Metamath Proof Explorer

 |-  ( _I |` ~H ) : ~H -1-1-onto-> ~H

 |-  ( ( _I |` ~H ) : ~H -1-1-onto-> ~H -> ( _I |` ~H ) : ~H --> ~H )

 |-  ( _I |` ~H ) : ~H --> ~H

 |-  ( y e. RR+ -> y e. RR+ )

 |-  ( w e. ~H -> ( ( _I |` ~H ) ` w ) = w )

 |-  ( x e. ~H -> ( ( _I |` ~H ) ` x ) = x )

 |-  ( ( x e. ~H /\ w e. ~H ) -> ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) = ( w -h x ) )

 |-  ( ( x e. ~H /\ w e. ~H ) -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) = ( normh ` ( w -h x ) ) )

 |-  ( ( x e. ~H /\ w e. ~H ) -> ( ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y <-> ( normh ` ( w -h x ) ) < y ) )

 |-  ( ( x e. ~H /\ w e. ~H ) -> ( ( normh ` ( w -h x ) ) < y -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) )

 |-  ( x e. ~H -> A. w e. ~H ( ( normh ` ( w -h x ) ) < y -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) )

 |-  ( z = y -> ( ( normh ` ( w -h x ) ) < z <-> ( normh ` ( w -h x ) ) < y ) )

 |-  ( ( y e. RR+ /\ A. w e. ~H ( ( normh ` ( w -h x ) ) < y -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) ) -> E. z e. RR+ A. w e. ~H ( ( normh ` ( w -h x ) ) < z -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) )

 |-  ( ( x e. ~H /\ y e. RR+ ) -> E. z e. RR+ A. w e. ~H ( ( normh ` ( w -h x ) ) < z -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) )

 |-  A. x e. ~H A. y e. RR+ E. z e. RR+ A. w e. ~H ( ( normh ` ( w -h x ) ) < z -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y )

 |-  ( ( _I |` ~H ) e. ContOp <-> ( ( _I |` ~H ) : ~H --> ~H /\ A. x e. ~H A. y e. RR+ E. z e. RR+ A. w e. ~H ( ( normh ` ( w -h x ) ) < z -> ( normh ` ( ( ( _I |` ~H ) ` w ) -h ( ( _I |` ~H ) ` x ) ) ) < y ) ) )

 |-  ( _I |` ~H ) e. ContOp