Fuchs' problem for $p$-groups

Which groups can be the group of units in a ring? This open question, posed by L\'{a}szl\'{o} Fuchs in 1960, has been studied by the authors and others with a variety of restrictions on either the class of groups or the class of rings under consideration. In the present work, we investigate Fuchs' problem for the class of $p$-groups. Ditor provided a solution in the finite, odd-primary case in 1970. Our first main result is that a finite $2$-group $G$ is the group of units of a ring of odd characteristic if and only if $G$ is of the form $C_8^t \times \prod_{i = 1}^k C_{2^{n_i}}^{s_i},$ where $t$ and $s_i$ are non-negative integers and $2^{n_i}+1$ is a Fermat prime for all $i$. We also determine the finite abelian $2$-groups of rank at most 2 that are realizable over the class of rings of characteristic 2, and we give some results concerning the realizability of $2$-groups in characteristic 0 and $2^n$. Finally, we show that the only almost cyclic $2$-groups which appear as the group of units in a ring are $C_2, C_4, C_8, C_{q-1}$ ($q$ a Fermat prime), $C_2 \times C_{2^n} (n \ge 1)$, $D_8$, and $Q_8$. From this list we obtain the $p$-groups with periodic cohomology which arise as the group of units in a ring.