Group isomorphic to its automorphism group

Any complete group (that is, with trivial center and outer automorphism group) is isomorphic to its automorphism group. The inverse is not true, as the dihedral group of order 8 is isomorphic to its automorphism group but isn't complete.

Problem 15.29 in the Kourovka Notebook asks to find another exemple of a p-group, but I was wondering, is any other exemple known? Is there any other finite (or even infinite) group (not necessarily a p-group) which is isomorphic to its automorphism group but isn't complete?

The infinite dihedral group $G=D_{\infty}$ also is isomorphic to its own outomoprhism group, but is not complete - see the article A Note on Groups with Just-Infinite Automorphism Groups.
For finite groups, not $p$-groups, not complete, it is said here: "Whether there exist other groups isomorphic to their automorphism groups is an open problem". For more results, see the article On a question about automorphisms of finite p-groups by G. Cutolo. See also this MO-question.