let X be ComplexUnitarySpace; for seq being sequence of X holds Sum (seq,1,0) = seq . 1
let seq be sequence of X; Sum (seq,1,0) = seq . 1
Sum (seq,1,0) =
((seq . 0) + (seq . 1)) - (Sum (seq,0))
by Th17
.=
((seq . 1) + (seq . 0)) - (seq . 0)
by BHSP_4:def 1
.=
(seq . 1) + ((seq . 0) - (seq . 0))
by RLVECT_1:def 3
.=
(seq . 1) + H1(X)
by RLVECT_1:15
;
hence
Sum (seq,1,0) = seq . 1
by RLVECT_1:4; verum