nmcopex - Hilbert Space Explorer

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Theorem nmcopex 11596

Description: The norm of a continuous linear Hilbert space operator exists. Theorem 3.5(i) of [Beran] p. 99.

**Assertion**
Ref	Expression
nmcopex	LinOp $/\$ ConOp norm_op

**Proof of Theorem nmcopex**
Step	Hyp	Ref	Expression
1		elin 2786	. 2 LinOp ConOp LinOp $/\$ ConOp
2		fveq2 4681	. . . 4 LinOp ConOp norm_op norm_op LinOp ConOp
3	2	eleq1d 1963	. . 3 LinOp ConOp norm_op norm_op LinOp ConOp
4		elin 2786	. . . . . . . 8 LinOp ConOp LinOp $/\$ ConOp
5		idlnop 11554	. . . . . . . 8 LinOp
6		idcnop 11542	. . . . . . . 8 ConOp
7	4, 5, 6	mpbir2an 800	. . . . . . 7 LinOp ConOp
8	7	elimel 3025	. . . . . 6 LinOp ConOp LinOp ConOp
9		elin 2786	. . . . . 6 LinOp ConOp LinOp ConOp LinOp ConOp LinOp $/\$ LinOp ConOp ConOp
10	8, 9	mpbi 206	. . . . 5 LinOp ConOp LinOp $/\$ LinOp ConOp ConOp
11	10	simpli 347	. . . 4 LinOp ConOp LinOp
12	10	simpri 351	. . . 4 LinOp ConOp ConOp
13	11, 12	nmcopexi 11594	. . 3 norm_op LinOp ConOp
14	3, 13	dedth 3011	. 2 LinOp ConOp norm_op
15	1, 14	sylbir 218	1 LinOp $/\$ ConOp norm_op

Colors of variables: wff set class

Syntax hints:

wi 3 $/\$ wa 240

wceq 1298

wcel 1300

cin 2592

cif 2982

cid 3582

cres 3988

cfv 3998

cr 6385

chil 10420 norm_opcnop 10446 ConOpcco 10447 LinOpclo 10448

This theorem is referenced by: lnopconi 11600 lnopcnbd 11602

This theorem was proved from axioms: ax-1 4 ax-2 5 ax-3 6 ax-mp 7 ax-7 1304 ax-gen 1305 ax-8 1306 ax-9 1307 ax-10 1308 ax-11 1309 ax-12 1310 ax-13 1311 ax-14 1312 ax-17 1317 ax-4 1319 ax-5o 1321 ax-6o 1324 ax-9o 1481 ax-10o 1500 ax-16 1580 ax-11o 1588 ax-ext 1865 ax-rep 3428 ax-sep 3438 ax-nul 3445 ax-pow 3481 ax-pr 3524 ax-un 3790 ax-inf2 5731 ax-hilex 10501 ax-hfvadd 10502 ax-hvcom 10503 ax-hvass 10504 ax-hv0cl 10505 ax-hvaddid 10506 ax-hfvmul 10507 ax-hvmulid 10508 ax-hvmulass 10509 ax-hvdistr1 10510 ax-hvdistr2 10511 ax-hvmul0 10512 ax-hfi 10579 ax-his1 10582 ax-his2 10583 ax-his3 10584 ax-his4 10585

This theorem depends on definitions: df-bi 164 df-or 241 df-an 242 df-3or 859 df-3an 860 df-ex 1327 df-sb 1536 df-eu 1775 df-mo 1776 df-clab 1872 df-cleq 1877 df-clel 1880 df-ne 2019 df-nel 2020 df-ral 2109 df-rex 2110 df-reu 2111 df-rab 2112 df-v 2294 df-sbc 2454 df-csb 2541 df-dif 2597 df-un 2600 df-in 2603 df-ss 2605 df-pss 2607 df-nul 2876 df-if 2983 df-pw 3035 df-sn 3049 df-pr 3050 df-tp 3052 df-op 3053 df-uni 3178 df-int 3215 df-iun 3257 df-br 3339 df-opab 3396 df-tr 3412 df-eprel 3583 df-id 3586 df-po 3591 df-so 3604 df-fr 3625 df-we 3644 df-ord 3660 df-on 3661 df-lim 3662 df-suc 3663 df-om 3950 df-xp 4000 df-rel 4001 df-cnv 4002 df-co 4003 df-dm 4004 df-rn 4005 df-res 4006 df-ima 4007 df-fun 4008 df-fn 4009 df-f 4010 df-f1 4011 df-fo 4012 df-f1o 4013 df-fv 4014 df-opr 4886 df-oprab 4887 df-mpt 5006 df-1st 5020 df-2nd 5021 df-iota 5089 df-rdg 5140 df-1o 5177 df-oadd 5179 df-omul 5180 df-er 5318 df-ec 5320 df-qs 5323 df-map 5383 df-en 5427 df-dom 5428 df-sdom 5429 df-undef 5556 df-riota 5560 df-sup 5664 df-ni 6152 df-pli 6153 df-mi 6154 df-lti 6155 df-plpq 6187 df-mpq 6188 df-enq 6189 df-nq 6190 df-plq 6191 df-mq 6192 df-rq 6193 df-ltq 6194 df-1q 6195 df-np 6238 df-1p 6239 df-plp 6240 df-mp 6241 df-ltp 6242 df-plpr 6316 df-mpr 6317 df-enr 6318 df-nr 6319 df-plr 6320 df-mr 6321 df-ltr 6322 df-0r 6323 df-1r 6324 df-m1r 6325 df-c 6392 df-0 6393 df-1 6394 df-i 6395 df-r 6396 df-plus 6397 df-mul 6398 df-lt 6399 df-sub 6511 df-neg 6513 df-pnf 6654 df-mnf 6655 df-xr 6656 df-ltxr 6657 df-le 6658 df-div 6892 df-n 7108 df-2 7154 df-3 7155 df-4 7156 df-n0 7309 df-z 7345 df-uz 7587 df-seq1 7721 df-exp 7812 df-sqr 7920 df-re 8001 df-im 8002 df-cj 8003 df-abs 8004 df-grp 9316 df-gid 9317 df-ginv 9318 df-abl 9408 df-vc 9497 df-nv 9543 df-va 9546 df-ba 9547 df-sm 9548 df-0v 9549 df-nm 9551 df-hnorm 10469 df-hvsub 10472 df-nmop 11402 df-cnop 11403 df-lnop 11404 df-unop 11406