let f be PartFunc of REAL,REAL; :: thesis: ( f is convergent_in+infty implies ( abs f is convergent_in+infty & lim_in+infty (abs f) = abs (lim_in+infty f) ) )
assume A1: f is convergent_in+infty ; :: thesis: ( abs f is convergent_in+infty & lim_in+infty (abs f) = abs (lim_in+infty f) )
A2: now
let seq be Real_Sequence; :: thesis: ( seq is divergent_to+infty & rng seq c= dom (abs f) implies ( (abs f) /* seq is convergent & lim ((abs f) /* seq) = abs (lim_in+infty f) ) )
assume that
A3: seq is divergent_to+infty and
A4: rng seq c= dom (abs f) ; :: thesis: ( (abs f) /* seq is convergent & lim ((abs f) /* seq) = abs (lim_in+infty f) )
A5: rng seq c= dom f by A4, VALUED_1:def 11;
then A6: lim (f /* seq) = lim_in+infty f by A1, A3, Def12;
lim_in+infty f = lim_in+infty f ;
then A7: f /* seq is convergent by A1, A3, A5, Def12;
then abs (f /* seq) is convergent by SEQ_4:26;
hence (abs f) /* seq is convergent by A5, RFUNCT_2:25; :: thesis: lim ((abs f) /* seq) = abs (lim_in+infty f)
thus lim ((abs f) /* seq) = lim (abs (f /* seq)) by A5, RFUNCT_2:25
.= abs (lim_in+infty f) by A7, A6, SEQ_4:27 ; :: thesis: verum
end;
now
let r be Real; :: thesis: ex g being Real st
( r < g & g in dom (abs f) )
consider g being Real such that
A8: ( r < g & g in dom f ) by A1, Def6;
take g = g; :: thesis: ( r < g & g in dom (abs f) )
thus ( r < g & g in dom (abs f) ) by A8, VALUED_1:def 11; :: thesis: verum
end;
hence abs f is convergent_in+infty by A2, Def6; :: thesis: lim_in+infty (abs f) = abs (lim_in+infty f)
hence lim_in+infty (abs f) = abs (lim_in+infty f) by A2, Def12; :: thesis: verum