Abstract

In this article, the authors introduce Qi’s normalized remainder of the Maclaurin series expansion of Qi’s normalized remainder for the cosine function. By virtue of a monotonicity rule for the quotient of two series and with the aid of an increasing monotonicity of a sequence involving the quotient of two consecutive non-zero Bernoulli numbers, they prove the logarithmic convexity of Qi’s normalized remainder. In view of a higher order derivative formula for the quotient of two functions, they expand the logarithm of Qi’s normalized remainder into a Maclaurin series whose coefficients are expressed in terms of determinants of a class of specific Hessenberg matrices. In light of a monotonicity rule for the quotient of two series, they present the monotonicity of the ratio between two normalized remainders. Finally, the authors connect two of their main results with the generalized hypergeometric functions.

Details

Title
Monotonicity, convexity, and Maclaurin series expansion of Qi's normalized remainder of Maclaurin series expansion with relation to cosine
Author
Wei-Juan, Pei 1 ; Bai-Ni, Guo 2   VIAFID ORCID Logo 

 School of Economics, Henan Kaifeng College of Science Technology and Communication, Kaifeng 475001, Henan, P. R. China 
 School of Mathematics and Informatics, Henan Polytechnic University, Jiaozuo, Henan, 454010, P. R. China ; Independent Researcher, University Village, Dallas, TX 75252-8024, United States of America 
Publication year
2024
Publication date
2024
Publisher
De Gruyter Poland
e-ISSN
23915455
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1515/math-2024-0095
ProQuest document ID
3134609696
Copyright
© 2024. This work is published under http://creativecommons.org/licenses/by/4.0 (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.