Open Access$\omega$-Connectedness and Local $\omega$-Connectedness on an L$\omega$-Space
Author(s) -
Zhaoxia Huang
Publication year - 2009
Publication title -
journal of mathematics research
Language(s) - English
Resource type - Journals
eISSN - 1916-9809
pISSN - 1916-9795
DOI - 10.5539/jmr.v1n2p87
Subject(s) - social connectedness , mathematics , omega , coincidence , local property , invariant (physics) , space (punctuation) , pure mathematics , property (philosophy) , connected space , topology (electrical circuits) , discrete mathematics , topological space , combinatorics , mathematical physics , physics , computer science , quantum mechanics , medicine , psychology , philosophy , alternative medicine , epistemology , pathology , psychotherapist , operating system
In this paper, the concepts of the ?-coincidence neighborhood, local ?-connected set and local ?-connected space on an L?-space are introduced. The characterizations of the concepts are given, such as topological invariant property and good extension