8.5 Series of Products 497n
Lemma 8.5.5 (a) Vt E JR, the partial sums I:: sin kt are bounded.
k=l
n
(b) Vt f=. 2p7r, (p E Z), the partial sums I:: cos kt are bounded.
k=l
n
Proof. (a) Lett be a real number and Vn E N , let Sn = I:: sin kt. If
k=l
n
t = 2p7r for some p E Z, all terms of I:: sin kt are 0, hence t his sum is bounded.
k=l
So in the remainder of the proof we assume t is not an integral multiple of 271".
cos ~ - cos ( n + ~) t
By Lemma 8.5.4, Sn =. t , so Vn E N,
2sm 2IS I < icos(~)I + icos (n +~)ti < 2.
n - I 2 sin ~ I - I 2 sin ~ ISince tis a fixed real number, ISnl is bounded above.
(b) Exercise 7. •With the help of the two previous lemmas and Dirichlet's test, we can easily
prove the following important result about trigonometric series.
Theorem 8.5.6 If { ak} is a monotone decreasing sequence converging to 0,
then
00
(a) I:: ak sin kt converges Vt E JR, and
k=l
00
(b) I:: ak cos kt converges Vt f=. 2p7r, (p E Z)
k=l
(and may also converge when t = 2p7r).
Proof. Exercise 8. •00 1
Examples 8.5.7 (a) I:: -k sin kt converges Vt ER
k=l
00 1
(b) I:: -cos kt converges Vt f=. 2p7r, and diverges Vt = 2p7r, (p E Z).
k=l k
00 1 00 1
( c) Both I:: 2 sin kt and I:: k 2 cos kt converge (absolutely) Vt E R
k=l k k=l
Another test of convergence of series of products, closely related to Dirich-
let's test, is Abel's test.