On hyperbolicity and tautness modulo an analytic subset of Hartogs domains
Abstract
Let X be a complex space and H a positive homogeneous plurisubharmonic function H on X×m. Consider the Hartogs-type domain H(X):=\(z,w)∈ X× m:H(z,w)<1 \. Let S be an analytic subset of X. We give necessary and sufficient conditions for hyperbolicity and tautness modulo S× m of H(X), with the obvious corollaries for the special case of Hartogs domains.
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