Metamath Proof Explorer

Definition df-ats

Description: Define the class of poset atoms. (Contributed by NM, 18-Sep-2011)

Ref Expression
Assertion df-ats 
|- Atoms = ( p e. _V |-> { a e. ( Base ` p ) | ( 0. ` p ) (

Detailed syntax breakdown

Step Hyp Ref Expression
0 catm 
 |-  Atoms
1 vp 
 |-  p
2 cvv 
 |-  _V
3 va 
 |-  a
4 cbs 
 |-  Base
5 1 cv 
 |-  p
6 5 4 cfv 
 |-  ( Base ` p )
7 cp0 
 |-  0.
8 5 7 cfv 
 |-  ( 0. ` p )
9 ccvr 
 |-
10 5 9 cfv 
 |-  (
11 3 cv 
 |-  a
12 8 11 10 wbr 
 |-  ( 0. ` p ) (
13 12 3 6 crab 
 |-  { a e. ( Base ` p ) | ( 0. ` p ) (
14 1 2 13 cmpt 
 |-  ( p e. _V |-> { a e. ( Base ` p ) | ( 0. ` p ) (
15 0 14 wceq 
 |-  Atoms = ( p e. _V |-> { a e. ( Base ` p ) | ( 0. ` p ) (