The authors consider the problem of characterizing the exterior differential forms which are orthogonal to holomorphic functions (or forms) in a domain D\subset {\mathbf C}^n with respect to integration over the boundary, and some related questions. They give a detailed account of the derivation of the Bochner-Martinelli-Koppelman integral representation of exterior differential forms, which was obtained in 1967 and has already found many important applications. They study the properties of \overline \partial-closed forms of type (p, n - 1), 0\leq p\leq n - 1, which turn out to be the duals (with respect to the orthogonality mentioned above) to holomorphic functions (or forms) in several complex variables, and resemble holomorphic functions...
We review Pólya vector fields associated to holomorphic functions as an important pedagogical tool f...
In the present Paper, the term „differential equations“ means systems of differential equations with...
Since the times of Gauss, Riemann, and Poincare, one of the principal goals of the study of manifold...
summary:This article deals with vector valued differential forms on $C^\infty$-manifolds. As a gener...
We study two natural notions of holomorphic forms on a reduced pure $n$-dimensional complex space $X...
The monograph is devoted to integral representations for holomorphic functions in several complex va...
A Bokhner - Martinelli integral, holomorphic functions, CR-functions, multidimensional residues are ...
summary:We prove that the only natural differential operations between holomorphic forms on a comple...
A pedagogical application-oriented introduction to the calculus of exterior differential forms on d...
By means of the invariant integral kernel (Demailly and Laurent-Thiebaut kernel), complex Finsler me...
We use methods from exterior differential systems (EDS) to develop a geometric theory of scalar, fir...
No presente trabalho se aborda o cálculo de forma usando o formalismo das formas diferenciais. Isso ...
运用Cn 中的Hodge 算子、 算子及其伴随形式得到Cn 中 (p ,q) (0 ≤p ,q ≤n)型微分形式的Bochner Martinelli Koppelman核Kp ,q(ζ ,z) ,并...
Abstract: The theory of exterior differential systems is applied to study integrability of a set of ...
The Hodge decompOsition is a useful tool for tensor analysis on compact manifolds with boundary. Thi...
We review Pólya vector fields associated to holomorphic functions as an important pedagogical tool f...
In the present Paper, the term „differential equations“ means systems of differential equations with...
Since the times of Gauss, Riemann, and Poincare, one of the principal goals of the study of manifold...
summary:This article deals with vector valued differential forms on $C^\infty$-manifolds. As a gener...
We study two natural notions of holomorphic forms on a reduced pure $n$-dimensional complex space $X...
The monograph is devoted to integral representations for holomorphic functions in several complex va...
A Bokhner - Martinelli integral, holomorphic functions, CR-functions, multidimensional residues are ...
summary:We prove that the only natural differential operations between holomorphic forms on a comple...
A pedagogical application-oriented introduction to the calculus of exterior differential forms on d...
By means of the invariant integral kernel (Demailly and Laurent-Thiebaut kernel), complex Finsler me...
We use methods from exterior differential systems (EDS) to develop a geometric theory of scalar, fir...
No presente trabalho se aborda o cálculo de forma usando o formalismo das formas diferenciais. Isso ...
运用Cn 中的Hodge 算子、 算子及其伴随形式得到Cn 中 (p ,q) (0 ≤p ,q ≤n)型微分形式的Bochner Martinelli Koppelman核Kp ,q(ζ ,z) ,并...
Abstract: The theory of exterior differential systems is applied to study integrability of a set of ...
The Hodge decompOsition is a useful tool for tensor analysis on compact manifolds with boundary. Thi...
We review Pólya vector fields associated to holomorphic functions as an important pedagogical tool f...
In the present Paper, the term „differential equations“ means systems of differential equations with...
Since the times of Gauss, Riemann, and Poincare, one of the principal goals of the study of manifold...