Circumscription has been used to formalize the nonmonotonic aspects of common-sense reasoning. The structure of second-order sentences expressing circumscription for which an equivalent first-order sentence can easily be constructed has been studied by Lifschitz (1985). This paper studies the computability aspects of circumscription. We show that even if the circumscription is expressible as a first-order sentence, it is not computable. We also prove the undecidability of determining whether a given set of first-order sentences has a minimal model, a unique minimal model, a finite number of minimal models or an infinite number of minimal models. In addition, we demonstrate the undecidability of determining if the extension of the minimal pr...