We propose a definition of volume for stationary spacetimes. The proposed
volume is independent of the choice of stationary time-slicing, and applies
even though the Killing vector may not be globally timelike. Moreover, it is
constant in time, as well as simple: the volume of a spherical black hole in
four dimensions turns out to be just 34βΟr+3β. We then consider
whether it is possible to construct spacetimes that have finite horizon area
but infinite volume, by sending the radius to infinity while making discrete
identifications to preserve the horizon area. We show that, in three or four
dimensions, no such solutions exist that are not inconsistent in some way. We
discuss the implications for the interpretation of the Bekenstein-Hawking
entropy.Comment: 8 pages, revte