Let
n
≥
3
n \geq 3
and let
Ω
\Omega
be a bounded domain in
C
n
\mathbb {C}^n
with a smooth negative plurisubharmonic exhaustion function
φ
\varphi
. As a generalization of Y. Tiba’s result, we prove that any holomorphic function on a connected open neighborhood of the support of
(
i
∂
∂
¯
φ
)
n
−
2
(i\partial \bar \partial \varphi )^{n-2}
in
Ω
\Omega
can be extended to the whole domain
Ω
\Omega
. To prove it, we combine an
L
2
L^2
version of Serre duality and Donnelly-Fefferman type estimates on
(
n
,
n
−
1
)
(n,n-1)
- and
(
n
,
n
)
(n,n)
-forms.