Newton-Okounkov Bodies and Jet Separation: Canonical-Free and Multipoint Generalizations
Abstract
We establish three generalizations of the Küronya-Lozovanu jet separation criterion via Newton-Okounkov bodies: if an inverted standard simplex of size n+k+ is contained in all infinitesimal Newton-Okounkov bodies at x, then KX+D separates k-jets at x. We prove (1) a canonical-free version with a computable multiple m(D); (2) a multipoint extension for simultaneous jet separation; and (3) a combination of both. Proofs use Trusiani's framework and Nadel vanishing. We conclude with explicit computations for a double cover of a product of elliptic curves.
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