It is known that one of the important formulas for holomorphic functions is Cauchy's integral formula. Using this formula, the function given on the boundary can be restored holomorphically within the domain
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
One of the important formulas for know holomorphic functions is is Couchy”s integral formula. Using...
Abstract This is an introductory review of the connection between ho-motopy theory and path integral...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Let $W$ be a domain in a complex manifold $M$. In 2008 B. J\"oricke found a way to extend holomorphi...
Let $W$ be a domain in a complex manifold $M$. In 2008 B. J\"oricke found a way to extend holomorphi...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
We study the third Cauchy-Fantappie formula, an integral representation formula for holomorphic fun...
The problem of describing the function given on a part of the boundary of a domain which can be anal...
This article studies on Cauchy's function f(z) and its integral, (2 pi i)J[f(z)] equivalent to close...
This short note is just a expanded version of [1], where it was obtained a simple proof of Cayley-Ha...
Abstract. We study the third Cauchy-Fantappie ̀ formula, an integral representation for-mula for hol...
Volume III sets out classical Cauchy theory. It is much more geared towards its innumerable applicat...
AbstractWe derive a Cauchy–Fantappiè type formula which expresses the derivatives of holomorphic fun...
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
One of the important formulas for know holomorphic functions is is Couchy”s integral formula. Using...
Abstract This is an introductory review of the connection between ho-motopy theory and path integral...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Let $W$ be a domain in a complex manifold $M$. In 2008 B. J\"oricke found a way to extend holomorphi...
Let $W$ be a domain in a complex manifold $M$. In 2008 B. J\"oricke found a way to extend holomorphi...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
We study the third Cauchy-Fantappie formula, an integral representation formula for holomorphic fun...
The problem of describing the function given on a part of the boundary of a domain which can be anal...
This article studies on Cauchy's function f(z) and its integral, (2 pi i)J[f(z)] equivalent to close...
This short note is just a expanded version of [1], where it was obtained a simple proof of Cayley-Ha...
Abstract. We study the third Cauchy-Fantappie ̀ formula, an integral representation for-mula for hol...
Volume III sets out classical Cauchy theory. It is much more geared towards its innumerable applicat...
AbstractWe derive a Cauchy–Fantappiè type formula which expresses the derivatives of holomorphic fun...
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
An extension theorem for holomorphic mappings between two domains in C-2 is proved under purely loca...
One of the important formulas for know holomorphic functions is is Couchy”s integral formula. Using...
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