In their 1993 paper ‘Forecasting point and continuous processes: Prequential analysis’ in Test, Vovk put forward a game-theoretic definition of the Poisson process. A key assumption therein is that the rate of the Poisson process is known or specified exactly. In contrast, I replace this assumption with the less stringent—and arguably more realistic—one that the available information about the process takes the form of bounds the rate rather than a single, exact value. The resulting process has properties similar to the standard, ‘precise’ Poisson process, albeit with an imprecise flavour to them, thus justifying the moniker ‘imprecise Poisson process’.