9 .1 Families of Tunctions and Pointwise Convergence 545Examples 9.1. 7 We give here some examples of sequences {fn} and their
pointwise limits. Exercise 2 asks you to prove the claims made here.(a) Let S = [O, 1] and fn(x) = xn. The Y
graphs of fn for n = 1, 2, 3, 4 are shown in
Figure 9.1. It is clear from Theorem 2.3.7
that the pointwise limit of the sequence
{! n} is the functionf ( x) = { 0 ~f 0 ::; x < 1;
l1fx=l.(See Figure 9.1.) Thus we say
fn --t f (pointwise) on [O, l].(b) Let S = [O, 1] and define fn : [O, 1] --t JR
b f (x) = { 2n - 2n
2
x if 0::; x::; ~;
Y n 0 if .1 n < X < - 1.
The graph of a typical f n is shown in Figure 9.2.
It is clear that the pointwise limit of {f n} on
(0, 1] is f(x) = 0, but the pointwise limit does
not exist on [O, 1] because lim fn(O) does
n->oo
not exist.
(c) Let S = [-1, 1] and define fn:
[-1, 1] --) JR{.!. if [x[ < .!..
by fn(x) = [~[ if ~ <-[; ['::; 1.
The graph of a typical f n is shown in
Figure 9.3.
It is clear that the pointwise limit of
xFigure 9. 1y
(0, 2n)- II x
Figure 9.2
y- II
{fn} on [- 1, 1] is f(x) =[xi- --+-l---_-+l.--+--+1.----+--x
IZ ll
Figure 9.3
(d) Let S = [O, 1] and define fn : [O, 1] --t JR{1 if x = 0, or x = T for some
by fn(x) = relatively prime m, k EN,
where k ::; n;
0 otherwise.