let O be set ; for G being GroupWithOperators of O
for s1, s2 being CompositionSeries of G ex s19, s29 being CompositionSeries of G st
( s19 is_finer_than s1 & s29 is_finer_than s2 & s19 is_equivalent_with s29 )
let G be GroupWithOperators of O; for s1, s2 being CompositionSeries of G ex s19, s29 being CompositionSeries of G st
( s19 is_finer_than s1 & s29 is_finer_than s2 & s19 is_equivalent_with s29 )
let s1, s2 be CompositionSeries of G; ex s19, s29 being CompositionSeries of G st
( s19 is_finer_than s1 & s29 is_finer_than s2 & s19 is_equivalent_with s29 )
per cases
( ( len s1 > 1 & len s2 > 1 ) or len s1 <= 1 or len s2 <= 1 )
;
suppose A1:
(
len s1 > 1 &
len s2 > 1 )
;
ex s19, s29 being CompositionSeries of G st
( s19 is_finer_than s1 & s29 is_finer_than s2 & s19 is_equivalent_with s29 )set s29 =
the_schreier_series_of s2,
s1;
set s19 =
the_schreier_series_of s1,
s2;
take
the_schreier_series_of s1,
s2
;
ex s29 being CompositionSeries of G st
( the_schreier_series_of s1,s2 is_finer_than s1 & s29 is_finer_than s2 & the_schreier_series_of s1,s2 is_equivalent_with s29 )take
the_schreier_series_of s2,
s1
;
( the_schreier_series_of s1,s2 is_finer_than s1 & the_schreier_series_of s2,s1 is_finer_than s2 & the_schreier_series_of s1,s2 is_equivalent_with the_schreier_series_of s2,s1 )thus
(
the_schreier_series_of s1,
s2 is_finer_than s1 &
the_schreier_series_of s2,
s1 is_finer_than s2 )
by A1, Th116;
the_schreier_series_of s1,s2 is_equivalent_with the_schreier_series_of s2,s1thus
the_schreier_series_of s1,
s2 is_equivalent_with the_schreier_series_of s2,
s1
by A1, Th117;
verum end;