Article
WEIGHTED DYNAMIC ESTIMATES FOR CONVEX AND SUBHARMONIC FUNCTIONS ON TIME SCALES
Mathematical Inequalities and Applications
Abstract
This article introduces a new type of weighted square delta integral inequalities involving the delta derivative of a convex function. As an extension, we also establish weighted square delta integral inequalities for subharmonic functions on time scales. Here, we rely on a new definition of the time scales Laplace operator. The significance of this work in the existing literature is provided at the end of the article.
Department(s)
Mathematics and Statistics
Keywords and Phrases
- convex function,
- Poincaré-type inequality,
- subharmonic function,
- Time scale integrals
Document Type
Article - Journal
Document Version
Citation
File Type
text
Language(s)
English
Rights
© 2023 Ele-Math, All rights reserved.
Publication Date
4-1-2023
Publication Date
01 Apr 2023
Disciplines
Citation Information
Hira Ashraf Baig, Martin Bohner, Naveed Ahmad and Muhammed Shoaib Saleem. "WEIGHTED DYNAMIC ESTIMATES FOR CONVEX AND SUBHARMONIC FUNCTIONS ON TIME SCALES" Mathematical Inequalities and Applications Vol. 26 Iss. 2 (2023) p. 499 - 510 ISSN: 1331-4343 Available at: http://works.bepress.com/martin-bohner/246/