Metamath Proof Explorer

Definition df-lvols

Description: Define the set of all 3-dimensional "lattice volumes" (lattice elements which cover a plane) in a Hilbert lattice k , in other words all elements of height 4 (or lattice dimension 4 or projective dimension 3). (Contributed by NM, 1-Jul-2012)

Ref Expression
Assertion df-lvols 
|- LVols = ( k e. _V |-> { x e. ( Base ` k ) | E. p e. ( LPlanes ` k ) p (

Detailed syntax breakdown

Step Hyp Ref Expression
0 clvol 
 |-  LVols
1 vk 
 |-  k
2 cvv 
 |-  _V
3 vx 
 |-  x
4 cbs 
 |-  Base
5 1 cv 
 |-  k
6 5 4 cfv 
 |-  ( Base ` k )
7 vp 
 |-  p
8 clpl 
 |-  LPlanes
9 5 8 cfv 
 |-  ( LPlanes ` k )
10 7 cv 
 |-  p
11 ccvr 
 |-
12 5 11 cfv 
 |-  (
13 3 cv 
 |-  x
14 10 13 12 wbr 
 |-  p (
15 14 7 9 wrex 
 |-  E. p e. ( LPlanes ` k ) p (
16 15 3 6 crab 
 |-  { x e. ( Base ` k ) | E. p e. ( LPlanes ` k ) p (
17 1 2 16 cmpt 
 |-  ( k e. _V |-> { x e. ( Base ` k ) | E. p e. ( LPlanes ` k ) p (
18 0 17 wceq 
 |-  LVols = ( k e. _V |-> { x e. ( Base ` k ) | E. p e. ( LPlanes ` k ) p (