In this article, we present some operator inequalities via
arbitrary operator means and unital positive linear maps. For instance, we show
that if $A,B \in {\mathbb B}({\mathscr H}) $ are two positive invertible operators such that $0 < m \leq A,B \leq M$ and $\sigma$ is an arbitrary operator mean, then
\begin{align*}
\Phi^{p}(A\sigma B) \leq K^{p}(h) \Phi^{p}(B\sigma^{\perp} A),
\end{align*}
where $\sigma^{\perp}$ is dual $\sigma$, $p\geq0$ and
$K(h)=\frac{(M+m)^{2}}{4 Mm}$ is the classical Kantorovich constant. We also generalize the above inequality
for two arbitrary means $\sigma_{1},\sigma_{2}$ which lie between
$\sigma$ and $\sigma^{\perp}$.