The Set of Destabilizing Curves for Deformed Hermitian Yang–Mills and Z-Critical Equations on Surfaces

Author:

Khalid Sohaib1,Sjöström Dyrefelt Zakarias2

Affiliation:

1. Scuola Internazionale Superiore di Studi Avanzati (SISSA), Via Bonomea , 265, 34136 Trieste TS, Italy, and

2. Institut for Matematik and Aarhus Institute of Advanced Studies , Aarhus University, Ny Munkegade 118, 8000, Aarhus C, Denmark

Abstract

Abstract We show that on any compact Kähler surface existence of solutions to the Z-critical equation can be characterized using a finite number of effective conditions, where the number of conditions is bounded above by the Picard number of the surface. This leads to a first PDE analogue of the locally finite wall-chamber decomposition in Bridgeland stability. As an application we characterize optimally destabilizing curves for Donaldson’s J-equation and the deformed Hermitian Yang–Mills equation, prove a non-existence result for optimally destabilizing test configurations for uniform J-stability, and remark on improvements to convergence results for certain geometric flows.

Publisher

Oxford University Press (OUP)

Subject

General Mathematics

Reference56 articles.

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