Is there a pointed space $(X, p)$ such that for infinitely many integers $n\geq 1$ there is a map $(X, p)\to (X,p)$ inducing an automorphism other than $\mathrm{id}$ on $\pi_n(X, p)$?
In particular $\pi_n(X, p)$ must be non-trivial for infinitely many $n$.
What if require in addition $X$ to be a finite-dimensional CW complex?
Yes: take the product $\def\K{{\rm K}} \def\Z{{\bf Z}} A=∏_{k≥0}\K(\Z,n)$ of Eilenberg–MacLane spaces.
Then for each $n≥0$ there is a map $f_n\colon A→A$ given by identities on all factors with index $k≠n$ and by the map $\K(\Z,n)→\K(\Z,n)$ induced by the homomorphism $\Z→\Z$ that multiplies by 2 if $k=n$.
The induced map $π_n(f_n)\colon\Z\to\Z$ multiplies by 2 for all $n≥0$
A degree 2 map $f: S^3 \rightarrow S^3$ will induce an isomorphism on the odd primary part of $\pi_*(S^3)$ which is nonzero infinitely often. And I would bet that it is also nonzero infinitely often on the 2 primary part as well. (If you really want to explore that, I would start with Neisendorfer's book Algebraic methods in unstable homotopy theory.)
