dmdbr4at - Hilbert Space Explorer

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Theorem dmdbr4at 10333

Description: Dual modular pair property in terms of atoms.

**Hypotheses**
Ref	Expression
sumdmdi.1	⊢ A ∈ C_ℋ
sumdmdi.2	⊢ B ∈ C_ℋ

**Assertion**
Ref	Expression
dmdbr4at	⊢ (A M_ℋ^* B ↔ ∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B))

Distinct variable groups: x,A x,B

**Proof of Theorem dmdbr4at**
Step	Hyp	Ref	Expression
1		sumdmdi.1	. . . 4 ⊢ A ∈ C_ℋ
2		sumdmdi.2	. . . 4 ⊢ B ∈ C_ℋ
3		dmdbr4 10218	. . . 4 ⊢ ((A ∈ C_ℋ ⋀ B ∈ C_ℋ ) → (A M_ℋ^* B ↔ ∀x ∈ C_ℋ ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B)))
4	1, 2, 3	mp2an 697	. . 3 ⊢ (A M_ℋ^* B ↔ ∀x ∈ C_ℋ ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B))
5		atelch 10256	. . . . 5 ⊢ (x ∈ Atoms → x ∈ C_ℋ )
6	5	imim1i 16	. . . 4 ⊢ ((x ∈ C_ℋ → ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B)) → (x ∈ Atoms → ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B)))
7	6	r19.20i2 1703	. . 3 ⊢ (∀x ∈ C_ℋ ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B) → ∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B))
8	4, 7	sylbi 199	. 2 ⊢ (A M_ℋ^* B → ∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B))
9	1, 2	sumdmdlem2 10331	. . 3 ⊢ (∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B) → (A +_ℋ B) = (A ∨_ℋ B))
10	1, 2	sumdmd 10332	. . 3 ⊢ ((A +_ℋ B) = (A ∨_ℋ B) ↔ A M_ℋ^* B)
11	9, 10	sylib 198	. 2 ⊢ (∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B) → A M_ℋ^* B)
12	8, 11	impbi 157	1 ⊢ (A M_ℋ^* B ↔ ∀x ∈ Atoms ((x ∨_ℋ B) ∩ (A ∨_ℋ B)) ⊆ (((x ∨_ℋ B) ∩ A) ∨_ℋ B))

Colors of variables: wff set class

Syntax hints: ↔ wb 146 = wceq 956 ∈ wcel 958 ∀wral 1645 ∩ cin 2046 ⊆ wss 2047 class class class wbr 2619 (class class class)co 3963 C_ℋ cch 8783 +_ℋ cph 8785 ∨_ℋ chj 8787 Atomscat 8818 M_ℋ^* cdmd 8821

This theorem was proved from axioms: ax-1 4 ax-2 5 ax-3 6 ax-mp 7 ax-7 962 ax-gen 963 ax-8 964 ax-9 965 ax-10 966 ax-11 967 ax-12 968 ax-13 969 ax-14 970 ax-17 971 ax-4 973 ax-5o 975 ax-6o 978 ax-9o 1123 ax-10o 1140 ax-16 1210 ax-11o 1218 ax-ext 1459 ax-rep 2693 ax-sep 2703 ax-nul 2710 ax-pow 2742 ax-pr 2779 ax-un 2866 ax-reg 4585 ax-inf2 4617 ax-ac 4736 ax-hilex 8854 ax-hfvadd 8855 ax-hvcom 8856 ax-hvass 8857 ax-hv0cl 8858 ax-hvaddid 8859 ax-hfvmul 8860 ax-hvmulid 8861 ax-hvmulass 8862 ax-hvdistr1 8863 ax-hvdistr2 8864 ax-hvmul0 8865 ax-hfi 8931 ax-his1 8934 ax-his2 8935 ax-his3 8936 ax-his4 8937 ax-hcompl 9056

This theorem depends on definitions: df-bi 147 df-or 224 df-an 225 df-3or 776 df-3an 777 df-ex 981 df-sb 1172 df-eu 1382 df-mo 1383 df-clab 1464 df-cleq 1469 df-clel 1472 df-ne 1587 df-nel 1588 df-ral 1649 df-rex 1650 df-reu 1651 df-rab 1652 df-v 1812 df-sbc 1942 df-csb 2002 df-dif 2049 df-un 2050 df-in 2051 df-ss 2053 df-pss 2055 df-nul 2281 df-if 2362 df-pw 2402 df-sn 2412 df-pr 2413 df-tp 2415 df-op 2416 df-uni 2504 df-int 2534 df-iun 2568 df-iin 2569 df-br 2620 df-opab 2667 df-tr 2681 df-eprel 2832 df-id 2835 df-po 2840 df-so 2850 df-fr 2917 df-we 2934 df-ord 2951 df-on 2952 df-lim 2953 df-suc 2954 df-om 3132 df-xp 3184 df-rel 3185 df-cnv 3186 df-co 3187 df-dm 3188 df-rn 3189 df-res 3190 df-ima 3191 df-fun 3192 df-fn 3193 df-f 3194 df-f1 3195 df-fo 3196 df-f1o 3197 df-fv 3198 df-rdg 3932 df-opr 3965 df-oprab 3966 df-1st 4079 df-2nd 4080 df-1o 4133 df-oadd 4135 df-omul 4136 df-er 4261 df-ec 4263 df-qs 4266 df-map 4324 df-en 4368 df-dom 4369 df-sdom 4370 df-sup 4566 df-r1 4635 df-rank 4636 df-ni 4992 df-pli 4993 df-mi 4994 df-lti 4995 df-plpq 5027 df-mpq 5028 df-enq 5029 df-nq 5030 df-plq 5031 df-mq 5032 df-rq 5033 df-ltq 5034 df-1q 5035 df-np 5078 df-1p 5079 df-plp 5080 df-mp 5081 df-ltp 5082 df-plpr 5156 df-mpr 5157 df-enr 5158 df-nr 5159 df-plr 5160 df-mr 5161 df-ltr 5162 df-0r 5163 df-1r 5164 df-m1r 5165 df-c 5232 df-0 5233 df-1 5234 df-i 5235 df-r 5236 df-plus 5237 df-mul 5238 df-lt 5239 df-sub 5348 df-neg 5350 df-pnf 5479 df-mnf 5480 df-xr 5481 df-ltxr 5482 df-le 5483 df-div 5691 df-n 5913 df-2 5958 df-3 5959 df-4 5960 df-n0 6088 df-z 6124 df-fl 6212 df-q 6242 df-seq1 6294 df-shft 6327 df-ioo 6347 df-uz 6404 df-fz 6454 df-seqz 6519 df-exp 6555 df-sqr 6656 df-re 6737 df-im 6738 df-cj 6739 df-abs 6740 df-clim 6960 df-sum 6965 df-top 7577 df-bases 7579 df-topgen 7580 df-cld 7648 df-ntr 7649 df-cls 7650 df-cn 7739 df-cnp 7740 df-haus 7767 df-met 7778 df-bl 7780 df-opn 7781 df-lm 7907 df-grp 8022 df-gid 8023 df-ginv 8024 df-gdiv 8025 df-abl 8085 df-vc 8150 df-nv 8196 df-va 8199 df-ba 8200 df-sm 8201 df-0v 8202 df-vs 8203 df-nm 8204 df-ims 8205 df-ip 8335 df-ph 8457 df-hnorm 8822 df-hvsub 8825 df-hlim 8826 df-hcau 8827 df-sh 9061 df-ch 9077 df-oc 9109 df-ch0 9110 df-pj 9222 df-shsum 9258 df-span 9259 df-chj 9260 df-cv 10191 df-dmd 10193 df-at 10250