Let Dj⊂Cnj be a pseudoconvex domain and let Aj⊂Dj be a locally pluriregular set, j=1,...,N. Put X:=j=1⋃NA1×...×Aj−1×Dj×Aj+1×...×AN. Let M⊂X be relatively closed. For any j∈{1,...,N} let Σj be the set of all (z′,z′′)∈(A1×...×Aj−1)×(Aj+1×...×AN) such that the fiber M(z′,⋅,z′′):={zj∈Cnj:(z′,zj,z′′)∈M} is not pluripolar. Assume that Σ1,...,ΣN are pluripolar. Put multline∗X′:=⋃j=1N{(z′,zj,z′′)∈(A1×...×Aj−1)×Dj×(Aj+1×...×AN):(z′,z′′)∈/Σj}. Then there exists a relatively closed pluripolar subset M⊂X of the `envelope of holomorphy' X of X such that: ∙M∩X′⊂M, ∙ every function f separately meromorphic on X∖M extends to a (uniquely determined) function f meromorphic on X∖M, ∙ if f is separately holomorphic on X∖M, then f is holomorphic on X∖M, and ∙M is singular with respect to the family of all functions f. \noindent In the case where N=2, M=∅, the above result may be strengthened.
@article{arxiv.math/0209207,
title = {An extension theorem for separately meromorphic functions with pluripolar singularities},
author = {Marek Jarnicki and Peter Pflug},
journal= {arXiv preprint arXiv:math/0209207},
year = {2007}
}