There are many simpler sequences which are not orbits, for example, it is impossible to have $a_n=a_{n+1}\neq a_{n+k}$ for some $k>1$.

This can be generalized to $a_n=a_{n+m}\neq a_{n+km},\; k>1$. In fact such sequences are not orbits of ANY function.

Other conditions can be obtained if $a_n$ has a limit, and tends to it with aproximately geometric speed. Then this limit must be an attracting point, and
using the local linearization at this point one obtains VERY strong conditions on
the sequence.