On the strict convexity of the K-energy
Artikel i vetenskaplig tidskrift, 2019

Let (X, L) be a polarized projective complex manifold. We show, by a simple toric one-dimensional example, that Mabuchi's K-energy functional on the geodesically complete space of bounded positive (1, 1)-forms in c(1)(L), endowed with the Mabuchi-Donaldson-Semmes metric, is not strictly convex modulo automorphisms. However, under some further assumptions the strict convexity in question does hold in the toric case. This leads to a uniqueness result saying that a finite energy minimizer of the K-energy (which exists on any toric polarized manifold (X, L) which is uniformly K-stable) is uniquely determined modulo automorphisms under the assumption that there exists some minimizer with strictly positive curvature current.

Författare

Robert Berman

Matematik

Göteborgs universitet

Pure and Applied Mathematics Quarterly

1558-8599 (ISSN) 1558-8602 (eISSN)

Vol. 15 4 983-999

Ämneskategorier

Geometri

Diskret matematik

Matematisk analys

DOI

10.4310/PAMQ.2019.v15.n4.a1

Mer information

Senast uppdaterat

2020-11-13