Singularities/Residues/Applications 735or changing ( into z,1
00
2z
7r cot7rz = - + '\"' 2 2
z n=l L..!z -n100
--+ ( --+--^1 1 )- z ~ z-n z+n
(9.12-3)
whenever z # 0, ±1, ±2, ...
The series on the right of (9.12-3) converges absolutely and uniformlyon every compact set K that contains none of the integers 0, ±1, ±2, ....
In fact, if A = maxzEK lzl and n > J2A, we have< <-
I2z I 2A 4A
z2 - n2 - n2 - A2 n2and the stated property follows from the Weierstrass M-test. By Corollary
8.5 we obtain, by differentiation of (9.12-3),
. +oo
2 2. I: 1
7r CSC · 7rZ = ( z-n ) 2
n=-oo
for z # O, ±1, ±2,
- Let f(z) = ?rcsc?rz and g(z) = 1/((^2 - z^2 ), ( # 0, ±1, ±2,
f(z) = ?rcsc?rz has simple poles at the points Zn= n. The corresponding
residues are
f3n.= lim(z-n)~ = 7r =(-lt
Z-tn sin 7rZ 7r cos n?rOn the other hand, the residues of f(z)g(z) at the poles of g(z) are
Res 7r csc 7rZ = - ~ csc 7r(
z=C (2 - z2 2(R7r CSC 7rZ 7r · 7r
es ---=
2
,.. csc( -7r() = -
2
,.. csc 7r(
z=-C (2 - z2 '> '>We have already seen that zg(z) -t 0 as z -t oo, and we may use as
contours the same rectangles of Example 1. On the sides x = ±(% + m)
we have
1 1icsc?rzl= ---= -;===================
I sin?rzl Jsin^2 7r(% + m) + sinh^2 7ry
1
= <1
Vl + sinh^2 ?rY -