Acta Marisiensis.
Seria Technologica



 ISSN 2668-4217
ISSN-L 2668-4217
(Online)


Română
HomeEditorial boardSubmit paperPublication ethicsContactIndexing
Year 2023
Volume 20 (XXXVII), no 1
Volume 20 (XXXVII), no 2
Year 2022
Volume 19 (XXXVI), no 1
Volume 19 (XXXVI), no 2
Year 2021
Volume 18 (XXXV), no 1
Volume 18 (XXXV), no 2
Year 2020
Volume 17 (XXXIV), no 1
Volume 17 (XXXIV), no 2
Year 2019
Volume 16 (XXXIII), no 1
Volume 16 (XXXIII), no 2
Year 2018
Volume 15 (XXXII), no 1
Volume 15 (XXXII), no 2
Year 2017
Volume 14 (XXXI), no 1
Volume 14 (XXXI), no 2
Year 2016
Volume 13 (XXX), no 1
Volume 13 (XXX), no 2
Year 2015
Volume 12 (XXIX), no 1
Volume 12 (XXIX), no 2
Year 2014
Volume 11 (XXVIII), no 1
Volume 11 (XXVIII), no 2
Year 2013
Volume 10 (XXVII), no 1
Volume 10 (XXVII), no 2
Year 2012
Volume 9 (XXVI), no 1
Volume 9 (XXVI), no 2
Year 2011
Volume 8 (XXV), no 1
Volume 8 (XXV), no 2
Year 2010
Volume 7 (XXIV), no 1
Volume 7 (XXIV), no 2
Year 2009
Volume 6 (XXIII)

2023, Volume 20 (XXXVII), no 2

Note on: “the Complex Version of a Result for Real Iterative Functions”

Author(s):
Sushil Kumar BHUIYA, Gopal DAS, Department of Mathematics, Murshidabad University, West Bengal, India

Abstract:
Finta [2], recently proposed a complex version of iteration procedures for holomorphic functions. The general theorem of the complex iteration function has developed by using the complex mean value theorem and discussed several iterative procedures for holomorphic functions. In this paper, we redevelop the general theorem of the complex iteration function by applying the fundamental theorem of the complex line integral. It is shown that all the results derived in the paper of Finta have been improved by the results of this paper.

DOI: https://doi.org/10.2478/amset-2023-0016

Pages: 38-42

View full article
Update: 21-Mar-2024 © Published by University Press