Suppose the contrary, and let $(n_k)_{k\ge 1}$ be an increasing sequence of positive integers with the property that $b_k\triangleq a_{n_k}$ forms an infinite arithmetic progression. Observe that, \[ f\left(n_{2u-1}\right)=b_{2u-1} =\frac{b_{2u}+b_{2u-2}}{2} =\frac{f\left(n_{2u}\right)+f\left(n_{2u-2}\right)}{2} >f\left(\frac{n_{2u}+n_{2u-2}}{2}\right). \]This, together with the fact $f$ is strictly increasing, yields \[ n_{2u-1}-n_{2u-2}>n_{2u}-n_{2u-1}. \]Likewise, considering $b_{2u-1}$ and $b_{2u-3}$ above; and deducing an analogous inequality, we find that $d_k\triangleq n_k-n_{k-1}$ is strictly decreasing. Note now that this sequence, by definition, consists of positive integers. We therefore reached a contradiction.