Daniele Angella, Valentino Tosatti
Published 2021-06-30Version 1
We prove that every Gauduchon metric on an Inoue-Bombieri surface admits a strongly leafwise flat form in its $\partial\overline\partial$-class. Using this result, we deduce uniform convergence of the normalized Chern-Ricci flow starting at any Gauduchon metric on all Inoue-Bombieri surfaces. We also show that the convergence is smooth with bounded curvature for initial metrics in the $\partial\overline\partial$-class of the Tricerri/Vaisman metric.
Comments: 24 pages. Comments are welcome
Aeppli cohomology and Gauduchon metrics
The Lee--Gauduchon cone on complex manifolds
Aeppli Cohomology Classes Associated with Gauduchon Metrics on Compact Complex Manifolds
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