A property of ideals of jets of functions vanishing on a set

Abstract

For a set E⊂Rn that contains the origin we consider Im(E) -- the set of all mth degree Taylor approximations (at the origin) of Cm functions on Rn that vanish on E. This set is an ideal in Pm(Rn) -- the ring of all mth degree Taylor approximations of Cm functions on Rn. Which ideals in Pm(Rn) arise as Im(E) for some E? In this paper we introduce the notion of a closed ideal in Pm(Rn), and prove that any ideal of the form Im(E) is closed. We do not know whether in general any closed ideal is of the form Im(E) for some E, however we prove in [FS] that all closed ideals in Pm(Rn) arise as Im(E) when m+n≤5.