Abstract
In this article we show that any hyperbolic Inoue surface (also called Inoue-Hirzebruch surface of even type) admits anti-self-dual bihermitian structures. The same result holds for any of its small deformations as far as its anti-canonical system is non-empty. Similar results are obtained for parabolic Inoue surfaces. Our method also yields a family of anti-self-dual hermitian metrics on any half Inoue surface. We use the twistor method of Donaldson-Friedman for the proof.
Citation
Akira Fujiki. Massimiliano Pontecorvo. "Anti-self-dual bihermitian structures on Inoue surfaces." J. Differential Geom. 85 (1) 15 - 72, May 2010. https://doi.org/10.4310/jdg/1284557925
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