Mathematics – Complex Variables
Scientific paper
2008-02-28
Israel J. Math. 176 (2010), 109-138
Mathematics
Complex Variables
32 pages, minor corrections
Scientific paper
A quaternionic version of the Calabi problem on Monge-Ampere equation is introduced. It is a quaternionic Monge-Ampere equation on a compact hypercomplex manifold with an HKT-metric. The equation is non-linear elliptic of second order. For a hypercomplex manifold with holonomy in SL(n;H), uniqueness (up to a constant) of a solution is proven, as well as the zero order a priori estimate. The existence of solution is conjectured, similar to Calabi-Yau theorem. We reformulate this quaternionic equation as a special case of a complex Hessian equation, making sense on any complex manifold.
Alesker Semyon
Verbitsky Misha
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