A ,  RR* ,  `'  <  )
2928eqcomi 2238 . . . . . 6  |-  sup ( A ,  RR* ,  `'  <  )  = inf ( A ,  RR* ,  <  )
3029fveq2i 5678 . . . . 5  |-  ( ( w  e.  RR*  |->  -e
w ) `  sup ( A ,  RR* ,  `'  <  ) )  =  ( ( w  e.  RR*  |->  -e w ) ` inf ( A ,  RR* ,  <  ) )
31 eqidd 2235 . . . . . 6  |-  ( ph  ->  ( w  e.  RR*  |->  -e w )  =  ( w  e.  RR*  |->  -e w ) )
32 xnegeq 10179 . . . . . . 7  |-  ( w  = inf ( A ,  RR* ,  <  )  ->  -e w  =  -einf ( A ,  RR* ,  <  ) )
3332adantl 277 . . . . . 6  |-  ( (
ph  /\  w  = inf ( A ,  RR* ,  <  ) )  ->  -e w  =  -einf ( A ,  RR* ,  <  ) )
344xnegcld 10207 . . . . . 6  |-  ( ph  -> 
-einf ( A ,  RR* ,  <  )  e.  RR* )
3531, 33, 4, 34fvmptd 5763 . . . . 5  |-  ( ph  ->  ( ( w  e. 
RR*  |->  -e w ) `
inf ( A ,  RR* ,  <  ) )  =  -einf ( A ,  RR* ,  <  ) )
3630, 35eqtrid 2279 . . . 4  |-  ( ph  ->  ( ( w  e. 
RR*  |->  -e w ) `
 sup ( A ,  RR* ,  `'  <  ) )  =  -einf ( A ,  RR* ,  <  ) )
3727, 36eqtr2d 2268 . . 3  |-  ( ph  -> 
-einf ( A ,  RR* ,  <  )  =  sup ( { z  e.  RR*  |  -e
z  e.  A } ,  RR* ,  <  )
)
38 xnegeq 10179 . . 3  |-  (  -einf ( A ,  RR* ,  <  )  =  sup ( { z  e.  RR*  | 
-e z  e.  A } ,  RR* ,  <  )  ->  -e  -einf ( A ,  RR* ,  <  )  = 
-e sup ( { z  e.  RR*  | 
-e z  e.  A } ,  RR* ,  <  ) )
3937, 38syl 14 . 2  |-  ( ph  -> 
-e  -einf ( A ,  RR* ,  <  )  =  -e sup ( { z  e. 
RR*  |  -e z  e.  A } ,  RR* ,  <  ) )
406, 39eqtr3d 2269 1  |-  ( ph  -> inf ( A ,  RR* ,  <  )  =  -e sup ( { z  e.  RR*  |  -e
z  e.  A } ,  RR* ,  <  )
)
Colors of variables: wff set class
Syntax hints:   -. wn 3    -> wi 4    /\ wa 104    <-> wb 105    = wceq 1398    e. wcel 2205   A.wral 2522   E.wrex 2523   {crab 2526    C_ wss 3214   class class class wbr 4114    |-> cmpt 4176   `'ccnv 4753   "cima 4757   ` cfv 5357    Isom wiso 5358   supcsup 7286  infcinf 7287   RR*cxr 8323    < clt 8324    -ecxne 10121
This theorem was proved from axioms:  ax-mp 5  ax-1 6  ax-2 7  ax-ia1 106  ax-ia2 107  ax-ia3 108  ax-in1 619  ax-in2 620  ax-io 717  ax-5 1496  ax-7 1497  ax-gen 1498  ax-ie1 1542  ax-ie2 1543  ax-8 1553  ax-10 1554  ax-11 1555  ax-i12 1556  ax-bndl 1558  ax-4 1559  ax-17 1575  ax-i9 1579  ax-ial 1583  ax-i5r 1584  ax-13 2207  ax-14 2208  ax-ext 2216  ax-sep 4233  ax-pow 4292  ax-pr 4327  ax-un 4559  ax-setind 4664  ax-cnex 8234  ax-resscn 8235  ax-1cn 8236  ax-1re 8237  ax-icn 8238  ax-addcl 8239  ax-addrcl 8240  ax-mulcl 8241  ax-addcom 8243  ax-addass 8245  ax-distr 8247  ax-i2m1 8248  ax-0id 8251  ax-rnegex 8252  ax-cnre 8254  ax-pre-ltirr 8255  ax-pre-apti 8258  ax-pre-ltadd 8259
This theorem depends on definitions:  df-bi 117  df-3or 1006  df-3an 1007  df-tru 1401  df-fal 1404  df-nf 1510  df-sb 1812  df-eu 2085  df-mo 2086  df-clab 2221  df-cleq 2227  df-clel 2230  df-nfc 2375  df-ne 2415  df-nel 2510  df-ral 2527  df-rex 2528  df-reu 2529  df-rmo 2530  df-rab 2531  df-v 2817  df-sbc 3046  df-csb 3142  df-dif 3216  df-un 3218  df-in 3220  df-ss 3227  df-if 3625  df-pw 3676  df-sn 3700  df-pr 3701  df-op 3703  df-uni 3920  df-br 4115  df-opab 4177  df-mpt 4178  df-id 4419  df-xp 4760  df-rel 4761  df-cnv 4762  df-co 4763  df-dm 4764  df-rn 4765  df-res 4766  df-ima 4767  df-iota 5317  df-fun 5359  df-fn 5360  df-f 5361  df-f1 5362  df-fo 5363  df-f1o 5364  df-fv 5365  df-isom 5366  df-riota 6011  df-ov 6061  df-oprab 6062  df-mpo 6063  df-sup 7288  df-inf 7289  df-pnf 8326  df-mnf 8327  df-xr 8328  df-ltxr 8329  df-sub 8462  df-neg 8463  df-xneg 10124
This theorem is referenced by:  xrminmax  11975
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