A New Definition of Limit of Periodic Function and Periodic g-Contractive Mapping at Infinity

Yun, Tian-Quan (2019) A New Definition of Limit of Periodic Function and Periodic g-Contractive Mapping at Infinity. In: Advances in Mathematics and Computer Science Vol. 1. B P International, pp. 130-136. ISBN 978-93-89246-18-6

Full text not available from this repository.

Abstract

Limit is a basic concept of calculus. However, according to the updated definition, the limit of periodic function
at infinity is not in existence. This conclusion of description does not suit with the periodic phenomenon. For
example, the temperature on earth is changed periodically every year since the birth of the earth (viewed
as t=0). Today (viewed as t →∞) the temperature on earth is continuing. Continuation means that the limit
exists. In this paper, a new definition of limit of periodic function and periodic g-contractive mapping at infinity
is defined by the value of its initial point based on transformation of variables. Similar definition is made for gcontractive
ratio of periodic g-contractive mapping with k-related fixed points. These definitions can be used to
describe the k-polar problems and calculation the limit of combinations of periodic functions at infinity.
Furthermore, the new definition on contractive ratio of periodic iterative g-contractive mapping at infinity can
help us to find the constant G and improves the application of the periodic iterative g-contractive mapping
theorem.

Item Type: Book Section
Subjects: Science Repository > Computer Science
Depositing User: Managing Editor
Date Deposited: 20 Nov 2023 03:45
Last Modified: 20 Nov 2023 03:45
URI: http://research.manuscritpub.com/id/eprint/3594

Actions (login required)

View Item
View Item