ON SHARP LOWER BOUNDS FOR CALABI-TYPE FUNCTIONALS AND DESTABILIZING PROPERTIES OF GRADIENT FLOWS
Artikel i vetenskaplig tidskrift, 2021

Let X be a compact Kahler manifold with a given ample line bundle L. Donaldson proved an inequality between the Calabi energy of a Kahler metric in c(1)(L) and the negative of normalized Donaldson-Futaki invariants of test configurations of (X, L). He also conjectured that the bound is sharp. We prove a metric analogue of Donaldson's conjecture; we show that if we enlarge the space of test configurations to the space of geodesic rays in epsilon(2) and replace the Donaldson-Futaki invariant by the radial Mabuchi K-energy M, then a similar bound holds and the bound is indeed sharp. Moreover, we construct explicitly a minimizer of M. On a Fano manifold, a similar sharp bound for the Ricci-Calabi energy is also derived.

weak Calabi flow

inverse Monge-Ampere flow

destabilizing property

geodesic ray

Författare

Mingchen Xia

Chalmers, Matematiska vetenskaper, Algebra och geometri

Analysis and PDE

2157-5045 (ISSN) 1948-206X (eISSN)

Vol. 14 6 1951-1976

Ämneskategorier

Geometri

Diskret matematik

Matematisk analys

DOI

10.2140/apde.2021.14.1951

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Senast uppdaterat

2021-09-29