We study the spectrum of semiclassical rotating strings on de Sitter space
and its consistency, generalizing the Gubser-Klebanov-Polyakov (GKP) string on
anti-de Sitter space. Even though a naive extrapolation of the linear Regge
trajectory on flat space implies a violation of the Higuchi bound (a unitarity
bound on the mass of higher-spin particles in de Sitter space), the curved
space effects turn out to modify the trajectory to respect the bound.
Interestingly, we find that there exists a maximum spin for each Regge
trajectory as a consequence of accelerated expansion, which is helpful to make
the spectrum consistent with the Higuchi bound, but at the same time it could
be an obstruction to stringy UV completion based on an infinite higher-spin
tower. By pushing further this observation, we demonstrate that the vacuum
energy $V$ inflating the universe has to be bounded by the string scale $M_s$
as $V\lesssim M_s^4$, if UV completion is achieved by the leading Regge
trajectory. Its application to inflation at the early universe implies an upper
bound on the tensor-to-scalar ratio, $r\lesssim 0.01\times(M_s/10^{16}
\text{GeV})^{4}$, which is within the scope of the near future CMB experiments.