TY - JOUR
T1 - On a class of holomorphic functions representable by Carleman formulas in the disk from their values on the arc of the circle
AU - Aizenberg, Lev
AU - Vidras, Alekos
PY - 2007
Y1 - 2007
N2 - Let D be a unit disk and M be an open arc of the unit circle whose Lebesgue measure satisfies 0 < l(M) < 2π Our first result characterizes the restriction of the holomorphic functions f ∈ H(D), which are in the Hardy class H1 near the arc M and are denoted by N HM 1 (D), to the open arc M. This result is a direct consequence of the complete description of the space of holomorphic functions in the unit disk which are represented by the Carleman formulas on the open arc M. As an application of the above characterization, we present an extension theorem for a function f ∈ L1 (M) from any symmetric sub-arc L ⊂ M of the unit circle, such that L̄ ⊂ M, to a function f ∈ N H L1(D).
AB - Let D be a unit disk and M be an open arc of the unit circle whose Lebesgue measure satisfies 0 < l(M) < 2π Our first result characterizes the restriction of the holomorphic functions f ∈ H(D), which are in the Hardy class H1 near the arc M and are denoted by N HM 1 (D), to the open arc M. This result is a direct consequence of the complete description of the space of holomorphic functions in the unit disk which are represented by the Carleman formulas on the open arc M. As an application of the above characterization, we present an extension theorem for a function f ∈ L1 (M) from any symmetric sub-arc L ⊂ M of the unit circle, such that L̄ ⊂ M, to a function f ∈ N H L1(D).
KW - Carleman formula
KW - Smirnov classes
UR - http://www.scopus.com/inward/record.url?scp=33846518145&partnerID=8YFLogxK
U2 - 10.1002/mana.200410460
DO - 10.1002/mana.200410460
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AN - SCOPUS:33846518145
SN - 0025-584X
VL - 280
SP - 5
EP - 19
JO - Mathematische Nachrichten
JF - Mathematische Nachrichten
IS - 1-2
ER -