This is the integrand of a complex integral:
$$\frac{o(\zeta - z)}{\zeta - z}$$
The ensuing discussion says that this can be made as small as desired [by confining $\zeta$ close to $z$].
In general I thought little-$o$ notation implied that given two functions,
$f(x) = o(g(x))$ as $x \rightarrow a$ if $$\lim_{x \to a}\frac{f(x)}{g(x)} = 0$$
I would appreciate help in seeing how to apply this to the above integrand to see how it can be made as small as desired.
Thanks