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Cegrell classes on compact Kähler manifolds

Sławomir Dinew — 2007

Annales Polonici Mathematici

We study Cegrell classes on compact Kähler manifolds. Our results generalize some theorems of Guedj and Zeriahi (from the setting of surfaces to arbitrary manifolds) and answer some open questions posed by them.

Hölder continuous solutions to Monge–Ampère equations

Jean-Pierre Demailly; Sławomir Dinew; Vincent Guedj; Pham Hoang Hiep; Sławomir Kołodziej; Ahmed Zeriahi — 2014

Journal of the European Mathematical Society

Let $(X, ω)$ be a compact Kähler manifold. We obtain uniform Hölder regularity for solutions to the complex Monge-Ampère equation on $X$ with $L^{p}$ right hand side, $p > 1$ . The same regularity is furthermore proved on the ample locus in any big cohomology class. We also study the range $(X, ω)$ of the complex Monge-Ampère operator acting on $ω$ -plurisubharmonic Hölder continuous functions. We show that this set is convex, by sharpening Kołodziej’s result that measures with $L^{p}$ -density belong to $(X, ω)$ and proving that $(X, ω)$ has the...

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Cegrell classes on compact Kähler manifolds

Hölder continuous solutions to Monge–Ampère equations