Weakly complete compex surfaces
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Publication:4962388
DOI10.1512/IUMJ.2018.67.6306zbMATH Open1402.32035arXiv1504.07215OpenAlexW2963783531WikidataQ129912359 ScholiaQ129912359MaRDI QIDQ4962388
Author name not available (Why is that?)
Publication date: 2 November 2018
Published in: (Search for Journal in Brave)
Abstract: A weakly complete space is a complex space admitting a (smooth) plurisubharmonic exhaustion function. In this paper, we classify those weakly complete complex surfaces for which such exhaustion function can be chosen real analytic: they can be modifications of Stein spaces or proper over a non compact (possibly singular) complex curve or foliated with real analytic Levi-flat hypersurfaces which in turn are foliated by dense complex leaves (these we call surfaces of Grauert type). In the last case, we also show that such Levi-flat hypersurfaces are in fact level sets of a global proper pluriharmonic function, up to passing to a holomorphic double cover of the space. An example of Brunella shows that not every weakly complete surface can be endowed with a real analytic plurisubharmonic exhaustion function. Our method of proof is based on the careful analysis of the level sets of the given exhaustion function and their intersections with the minimal singular set, i.e the set where every plurisubharmonic exhaustion function has a degenerate Levi form.
Full work available at URL: https://arxiv.org/abs/1504.07215
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