@AaronMazel-Gee Artin-Rees lemma says that, for a complete noetherian ring (with respect to some adic topoogy), there is no difference between completed or discrete tensor product. It also say that any module of finite type is derived complete. If furthermore the ring is regular, then modules of finite type are perfect complexes. Observe then that dualizable objects must be (degreewise) of finite type and bounded.