Jet schemes and invariant theory

Abstract

Let G be a complex reductive group and V a G-module. Then the mth jet scheme Gm acts on the mth jet scheme Vm for all m≥ 0. We are interested in the invariant ring O(Vm)Gm and whether the map pm*((V//G)m) → O(Vm)Gm induced by the categorical quotient map p V→ V//G is an isomorphism, surjective, or neither. Using Luna's slice theorem, we give criteria for pm* to be an isomorphism for all m, and we prove this when G=SLn, GLn, SOn, or Sp2n and V is a sum of copies of the standard representation and its dual, such that V//G is smooth or a complete intersection. We classify all representations of C* for which p*∞ is surjective or an isomorphism. Finally, we give examples where p*m is surjective for m=∞ but not for finite m, and where it is surjective but not injective.