The Monge–Ampère equation for $$(n-1)$$-quaternionic PSH functions on a hyperKähler manifold-Reference-Cited by-同舟云学术

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The Monge–Ampère equation for $$(n-1)$$-quaternionic PSH functions on a hyperKähler manifold

Published:2024-05-10 Issue:2 Volume:307 Page:
ISSN:0025-5874
Container-title:Mathematische Zeitschrift
language:en
Short-container-title:Math. Z.

Author:

Fu Jixiang,Xu Xin,Zhang Dekai

Publisher

Springer Science and Business Media LLC

Link

https://link.springer.com/content/pdf/10.1007/s00209-024-03504-w.pdf

Reference31 articles.

1. Alesker, S.: Solvability of the quaternionic Monge–Ampère equation on compact manifolds with a flat hyperKähler metric. Adv. Math. 241, 192–219 (2013)

2. Alesker, S., Shelukhin, E.: A uniform estimate for general quaternionic Calabi problem (with appendix by Daniel Barlet). Adv. Math. 316, 1–52 (2017)

3. Alesker, S., Verbitsky, M.: Plurisubharmonic functions on hypercomplex manifolds and HKT-geometry. J. Geom. Anal. 16(3), 375–399 (2006)

4. Alesker, S., Verbitsky, M.: Quaternionic Monge–Ampère equation and Calabi problem for HKT-manifolds. Isr. J. Math. 176, 109–138 (2010)

5. Bedulli, L., Gentili, G., Vezzoni, L.: A parabolic approach to the Calabi–Yau problem in HKT geometry. Math. Z. 302(2), 917–933 (2022)

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