- NIELSEN COINCIDENCE POINT THEORY
Keywords:
NON
Abstract
Let be maps of a compact connected Riemannian manifold, with or without boundary. For > 0 sufficiently small, we introduce an – Nielsen coincidence number that is a lower bound for the number of coincidence points of all self – maps that are - homotopic to f and g. We prove that there is always maps that is – homotopic to f and g such that and have exactly coincidence points.
Published
2018-08-08
How to Cite
AL-Ta’iy, B. J. (2018). - NIELSEN COINCIDENCE POINT THEORY. Al-Nahrain Journal of Science, 12(3), 161-166. Retrieved from https://anjs.edu.iq/index.php/anjs/article/view/1223
Section
Articles
Statement of the Agreement This is an agreement under which all authors(represented by the corresponding author)of the article grant license to publish your article (titled in this document)including abstract, data, tables and figures and their explanation and the supplemental materials (if provided) in Al-Nahrain Journal of Science. This agreement is valid for the full period of copyright throughout the world and the right to publication is granted in all forms, formats and in all media of this time and in the future. This agreement includes that all the authors comply with the Journal’s policies on peer-review and publishing ethics. This agreement must be read, understood and agreed to the terms and conditions of this agreement.
.jpg)
