scholarly journals Exponential forms and path integrals for complex numbers inndimensions

2001 ◽  
Vol 25 (7) ◽  
pp. 429-450 ◽  
Author(s):  
Silviu Olariu
Keyword(s):  
Exponential Function ◽  
Complex Number ◽  
Path Integrals ◽  
Complex Numbers ◽  
Complex Polynomials ◽  
Hyperbolic Sine ◽  
Complex Functions ◽  
Geometric Variables ◽  
Sine And Cosine Functions ◽  
Cosine Functions

Two distinct systems of commutative complex numbers inndimensions are described, of polar and planar types. Exponential forms ofn-complex numbers are given in each case, which depend on geometric variables. Azimuthal angles, which are cyclic variables, appear in these forms at the exponent, and this leads to the concept of residue for path integrals ofn-complex functions. The exponential function of ann-complex number is expanded in terms of functions called in this paper cosexponential functions, which are generalizations tondimensions of the circular and hyperbolic sine and cosine functions. The factorization ofn-complex polynomials is discussed.

scholarly journals Winding Numbers, Unwinding Numbers, and the Lambert W Function

2021 ◽  
Author(s):  
A. F. Beardon
Keyword(s):  
Complex Plane ◽  
Complex Number ◽  
Lambert W Function ◽  
Complex Numbers ◽  
Winding Number ◽  
Line Integral ◽  
Complex Functions

AbstractThe unwinding number of a complex number was introduced to process automatic computations involving complex numbers and multi-valued complex functions, and has been successfully applied to computations involving branches of the Lambert W function. In this partly expository note we discuss the unwinding number from a purely topological perspective, and link it to the classical winding number of a curve in the complex plane. We also use the unwinding number to give a representation of the branches $$W_k$$ W k of the Lambert W function as a line integral.

scholarly journals Una introducción al método de dominio colorado con GeoGebra para la visualización y estudio de funciones complejas

2020 ◽  
Vol 9 (1) ◽  
pp. 101-119
Author(s):  
Juan Carlos Ponce Campuzano
Keyword(s):  
Complex Plane ◽  
Real Function ◽  
Complex Number ◽  
Digital Processing ◽  
Complex Domain ◽  
Complex Numbers ◽  
Isolated Singularities ◽  
Color Palette ◽  
Complex Functions ◽  
Multivalued Functions

RESUMENExisten diversos métodos para visualizar funciones complejas, tales como graficar por separado sus componentes reales e imaginarios, mapear o transformar una región, el método de superficies analíticas y el método de dominio coloreado. Este último es uno de los métodos más recientes y aprovecha ciertas características del color y su procesamiento digital. La idea básica es usar colores, luminosidad y sombras como dimensiones adicionales, y para visualizar números complejos se usa una función real que asocia a cada número complejo un color determinado. El plano complejo puede entonces visualizarse como una paleta de colores construida a partir del esquema HSV (del inglés Hue, Saturation, Value – Matiz, Saturación, Valor). Como resultado, el método de dominio coloreado permite visualizar ceros y polos de funciones, ramas de funciones multivaluadas, el comportamiento de singularidades aisladas, entre otras propiedades. Debido a las características de GeoGebra en cuanto a los colores dinámicos, es posible implementar en el software el método de dominio coloreado para visualizar y estudiar funciones complejas, lo cual se explica en detalle en el presente artículo.Palabras claves: funciones complejas, método de dominio coloreado, colores dinámicos. RESUMOExistem vários métodos para visualizar funções complexas, como plotar seus componentes reais e imaginários separadamente, mapear ou transformar uma região, o método de superfície analítica e o método de domínio colorido. Este último é um dos métodos mais recentes e aproveita certas características da cor e seu processamento digital. A ideia básica é usar cores e brilho ou sombras como dimensões adicionais e, para visualizar números complexos, é usada uma função real que associa uma cor específica a cada número complexo. O plano complexo pode então ser visualizado como uma paleta de cores construída a partir do esquema HSV (de Matiz, Saturação, Valor - Matiz, Saturação, Valor). Como resultado, o método do domínio colorido permite visualizar zeros e pólos de funções, ramificações de funções com múltiplos valores, o comportamento de singularidades isoladas, entre outras propriedades. Devido às características do GeoGebra em termos de cores dinâmicas, é possível implementar o método do domínio colorido para visualizar e estudar funções complexas, o que é explicado em detalhes neste artigo.Palavras-chave: funções complexas, método de domínio colorido, cores dinâmicas ABSTRACTThere are various methods to visualize complex functions, such as plotting their real and imaginary components separately, mapping or transforming a region, the analytical landscapes method and the domain coloring method. The latter is one of the most recent methods and takes advantage of certain characteristics of color and its digital processing. The basic idea is to use colors and brightness or shadows as additional dimensions and to visualize complex numbers a real function is used that associates a specific color to each complex number. The complex plane can then be visualized as a color palette constructed from the HSV scheme (from Hue, Saturation, Value - Hue, Saturation, Value). As a result, the domain coloring method allows to visualize zeroes and poles of functions, branches of multivalued functions, the behavior of isolated singularities, among others properties. Due to the characteristics of GeoGebra in terms of dynamic colors, it is possible to implement the colored domain method to visualize and study complex functions, which is explained in detail in this article.Keywords:  function; complex; domain; coloring.

scholarly journals Julia Set with Trigonometric Function

2019 ◽  
Vol 8 (2S7) ◽  
pp. 115-119
Keyword(s):  
Complex Number ◽  
Complex Dynamics ◽  
Julia Set ◽  
Julia Sets ◽  
New Class ◽  
Iteration Function ◽  
Cubic Polynomials ◽  
Constant Complex ◽  
Sine And Cosine Functions ◽  
Cosine Functions

Julia sets are generated by initializing a complex number z = x + yi where z is then iterated using the iteration function fc (z)= zn 2 + c, where n indicates the number of iteration and c is a constant complex number. Recently, study of cubic Julia sets was introduced in Noor Orbit (NO) with improved escape criterions for cubic polynomials. In this paper, we investigate the complex dynamics of different functions and apply the iteration function to generate an entire new class of Julia sets. Here, we introduce different types of orbits on cubic Julia sets with trigonometric functions. The two functions to investigate from Julia sets are sine and cosine functions.

Simultaneous approximation of numbers connected with the exponential function

1978 ◽  
Vol 25 (4) ◽  
pp. 466-478 ◽  
Author(s):  
Michel Waldschmidt
Keyword(s):  
Lower Bounds ◽  
Exponential Function ◽  
Complex Number ◽  
Simultaneous Approximation ◽  
Complex Numbers ◽  
Linear Forms In Logarithms ◽  
Algebraic Numbers ◽  
Linear Forms

AbstractWe give several results concerning the simultaneous approximation of certain complex numbers. For instance, we give lower bounds for |a–ξo |+ | ea – ξ1 |, where a is any non-zero complex number, and ξ are two algebraic numbers. We also improve the estimate of the so-called Franklin Schneider theorem concerning | b – ξ | + | a – ξ | + | ab – ξ. We deduce these results from an estimate for linear forms in logarithms.

scholarly journals On solutions of PDEs by using algebras

2021 ◽  
Author(s):  
ELIFALET LÓPEZ-GONZÁLEZ
Keyword(s):  
Vector Field ◽  
Exponential Function ◽  
Laplace’S Equation ◽  
Laplace's Equation ◽  
Differentiable Functions ◽  
Hyperbolic Sine ◽  
Hyperbolic Cosine ◽  
Dependent Variables ◽  
Planar Vector ◽  
Cosine Functions

The components of complex differentiable functions define solutions for the Laplace’s equation. In this paper we generalize this result; for each PDE of the form $Au_{xx}+Bu_{xy}+Cu_{yy}=0$ we give an affine planar vector field $\varphi$ and an associative and commutative 2D algebra with unit $\mathbb A$, with respect to which the components of all functions of the form $\mathcal L\circ\varphi$ define solutions for this PDE, where $\mathcal L$ is differentiable in the sense of Lorch with respect to $\mathbb A$. In the same way, for each PDE of the form $Au_{xx}+Bu_{xy}+Cu_{yy}+Du_x+Eu_y+Fu=0$, the components of the exponential function $e^{\varphi}$ defined with respect to $\mathbb A$, define solutions for this PDE. In the case of PDEs of the form $Au_{xx}+Bu_{xy}+Cu_{yy}+Fu=0$, sine, cosine, hyperbolic sine, and hyperbolic cosine functions can be used instead of the exponential function. Also, solutions for two dependent variables $3^{\text{th}}$ order PDEs and a $4^{\text{th}}$ order PDE are constructed.

Some Mellin-type Definite Integrals Involving Sine and Cosine Functions

2019 ◽  
Vol 10 (1) ◽  
pp. 222-237
Author(s):  
M. I. Qureshi ◽  
Kaleem A. Quraishi ◽  
Dilshad Ahamad
Keyword(s):  
Definite Integrals ◽  
Sine And Cosine Functions ◽  
Cosine Functions

SINS Installation Error Calibration Based on Multi-Position Combinations

2011 ◽  
Vol 383-390 ◽  
pp. 4213-4220
Author(s):  
Zhen Huan Wang ◽  
Xi Jun Chen ◽  
Qing Shuang Zeng
Keyword(s):  
Theoretical Analysis ◽  
Least Squares ◽  
Rotation Rate ◽  
Scale Factor ◽  
New Method ◽  
Earth’S Rotation ◽  
Earth's Rotation ◽  
Error Calibration ◽  
Sine And Cosine Functions ◽  
Cosine Functions

A new method is proposed to calibrate the installation errors of SINS. According to the method, the installation errors of the gyro and accelerometer can be calibrated simultaneously, which not depend on latitude, gravity, scale factor and earth's rotation rate. By the multi-position combinations, the installation errors of the gyro and accelerometer are modulated into the sine and cosine functions, which can be identified respectively based on the least squares. In order to verify the correctness of the theoretical analysis, the SINS is experimented by a three-axis turntable, and the installation errors of the gyro and accelerometer are identified respectively according to the proposed method. After the compensation of the installation error, the accuracy of the SINS is improved significantly.

Sign in / Sign up

Export Citation Format

Share Document