84 CHAPTER 2 • COMPLEX FUNCTIONSThe beauty of this structure is that it makes this "full square root func-
tion" continuous for all z =F O. Normally, the principal square root function
would be discontinuous along the negative real axis, as points near - 1 but above
that axis would get mapped to poin ts close to i, and points near - 1 but below
the axis would get mapped to points close to - i. As Figure 2.20(c) indicates,
however, between the point A and the point B, the domain switches from the
edge of D 1 in the upper half-plane to the edge of Di in the lower half-plane.
The corresponding mapped points A' and B
1
are exactly where they should be.
The surface works in sucli a way that going directly between the edges of D1 in
the upper and lower half-planes is impossible (likewise for Dz}. Going counter-
clockwise, the only way to get from the point A to the point C, for example, is
to follow the path indicated by t he arrows in Figure 2.20(c).
-------~EXERCISES FOR SECTION 2.4
- Let Ji (z) and h (z) be the two branches of the square root function given by
Equations (2-28) and (2-29), respectively. Use the polar coordinate formulas in
Section 2.2 to find the image of
(a) quadrant II, x < 0 and y > 0, under the mapping w = fi (z).
(b) quadrant II, x < 0 a.nd y > 0, under the mapping w = fz (z).
(c) the right half-plane Re(z) > 0 under the mapping w = fi (z).
(d) the right half-plane Re(z) > 0 under the mapping w = fz (z).2. Let c:t = 0 in Equation (2-30). Find the range of the function w = j,, (z).
3. Let c:t = 271' in Equation (2-30). Find the range of the function w = /"' (z).
- Find a branch of the square root that is continuous along the negative x-axis.
- Let fi (z) = lz lk ei~ = r! cos ~+ir! sin~. where lzl = r # 0, and 6 = Arg(z).
ft denotes the principal cube root function.
1
(a) Show that !1 is a branch of the multivalued cube root f (z) = z•.
(b) What is the range of /1?
( c) Where is fi continuous? - Let h (z) = r! cos (^8 "4;^2 ~) + ir! sin (^8 "4;^2 ~ ), where r > 0 and -71' < () :S 71'.
(a) Show that h is a branch of the multivalued cube root f (z) = z!.
(b) What is the range of h?
(c) Where is h continuous?
(d) What is the branch point associated with/?- Find a branch of the multivalued cube root function that is different from those in
Exercises 5 and 6. State the domain and range of the branch you find. - Let f (z) = z!. denote the multivalued nth root, where n is a positive integer.