Une nouvelle version du théorème d'extension de Hartogs pour les applications séparément holomorphes entre espaces analytiques

Abstract: Abstract. This paper is concerned with the problem of extension of separately holomorphic mappings defined on a "generalized cross" of a product of complex analytic spaces with values in a complex analytic space.The crosses considered here are inscribed in Borel rectangles (of a product of two complex analytic spaces) which are not necessarily open but are non-pluripolar and can be quite small from the topological point of view.Our first main result says that the singular set of a given separately holomorphic … Show more

“…Theorem 1 ([12], [13], [15], [14], [8], [9], [10], [7], [1], [16]). For each f ∈ O s (X) there exists exactly one f ∈ O( X) such that f = f on X and sup X | f | = sup X |f | ≤ +∞.…”

A new cross theorem for separately holomorphic functions

“…Theorem 1 ([12], [13], [15], [14], [8], [9], [10], [7], [1], [16]). For each f ∈ O s (X) there exists exactly one f ∈ O( X) such that f = f on X and sup X | f | = sup X |f | ≤ +∞.…”

A new cross theorem for separately holomorphic functions

“…[17], [20], [18], [16], [12], [10], [1] (for N = 2), and [18], [13], [8] (for arbitrary N ). The case where M is analytic was studied in [14], [15], [19], [6].…”

An extension theorem for separately holomorphic functions with pluripolar singularities

“…Put M := {(z 1 , w 1 ), (z 2 , w 2 )}. By (1) there are open sets T ⊂ D, S ⊂ G and 0 < ε < 1 such that…”

A boundary cross theorem for separately holomorphic functions