let X be Complex_Banach_Algebra; for z being Element of X holds
( (exp z) * (exp (- z)) = 1. X & (exp (- z)) * (exp z) = 1. X )
let z be Element of X; ( (exp z) * (exp (- z)) = 1. X & (exp (- z)) * (exp z) = 1. X )
z * (- z) =
z * ((- 1r) * z)
by CLOPBAN3:38
.=
(- 1r) * (z * z)
by CLOPBAN3:38
.=
((- 1r) * z) * z
by CLOPBAN3:38
.=
(- z) * z
by CLOPBAN3:38
;
then A1:
z, - z are_commutative
by LOPBAN_4:def 1;
hence (exp z) * (exp (- z)) =
exp (z + (- z))
by Th34
.=
exp (0. X)
by RLVECT_1:5
.=
1. X
by Th36
;
(exp (- z)) * (exp z) = 1. X
thus (exp (- z)) * (exp z) =
exp ((- z) + z)
by A1, Th34
.=
exp (0. X)
by RLVECT_1:5
.=
1. X
by Th36
; verum