Zeroes of the Bergman kernel of Hartogs domains
We exhibit a class of bounded, strongly convex Hartogs domains with real-analytic boundary which are not Lu Qi-Keng, i.e. whose Bergman kernel function has a zero.
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Miroslav Engliš (2000)
Commentationes Mathematicae Universitatis Carolinae
We exhibit a class of bounded, strongly convex Hartogs domains with real-analytic boundary which are not Lu Qi-Keng, i.e. whose Bergman kernel function has a zero.
Page 1