In this paper, we solve the asymptotic Plateau problem in hyperbolic space for constant
σ
n
−
1
\sigma _{n-1}
curvature, i.e. the existence of a complete hypersurface in
H
n
+
1
\mathbb {H}^{n+1}
satisfying
σ
n
−
1
(
κ
)
=
σ
∈
(
0
,
n
)
\sigma _{n-1}(\kappa )=\sigma \in (0,n)
with a prescribed asymptotic boundary
Γ
\Gamma
. The key ingredient is the curvature estimates. Previously, this was only known for
σ
0
>
σ
>
n
\sigma _0>\sigma >n
, where
σ
0
\sigma _0
is a positive constant.