We consider the existence and stability of the hole, or dark soliton, solut
ion to a Ginzburg-Landau perturbation of the defocusing nonlinear Schroding
er equation (NLS), and to the nearly real complex Ginzburg-Landau equation
(CGL). By using dynamical systems techniques, it is shown that the dark sol
iton can persist as either a regular perturbation or a singular perturbatio
n of that which exists for the NLS. When considering the stability of the s
oliton, a major difficulty which must be overcome is that eigenvalues may b
ifurcate out of the continuous spectrum, i.e. an edge bifurcation may occur
. Since the continuous spectrum for the NLS covers the imaginary axis, and
since for the CGL it touches the origin, such a bifurcation may lead to an
unstable wave. An additional important consideration is that an edge bifurc
ation can happen even if there are no eigenvalues embedded in the continuou
s spectrum. Building on and refining ideas first presented by Kapitula and
Sandstede (1998 Physica D 124 58-103) and Kapitula (1999 SIAM J. Math. Anal
. 30 273-97), we use the Evans function to show that when the wave persists
as a regular perturbation, at most three eigenvalues will bifurcate out of
the continuous spectrum. Furthermore, we precisely track these bifurcating
eigenvalues, and thus are able to give conditions for which the perturbed
wave will be stable. For the NLS the results are an improvement and refinem
ent of previous work,, while the results for the CGL are new. The technique
s presented are very general and are therefore applicable to a much larger
class of problems than those considered here.