Abstract: | We prove that if X is a rationally connected threefold and G is a p‐subgroup in the group of birational selfmaps of X, then G is an abelian group generated by at most 3 elements provided that . We also prove a similar result for under an assumption that G acts on a (Gorenstein) G‐Fano threefold, and show that the same holds for under an assumption that G acts on a G‐Mori fiber space. |