let X be non empty right_complementable add-associative right_zeroed CNORMSTR ; :: thesis: for seq being sequence of X st ( for n being Element of NAT holds seq . n = 0. X ) holds
for m being Element of NAT holds (Partial_Sums seq) . m = 0. X
let seq be sequence of X; :: thesis: ( ( for n being Element of NAT holds seq . n = 0. X ) implies for m being Element of NAT holds (Partial_Sums seq) . m = 0. X )
assume A1: for n being Element of NAT holds seq . n = 0. X ; :: thesis: for m being Element of NAT holds (Partial_Sums seq) . m = 0. X
let m be Element of NAT ; :: thesis: (Partial_Sums seq) . m = 0. X
defpred S1[ Element of NAT ] means seq . $1 = (Partial_Sums seq) . $1;
A2: for k being Element of NAT st S1[k] holds
S1[k + 1]
proof
let k be Element of NAT ; :: thesis: ( S1[k] implies S1[k + 1] )
assume A3: S1[k] ; :: thesis: S1[k + 1]
thus seq . (k + 1) = (0. X) + (seq . (k + 1)) by RLVECT_1:4
.= ((Partial_Sums seq) . k) + (seq . (k + 1)) by A1, A3
.= (Partial_Sums seq) . (k + 1) by BHSP_4:def 1 ; :: thesis: verum
end;
A4: S1[ 0 ] by BHSP_4:def 1;
for n being Element of NAT holds S1[n] from NAT_1:sch 1(A4, A2);
 then seq = Partial_Sums seq by FUNCT_2:63;
hence (Partial_Sums seq) . m = 0. X by A1; :: thesis: verum