MAHMOOD AL-SALEM, S. (2014). The Permutation Topological Spaces and their Bases. Alustath, 32(1), 28-42.
SHUKER MAHMOOD AL-SALEM. "The Permutation Topological Spaces and their Bases". Alustath, 32, 1, 2014, 28-42.
MAHMOOD AL-SALEM, S. (2014). 'The Permutation Topological Spaces and their Bases', Alustath, 32(1), pp. 28-42.
MAHMOOD AL-SALEM, S. The Permutation Topological Spaces and their Bases. Alustath, 2014; 32(1): 28-42.

The Permutation Topological Spaces and their Bases

basrah journal of science
Article 1, Volume 32, Issue 1, February 2014, Pages 28-42    PDF (0 K)
Author
SHUKER MAHMOOD AL-SALEM
Abstract
Given a permutation in the symmetric group on letters, we present permutation topological space and others new concepts in topology field such as sets, permutation subspace , permutation continuous, decomposition, connected. In this paper we prove that every permutation space is an Lindelof space. Moreover, we prove that, if the spaces are permutation topological spaces. Then the product permutation topology on has a countable base, and we give a number of examples
Keywords
Symmetric group; Lindelof space; continuity; permutation; connectedness MSC
Statistics
Article View: 174
PDF Download: 60


Journal Management System. Powered by ejournalplus.com