Metamath Proof Explorer


Definition df-ch

Description: Define the set of closed subspaces of a Hilbert space. A closed subspace is one in which the limit of every convergent sequence in the subspace belongs to the subspace. For its membership relation, see isch . From Definition of Beran p. 107. Alternate definitions are given by isch2 and isch3 . (Contributed by NM, 17-Aug-1999) (New usage is discouraged.)

Ref Expression
Assertion df-ch
|- CH = { h e. SH | ( ~~>v " ( h ^m NN ) ) C_ h }

Detailed syntax breakdown

Step Hyp Ref Expression
0 cch
 |-  CH
1 vh
 |-  h
2 csh
 |-  SH
3 chli
 |-  ~~>v
4 1 cv
 |-  h
5 cmap
 |-  ^m
6 cn
 |-  NN
7 4 6 5 co
 |-  ( h ^m NN )
8 3 7 cima
 |-  ( ~~>v " ( h ^m NN ) )
9 8 4 wss
 |-  ( ~~>v " ( h ^m NN ) ) C_ h
10 9 1 2 crab
 |-  { h e. SH | ( ~~>v " ( h ^m NN ) ) C_ h }
11 0 10 wceq
 |-  CH = { h e. SH | ( ~~>v " ( h ^m NN ) ) C_ h }