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Let L(z) be the Lie norm on $\tilde{} = ℂ^{n + 1}$ and L*(z) the dual Lie norm. We denote by $_{Δ} (\tilde{B} (R))$ the space of complex harmonic functions on the open Lie ball $\tilde{B} (R)$ and by $E x p_{Δ} (\tilde{}; (A, L *))$ the space of entire harmonic functions of exponential type (A,L*). A continuous linear functional on these spaces will be called a harmonic functional or an entire harmonic functional. We shall study the conical Fourier-Borel transformations on the spaces of harmonic functionals or entire harmonic functionals.

Construction of boundary invariants and the logarithmic singularity of the Bergman kernel.

Hirachi, Kengo (2000)

Annals of Mathematics. Second Series

Correction to the paper "Distortions of a bounded domain by holomorphic mappings".

Kyong T. Hahn (1975)

Journal für die reine und angewandte Mathematik

Correction to the paper "H^2 spaces of generalized half-planes" (Studia Math. 44 (1972), pp. 379-388)

A. Korányi, F. Stein (1973)

Studia Mathematica

Corrigendum to: Holomorphic Morse inequalities on manifolds with boundary

Robert Berman (2008)

Annales de l’institut Fourier

A statement in the paper “Holomorphic Morse inequalities on manifolds with boundary” saying that the holomorphic Morse inequalities for an hermitian line bundle $L$ over $X$ are sharp as long as $L$ extends as semi-positive bundle over a Stein-filling is corrected, by adding certain assumptions. A more general situation is also treated.

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Completeness, Reinhardt domains and the method of complex geodesics in the theory of invariant functions [Book]

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