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Let $X$ be a compact complex manifold with boundary and let $L^{k}$ be a high power of a hermitian holomorphic line bundle over $X .$ When $X$ has no boundary, Demailly’s holomorphic Morse inequalities give asymptotic bounds on the dimensions of the Dolbeault cohomology groups with values in $L^{k},$ in terms of the curvature of $L .$ We extend Demailly’s inequalities to the case when $X$ has a boundary by adding a boundary term expressed as a certain average of the curvature of the line bundle and the Levi curvature of the...

Holomorphic reproducing kernel for Kohn-Nierenberg domains in C...

John Erik Fornaess, Jan Wiegerinck (1988)

Mathematica Scandinavica

Holomorphic Sobolev spaces on the ball [Book]

Frank Beatrous, Jacob Burbea (1989)

Holomorph-prävollständige Resträume zu analytischen Mengen in Steinschen Räumen.

Jürgen Bingener (1976)

Journal für die reine und angewandte Mathematik

Holomorphy types on a Banach spaces

Seán Dineen (1971)

Studia Mathematica

How to prove Fefferman's theorem without use of differential geometry

Ewa Ligocka (1981)

Annales Polonici Mathematici

Hp-theory on Euclidean space and the Dirac operator.

John E. Gilbert, Margaret A. M. Murray (1988)

Revista Matemática Iberoamericana

H(t) has functional attributes

G.A. Dawodu, A.A. Afolabi (2001)

Kragujevac Journal of Mathematics

Hua-harmonic functions on symmetric type two Siegel domains

Dariusz Buraczewski, Ewa Damek (2002)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

We study a natural system of second order differential operators on a symmetric Siegel domain $D$ that is invariant under the action of biholomorphic transformations. If $D$ is of type two, the space of real valued solutions coincides with pluriharmonic functions. We show the main idea of the proof and give a survey of previous results.

Hurwitz analysis: basic concepts and connection with Clifford analysis

Enrique Ramírez de Arellano, Nikolai Vasilevski, Michael Shapiro (1996)

Banach Center Publications

Hyperbolic Fourth-R Quadratic Equation and Holomorphic Fourth-R Polynomials

Apostolova, Lilia N. (2012)

Mathematica Balkanica New Series

MSC 2010: 30C10, 32A30, 30G35The algebra R(1; j; j2; j3), j4 = ¡1 of the fourth-R numbers, or in other words the algebra of the double-complex numbers C(1; j) and the corresponding functions, were studied in the papers of S. Dimiev and al. (see [1], [2], [3], [4]). The hyperbolic fourth-R numbers form other similar to C(1; j) algebra with zero divisors. In this note the square roots of hyperbolic fourth-R numbers and hyperbolic complex numbers are found. The quadratic equation with hyperbolic fourth-R...

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Holomorphic generators of some ideals in $C^{\infty} (\bar{D})$

Holomorphic Lipschitz functions and application to the $v \partial$ -problem

Holomorphic Lipschitz functions in balls.

Holomorphic mapping of annuli in $C^{n}$ and the associated extremal function

Holomorphic Mappings from the Ball and Polydisc.

Holomorphic Mappings in the Nevanlinna Class.

Holomorphic Morse Inequalities on Manifolds with Boundary