The Katetov extension of a frame is, as in the case of spaces, compact only for compact completely regular frames. This result is purely topological because, subject to appropriate foundations, compact regular frames are topologies. In this paper we find a necessary and sufficient condition for the Katetov extension of a frame (and hence, as a corollary, of a topological space) to be compact-like. We also characterize frames the Katetov extensions of which are one-point extensions in the sense of Banaschewski and Gilmour. Next, the Fomin extension of a frame is defined, and several characterizations of frames whose Fomin extensions coincide with their Stone-Cech compactifications are given. These characterizations include frames which are not topologies, and therefore strictly transcend topology.Quaestiones Mathematicae 30(2007), 365–380