An extension theorem for separately holomorphic functions with pluripolar singularities

Abstract

Let Dj⊂ Cnj be a pseudoconvex domain and let Aj⊂ Dj be a locally pluriregular set, j=1,...,N. Put X:=j=1N A1×...× Aj-1× Dj× Aj+1× ...× AN⊂ Cn1×...× CnN= Cn. Let U⊂ Cn be an open neighborhood of X and let M⊂ U be a relatively closed subset of U. For j∈\1,...,N\ let j be the set of all (z',z'')∈(A1×...× Aj-1) ×(Aj+1×...× AN) for which the fiber M(z',·,z''):=\zj∈ Cnj\: (z',zj,z'')∈ M\ is not pluripolar. Assume that 1,...,N are pluripolar. Put X':=j=1N\(z',zj,z'')∈(A1×...× Aj-1)× Dj ×(Aj+1×...× AN)\: (z',z'')j\. Then there exists a relatively closed pluripolar subset M⊂ X of the `envelope of holomorphy' X⊂ Cn of X such that: M X'⊂ M, for every function f separately holomorphic on X M there exists exactly one function f holomorphic on X M with f=f on X' M, and M is singular with respect to the family of all functions f. Some special cases were previously studied in Jar-Pfl 2001c.

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