68 CHAPTER 2 • COMPLEX FUNCTIONS
periodic with period ~, so f is in general an n -to-one function; that is, n points
in the z plane are mapped onto each nonzero point in the w plane.
If we now restrict the domain of w = f (z) = zn to the region
{
E = re• ~ : r > 0 and n -7r < 0 :::; 7r} n ,then the image of E under the mapping w = zn can be described by the set
F = {pei.P: p > 0 and - w < ¢:::; w},
which consists of all points in the w plane except the point w = 0. The inverse
mapping of/, which we denote g, is then
l. .I.. t
z =g(w) =w• =p"e' • ,where w E F. That is,
1 l .Andw)
z =g(w)=wn=lw lne• n ,where w =/= O. As with the principal square root function, we make an analogous
definition for nth roots.Definition 2.2: Principal nth root
The function
I J. · Ar«-( w }g (w) = wn = lwl n e' n , for w =/= 0,
is called the principal nth root functio n.
We leave as an exercise to show that f and g are inverses of each other that
map the set E one-to-one and onto the set F and the set F one- to-one and onto
the set E, respectively. F igure 2.16 illustrates this relationship.yw=txz= wkt
Figure 2 .16 The mappings w = z" and z = wn:.vu