International Journal of Science and Research (IJSR)

International Journal of Science and Research (IJSR)
Call for Papers | Open Access | Double Blind Reviewed

ISSN: 2319-7064


Downloads: 229 | Views: 229 | Weekly Hits: ⮙1 | Monthly Hits: ⮙2

Research Paper | Mathematics | India | Volume 4 Issue 11, November 2015


Brouwers Fixed Point Theorem

Yogesh Chandra C


Abstract: The theorem is important illustration of progress of branch algebraic topology and base for functional analysis and fixed point theorem. Provides generalization and proof to fixed point theorem, game theory, central limit theorem and gave way to new branch of mathematics Fixed point theory used extensively. Lack of interest in analysis situ, unnoticed theory, use of false intuitionism against set theory created problems, the method used is continuous mapping, Euclidean spaces, algebraic topology, the results of this theory are unconstructive and let to constructivity idea. Thus theory provided significant proof, generalization to many important theorem.


Keywords: Homology, Euclidean space, Banach space, one dimensional scale, topology, contraction, vector fields


Edition: Volume 4 Issue 11, November 2015,


Pages: 1 - 3


How to Download this Article?

You Need to Register Your Email Address Before You Can Download the Article PDF


How to Cite this Article?

Yogesh Chandra C, "Brouwers Fixed Point Theorem", International Journal of Science and Research (IJSR), Volume 4 Issue 11, November 2015, pp. 1-3, https://www.ijsr.net/get_abstract.php?paper_id=NOV151003

Similar Articles with Keyword 'Euclidean space'

Downloads: 101 | Weekly Hits: ⮙1 | Monthly Hits: ⮙1

Research Paper, Mathematics, Saudi Arabia, Volume 5 Issue 11, November 2016

Pages: 1104 - 1109

Some New Characterizations of Spacelike Curves According to Type-2 Bishop Frame in Eculidean 4- Space E_1^4

Fathi Mohamed Daw-Albait Elzaki [2] | Abdoalrahman Salih Abdoalrahman Omer

Share this Article

Downloads: 124

Research Paper, Mathematics, Nigeria, Volume 7 Issue 8, August 2018

Pages: 1653 - 1656

Methods for Determining Fractal Dimensions

Maurice Nnamdi ANNORZIE

Share this Article
Top