Let
M
M
be an
n
n
-dimensional compact hypersurface with constant scalar curvature
n
(
n
−
1
)
r
n(n-1)r
,
r
>
1
r> 1
, in a unit sphere
S
n
+
1
(
1
)
S^{n+1}(1)
. We know that such hypersurfaces can be characterized as critical points for a variational problem of the integral
∫
M
H
d
M
\int _MHdM
of the mean curvature
H
H
. In this paper, we first study the eigenvalue of the Jacobi operator
J
s
J_s
of
M
M
. We derive an optimal upper bound for the first eigenvalue of
J
s
J_s
, and this bound is attained if and only if
M
M
is a totally umbilical and non-totally geodesic hypersurface or
M
M
is a Riemannian product
S
m
(
c
)
×
S
n
−
m
(
1
−
c
2
)
S^m(c)\times S^{n-m}(\sqrt {1-c^2})
,
1
≤
m
≤
n
−
1
1\leq m\leq n-1
.