Graphs that are not complete pluripolar

Abstract: Abstract. Let D 1 ⊂ D 2 be domains in C. Under very mild conditions on D 2 we show that there exist holomorphic functions f , defined on D 1 with the property that f is nowhere extendible across ∂D 1 , while the graph of f over D 1 is not complete pluripolar in D 2 × C. This refutes a conjecture of Levenberg, Martin and Poletsky (1992).

“…In Section 4 we prove a localization principle for pluriharmonic measure. This turns out to be strong enough to explain qualitatively Siciak's [13] extension of our example in [2] of a holomorphic function f ∈ A ∞ (D) with domain of existence the unit disc D, which has (Γ f ) * extending over most of C. We also show that the pluripolar hull of a connected F σ -pluripolar set is connected; this may be of independent interest.…”

“…In [2], the authors constructed an example of a smooth holomorphic function f on the unit disc such that (Γ f ) * C 2 \ Γ f = ∅. From Proposition 4.4 (see the discussion after the Proposition) and Corollary 4.8 we see that the set (Γ f ) * C 2 \ Γ f is actually quite big.…”

“…Let f be a holomorphic function on its domain of existence D ⊂ C and let Γ f be its graph in D × C. Answering a question of Levenberg, Martin and Poletsky [6], we showed in [2] that it is possible that Γ f is not a complete pluripolar subset of C 2 , but that the pluripolar hull of Γ f is strictly larger than Γ f . In a subsequent paper [3] we studied the pluripolar hull (Γ f ) * D 0 relative to a domain D 0 in the following setup: D ⊂ D 0 are domains in C, K = D 0 \ D is a closed polar subset of D, and z ∈ K. We showed that a necessary and sufficient conditions for {z} × C ∩ (Γ f ) * D 0 ×C = ∅ is that z be a regular boundary point for the Dirichlet problem on…”

“…[4]. In [2,3] we gave a sufficient condition for graphs of holomorphic functions to have a non-trivial pluripolar hull; Theorem 5.3 provides the natural generalization to pluripolar sets.…”

Determination of the pluripolar hull of graphs of certain holomorphic functions

“…In Section 4 we prove a localization principle for pluriharmonic measure. This turns out to be strong enough to explain qualitatively Siciak's [13] extension of our example in [2] of a holomorphic function f ∈ A ∞ (D) with domain of existence the unit disc D, which has (Γ f ) * extending over most of C. We also show that the pluripolar hull of a connected F σ -pluripolar set is connected; this may be of independent interest.…”

“…In [2], the authors constructed an example of a smooth holomorphic function f on the unit disc such that (Γ f ) * C 2 \ Γ f = ∅. From Proposition 4.4 (see the discussion after the Proposition) and Corollary 4.8 we see that the set (Γ f ) * C 2 \ Γ f is actually quite big.…”

“…Let f be a holomorphic function on its domain of existence D ⊂ C and let Γ f be its graph in D × C. Answering a question of Levenberg, Martin and Poletsky [6], we showed in [2] that it is possible that Γ f is not a complete pluripolar subset of C 2 , but that the pluripolar hull of Γ f is strictly larger than Γ f . In a subsequent paper [3] we studied the pluripolar hull (Γ f ) * D 0 relative to a domain D 0 in the following setup: D ⊂ D 0 are domains in C, K = D 0 \ D is a closed polar subset of D, and z ∈ K. We showed that a necessary and sufficient conditions for {z} × C ∩ (Γ f ) * D 0 ×C = ∅ is that z be a regular boundary point for the Dirichlet problem on…”

“…[4]. In [2,3] we gave a sufficient condition for graphs of holomorphic functions to have a non-trivial pluripolar hull; Theorem 5.3 provides the natural generalization to pluripolar sets.…”

Determination of the pluripolar hull of graphs of certain holomorphic functions

“…which is a required contradiction. Therefore, the function f satisfies condition (14) and, consequently, it also satisfies condition (3). Thus, any Denjoy quasianalytic function satisfies the conditions of the proposition.…”

Pluripolarity of graphs of Denjoy quasianalytic functions of several variables

Quelques théorèmes sur la structure complexe