Invariant Jet differentials and Asymptotic Serre duality

Abstract

We generalize the main result of Demailly D2 for the bundles Ek,mGG(V*) of jet differentials of order k and weighted degree m to the bundles Ek,m(V*) of the invariant jet differentials of order k and weighted degree m. Namely, Theorem 0.5 from D2 and Theorem 9.3 from D1 provide a lower bound ckkmn+kr-1 on the number of the linearly independent holomorphic global sections of Ek,mGG V* O(-m δ A) for some ample divisor A. The group Gk of local reparametrizations of (C,0) acts on the k-jets by orbits of dimension k, so that there is an automatic lower bound ckk mn+kr-1 on the number of the linearly independent holomorphic global sections of Ek,mV* O(-m δ A). We formulate and prove the existence of an asymptotic duality along the fibers of the Green-Griffiths jet bundles over projective manifolds. We also prove a Serre duality for asymptotic sections of jet bundles. An application is also given for partial application to the Green-Griffiths conjecture.