Add to ORKGCauchy's Theorem. Let R be a simply connected domain and f a function on R to E[squared] which is differentiable over R. Let C be any closed rectifiable curve in R. Then I [integral][lowerd C]f(z)dz = 0. Through the years Cauchy's Theorem was the only means of proving that if a complex valued function f(z) is differentiable over a domain R then f(z) has derivatives of all orders in R. A proof of the above statement without the use of an Integral was given for the first time in 1960 by H. E. Connell, The purpose of this thesis is to make a resume of all the theorems leading to Connell's proof.Mathematics, Department o
This article studies on Cauchy's function f(z) and its integral, (2 pi i)J[f(z)] equivalent to close...
In this paper we introduce an alternative way of defining the curvilinear Cauchy integral over non-r...
We provide a simple example showing that the tangential derivative of a continuous function φ can va...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Abstract. In the theory of complex valued functions of a complex variable arguably the first strikin...
Complex numbers, complex functions, singularity, analytic function, integrable functions, Cauchy's t...
This paper presents some basic theory of analytic function. The class of analytic functions is forme...
We conclude with four observations: (a) The curves z(s) and z(s, t) were not required to be simple c...
We develop differentiation theory based on a new definition of derivative: in terms of integrals of ...
Volume III sets out classical Cauchy theory. It is much more geared towards its innumerable applicat...
This article studies on Cauchy’s function f (z) and its integral, (2πi)J[f(z)] ≡ ∮f(t)dt(t−z) taken...
This article studies on Cauchy’s function f (z) and its integral, (2πi)J[f(z)] ≡ ∮f(t)dt(t−z) taken...
In the theory of complex-valued functions of a complex variable, arguably the first striking theorem...
In this paper we introduce an alternative way of defining the curvilinear Cauchy integral over non-r...
This article studies on Cauchy's function f(z) and its integral, (2 pi i)J[f(z)] equivalent to close...
In this paper we introduce an alternative way of defining the curvilinear Cauchy integral over non-r...
We provide a simple example showing that the tangential derivative of a continuous function φ can va...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Cauchy-Goursat integral theorem is pivotal, fundamentally important, and well celebrated result in c...
Abstract. In the theory of complex valued functions of a complex variable arguably the first strikin...
Complex numbers, complex functions, singularity, analytic function, integrable functions, Cauchy's t...
This paper presents some basic theory of analytic function. The class of analytic functions is forme...
We conclude with four observations: (a) The curves z(s) and z(s, t) were not required to be simple c...
We develop differentiation theory based on a new definition of derivative: in terms of integrals of ...
Volume III sets out classical Cauchy theory. It is much more geared towards its innumerable applicat...
This article studies on Cauchy’s function f (z) and its integral, (2πi)J[f(z)] ≡ ∮f(t)dt(t−z) taken...
This article studies on Cauchy’s function f (z) and its integral, (2πi)J[f(z)] ≡ ∮f(t)dt(t−z) taken...
In the theory of complex-valued functions of a complex variable, arguably the first striking theorem...
In this paper we introduce an alternative way of defining the curvilinear Cauchy integral over non-r...
This article studies on Cauchy's function f(z) and its integral, (2 pi i)J[f(z)] equivalent to close...
In this paper we introduce an alternative way of defining the curvilinear Cauchy integral over non-r...
We provide a simple example showing that the tangential derivative of a continuous function φ can va...