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Bases communes dans certains espaces de fonctions harmoniques et fonctions séparément harmoniques sur certains ensembles de $𝐂^{n}$

Ahmed Zériahi (1982)

Annales de la Faculté des sciences de Toulouse : Mathématiques

Bernstein Theorems for Harmonic Morphisms from R3 and S3.

Paul Baird, John C. Wood (1988)

Mathematische Annalen

Boundaries of graphs of harmonic functions.

Fox, Daniel (2009)

SIGMA. Symmetry, Integrability and Geometry: Methods and Applications [electronic only]

Boundary behaviour of positive harmonic functions on Lipschitz domains.

Carroll, Tom (2002)

Annales Academiae Scientiarum Fennicae. Mathematica

Boundary limits of Green's potentials along curves II. Lipschitz domains

Jang-Mei Wu (1978)

Studia Mathematica

Boundary Value Characterizations for Weighted Hardy Spaces of Harmonic Functions.

Huy-Qui Bui (1990)

Forum mathematicum

Boundary values of harmonic functions in mixed norm spaces and their atomic structure

Fulvio Ricci, Mitchell Taibleson (1983)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

Brownian motion and generalized analytic and inner functions

Alain Bernard, Eddy A. Campbell, A. M. Davie (1979)

Annales de l'institut Fourier

Let $f$ be a mapping from an open set in $R^{p}$ into $R^{q}$ , with $p > q$ . To say that $f$ preserves Brownian motion, up to a random change of clock, means that $f$ is harmonic and that its tangent linear mapping in proportional to a co-isometry. In the case $p = 2$ , $q = 2$ , such conditions signify that $f$ corresponds to an analytic function of one complex variable. We study, essentially that case $p = 3$ , $q = 2$ , in which we prove in particular that such a mapping cannot be “inner” if it is not trivial. A similar result for $p = 4$ , $q = 2$ would solve...

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