reldmopsr

Description: Lemma for ordered power series. (Contributed by Stefan O'Rear, 2-Oct-2015)

		Ref	Expression
	Assertion	reldmopsr	\|- Rel dom ordPwSer

Proof

Step	Hyp	Ref	Expression
1		df-opsr	\|- ordPwSer = ( i e. _V , s e. _V \|-> ( r e. ~P ( i X. i ) \|-> [_ ( i mPwSer s ) / p ]_ ( p sSet <. ( le ` ndx ) , { <. x , y >. \| ( { x , y } C_ ( Base ` p ) /\ ( [. { h e. ( NN0 ^m i ) \| ( `' h " NN ) e. Fin } / d ]. E. z e. d ( ( x ` z ) ( lt ` s ) ( y ` z ) /\ A. w e. d ( w ( r ( x ` w ) = ( y ` w ) ) ) \/ x = y ) ) } >. ) ) )
2	1	reldmmpo	\|- Rel dom ordPwSer

Step

Hyp

Ref

Expression

df-opsr

 |-  ordPwSer = ( i e. _V , s e. _V |-> ( r e. ~P ( i X. i ) |-> [_ ( i mPwSer s ) / p ]_ ( p sSet <. ( le ` ndx ) , { <. x , y >. | ( { x , y } C_ ( Base ` p ) /\ ( [. { h e. ( NN0 ^m i ) | ( `' h " NN ) e. Fin } / d ]. E. z e. d ( ( x ` z ) ( lt ` s ) ( y ` z ) /\ A. w e. d ( w ( r  ( x ` w ) = ( y ` w ) ) ) \/ x = y ) ) } >. ) ) )

reldmmpo

 |-  Rel dom ordPwSer

Metamath Proof Explorer

Theorem reldmopsr

Proof