Regularity of weak minimizers of the K-energy and applications to properness and K-stability
Robert J. Berman, Tamás Darvas, Chinh H. Lu
Abstract
Let $(X,ω)$ be a compact Kähler manifold and $\mathcal H$ the space of Kähler metrics cohomologous to $ω$. If a cscK metric exists in $\mathcal H$, we show that all finite energy minimizers of the extended K-energy are smooth cscK metrics, partially confirming a conjecture of Y.A. Rubinstein and the second author. As an immediate application, we obtain that existence of a cscK metric in $\mathcal H$ implies J-properness of the K-energy, thus confirming one direction of a conjecture of Tian. Exploiting this properness result we prove that an ample line bundle $(X,L)$ admitting a cscK metric in $c_1(L)$ is $K$-polystable.
Topics & Concepts
ConjectureMetric (unit)MathematicsManifold (fluid mechanics)Space (punctuation)Energy (signal processing)OmegaPure mathematicsStability (learning theory)Ample line bundleCombinatoricsPhysicsQuantum mechanicsComputer scienceStatisticsEconomicsEngineeringOperations managementOperating systemMachine learningMechanical engineeringGeometry and complex manifoldsGeometric Analysis and Curvature FlowsAlgebraic Geometry and Number Theory