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Abstract We provide the sharp C⁰ C 0 estimate for the quaternionic Monge-Ampère equation on any hyperhermitian manifold. This improves previously known results concerning this estimate in two directions. Namely, it turns out that the estimate depends only on Lᵖ L p norm of the right hand side for any p>2 p > 2 (as suggested by the local case studied in Sroka (Anal. PDE 13 (6): 1755-1776, 2020) ). Moreover, the estimate still holds true for any hyperhermitian initial metric - regardless of it being HKT as in the original conjecture of Alesker and Verbitsky (Isr. J. Math. 176: 109-138, 2010) - as speculated by the author in Sroka (Monge-Ampére equation in hypercomplex geometry, Jagiellonian University, Kraków, 2021). For completeness, we actually provide a sharp uniform estimate for many quaternionic PDEs, in particular those given by the operator dominating the quaternionic Monge-Ampére operator, by applying the recent method of Guo and Phong (On L ^ ∞ estimates for fully nonlinear partial differential equations on hermitian manifolds).
Marcin Sroka (Sat,) studied this question.