let X be ComplexNormSpace; :: thesis: for s1, s2 being sequence of X holds (Partial_Sums s1) + (Partial_Sums s2) = Partial_Sums (s1 + s2)
let s1, s2 be sequence of X; :: thesis: (Partial_Sums s1) + (Partial_Sums s2) = Partial_Sums (s1 + s2)
A1: ((Partial_Sums s1) + (Partial_Sums s2)) . 0 = ((Partial_Sums s1) . 0 ) + ((Partial_Sums s2) . 0 ) by NORMSP_1:def 5
.= (s1 . 0 ) + ((Partial_Sums s2) . 0 ) by BHSP_4:def 1
.= (s1 . 0 ) + (s2 . 0 ) by BHSP_4:def 1
.= (s1 + s2) . 0 by NORMSP_1:def 5 ;
now
let n be Element of NAT ; :: thesis: ((Partial_Sums s1) + (Partial_Sums s2)) . (n + 1) = (((Partial_Sums s1) + (Partial_Sums s2)) . n) + ((s1 + s2) . (n + 1))
thus ((Partial_Sums s1) + (Partial_Sums s2)) . (n + 1) = ((Partial_Sums s1) . (n + 1)) + ((Partial_Sums s2) . (n + 1)) by NORMSP_1:def 5
.= (((Partial_Sums s1) . n) + (s1 . (n + 1))) + ((Partial_Sums s2) . (n + 1)) by BHSP_4:def 1
.= (((Partial_Sums s1) . n) + (s1 . (n + 1))) + ((s2 . (n + 1)) + ((Partial_Sums s2) . n)) by BHSP_4:def 1
.= ((((Partial_Sums s1) . n) + (s1 . (n + 1))) + (s2 . (n + 1))) + ((Partial_Sums s2) . n) by RLVECT_1:def 6
.= (((Partial_Sums s1) . n) + ((s1 . (n + 1)) + (s2 . (n + 1)))) + ((Partial_Sums s2) . n) by RLVECT_1:def 6
.= (((Partial_Sums s1) . n) + ((s1 + s2) . (n + 1))) + ((Partial_Sums s2) . n) by NORMSP_1:def 5
.= (((Partial_Sums s1) . n) + ((Partial_Sums s2) . n)) + ((s1 + s2) . (n + 1)) by RLVECT_1:def 6
.= (((Partial_Sums s1) + (Partial_Sums s2)) . n) + ((s1 + s2) . (n + 1)) by NORMSP_1:def 5 ; :: thesis: verum
end;
hence (Partial_Sums s1) + (Partial_Sums s2) = Partial_Sums (s1 + s2) by A1, BHSP_4:def 1; :: thesis: verum