Finite Generation and Structure of Invariant Jets under Non-Reductive Reparametrization

Abstract

We study invariant jet differentials in the framework of complex hyperbolicity, focusing on the algebra of invariants for the non--reductive reparametrization group Gk = C Uk. The paper develops a uniform, representation--theoretic, and graded--algebraic strategy for the --action of Gk on JkCn, establishing in particular the finite generation of the invariant jet algebra central to the Green--Griffiths--Demailly program. Specifically, we prove that the C--graded algebra of unipotent invariants C[JkCn]Uk is finitely generated for all n,k; equivalently, the fiber ring of invariant jet differentials is a finitely generated positively graded C--algebra, so that its projective spectrum Proj\,C[JkCn]Uk exists and coincides with the Demailly--Semple tower.