ψ-weighted Cauchy-Riemann operators and some associated integral representation

Eusebio Ariza; Antonio Di Teodoro; Carmen Judith Vanegas

doi:10.2989/16073606.2019.1574928

ψ-weighted Cauchy-Riemann operators and some associated integral representation

Eusebio Ariza
, Antonio Di Teodoro^*
, Carmen Judith Vanegas

^*Corresponding author for this work

Matemáticas

Universidad Yachay Tech
Departamento de Matemáticas y Estadística and Universidad Técnica de Manabí
Universidad Simón Bolívar

Research output: Contribution to journal › Review article › peer-review

4 Scopus citations

Abstract

In the present work we introduce a weighted Cauchy-Riemann type operator in the complex plane, where the weights are complex non-constant functions. We construct a fundamental solution for this operator where the weights are complex constant functions and orthogonal functions inspired by the idea for the construction of the Levy function proposed by Miranda (see [23]). Therefore we obtain a Cauchy-Pompeiu integral representation formula. We also present some examples of such representations when we take some particular weights.

Original language	English
Pages (from-to)	335-360
Number of pages	26
Journal	Quaestiones Mathematicae
Volume	43
Issue number	3
DOIs	https://doi.org/10.2989/16073606.2019.1574928
State	Published - 3 Mar 2020

Keywords

Cauchy integral formula
Cauchy-Pompeiu integral formula
Weighted Cauchy-Riemann operator
elliptic operator

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10.2989/16073606.2019.1574928

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title = "ψ-weighted Cauchy-Riemann operators and some associated integral representation",

abstract = "In the present work we introduce a weighted Cauchy-Riemann type operator in the complex plane, where the weights are complex non-constant functions. We construct a fundamental solution for this operator where the weights are complex constant functions and orthogonal functions inspired by the idea for the construction of the Levy function proposed by Miranda (see [23]). Therefore we obtain a Cauchy-Pompeiu integral representation formula. We also present some examples of such representations when we take some particular weights.",

keywords = "Cauchy integral formula, Cauchy-Pompeiu integral formula, Weighted Cauchy-Riemann operator, elliptic operator",

author = "Eusebio Ariza and \{Di Teodoro\}, Antonio and Vanegas, \{Carmen Judith\}",

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T1 - ψ-weighted Cauchy-Riemann operators and some associated integral representation

AU - Ariza, Eusebio

AU - Di Teodoro, Antonio

AU - Vanegas, Carmen Judith

PY - 2020/3/3

Y1 - 2020/3/3

N2 - In the present work we introduce a weighted Cauchy-Riemann type operator in the complex plane, where the weights are complex non-constant functions. We construct a fundamental solution for this operator where the weights are complex constant functions and orthogonal functions inspired by the idea for the construction of the Levy function proposed by Miranda (see [23]). Therefore we obtain a Cauchy-Pompeiu integral representation formula. We also present some examples of such representations when we take some particular weights.

AB - In the present work we introduce a weighted Cauchy-Riemann type operator in the complex plane, where the weights are complex non-constant functions. We construct a fundamental solution for this operator where the weights are complex constant functions and orthogonal functions inspired by the idea for the construction of the Levy function proposed by Miranda (see [23]). Therefore we obtain a Cauchy-Pompeiu integral representation formula. We also present some examples of such representations when we take some particular weights.

KW - Cauchy integral formula

KW - Cauchy-Pompeiu integral formula

KW - Weighted Cauchy-Riemann operator

KW - elliptic operator

UR - https://www.scopus.com/pages/publications/85082585543

U2 - 10.2989/16073606.2019.1574928

DO - 10.2989/16073606.2019.1574928

M3 - Artículo de revisión

AN - SCOPUS:85082585543

SN - 1607-3606

VL - 43

SP - 335

EP - 360

JO - Quaestiones Mathematicae

JF - Quaestiones Mathematicae

IS - 3

ER -

ψ-weighted Cauchy-Riemann operators and some associated integral representation

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Keywords

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