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Related theorems GIF version |
| Description: This is our first axiom
for a complex Hilbert space, which is the
foundation for quantum mechanics and quantum field theory. We assume
that there exists a primitive class, ℋ, which contains objects
called vectors.
The 18 axioms for a complex Hilbert space consist of ax-hilex 8824, ax-hfvadd 8825, ax-hvcom 8826, ax-hvass 8827, ax-hv0cl 8828, ax-hvaddid 8829, ax-hfvmul 8830, ax-hvmulid 8831, ax-hvmulass 8832, ax-hvdistr1 8833, ax-hvdistr2 8834, ax-hvmul0 8835, ax-hfi 8901, ax-his1 8904, ax-his2 8905, ax-his3 8906, ax-his4 8907, and ax-hcompl 9026. The axioms specify the properties of 5 primitive symbols, ℋ, +h, ·h, 0h, and ·ih. If can prove in ZFC set theory that a class U = ⟨⟨ +h , ·h ⟩, normh⟩ is a complex Hilbert space, i.e. that U ∈ CHil, then these axioms can be proved as theorems axhilex 8806, axhfvadd 8807, axhvcom 8808, axhvass 8809, axhv0cl 8810, axhvaddid 8811 , axhfvmul 8812, axhvmulid 8813, axhvmulass 8814, axhvdistr1 8815, axhvdistr2 8816 , axhvmul0 8817, axhfi 8818, axhis1 8819, axhis2 8820, axhis3 8821, axhis4 8822, and axhcompl 8823 respectively. In that case, the theorems of the Hilbert Space Explorer will become theorems of ZFC set theory. See also the comments in axhilex 8806. |
| Ref | Expression |
|---|---|
| ax-hilex | ⊢ ℋ ∈ V |
| Step | Hyp | Ref | Expression |
|---|---|---|---|
| 1 | chil 8743 | . 2 class ℋ | |
| 2 | cvv 1808 | . 2 class V | |
| 3 | 1, 2 | wcel 957 | 1 wff ℋ ∈ V |
| Colors of variables: wff set class |
| This axiom is referenced by: hvmulex 8836 hilabl 8982 hhph 9000 shex 9032 sh 9033 hhssnm 9086 hhsssh2 9095 ocvalt 9108 pjmvalt 9193 shsumvalt 9232 spanvalt 9254 hsupval2t 9255 sshjvalt 9275 sshjval3t 9281 hosmvalt 9468 hommvalt 9469 hodmvalt 9470 hfsmvalt 9471 hfmmvalt 9472 pjmfn 9617 pjmf1 9618 nmopvalt 9739 elcnopt 9740 ellnopt 9741 elunopt 9756 elhmopt 9757 hmopex 9759 nmfnvalt 9760 nlfnvalt 9765 elcnfnt 9766 ellnfnt 9767 adjvalt 9771 dmadjss 9776 dmadjopt 9777 eigvecvalt 9779 eigvalvalt 9780 specvalt 9781 adjeqt 9816 bravalt 9824 kbvalt 9833 cnlnadjlem4 9959 cnlnadjlem5 9960 adjbdlnt 9972 nmopadjle 9977 rnbra 9996 bra11 9997 leoprf2t 10016 |