We show that in every dimension
N
≥
3
N\geq 3
there are many bounded domains
Ω
⊂
R
N
,
\Omega \subset \mathbb {R}^{N},
having only finite symmetries, in which the Bahri-Coron problem
\[
−
Δ
u
=
|
u
|
4
/
(
N
−
2
)
u
\ in
Ω
,
\ \
u
=
0
\ on
∂
Ω
,
-\Delta u=\left \vert u\right \vert ^{4/(N-2)}u\text { \ in }\Omega ,\text { \ \ }u=0\text { \ on }\partial \Omega ,
\]
has a prescribed number of solutions, one of them being positive and the rest sign-changing.