Delta-quasi-slowly oscillating continuity
In this paper, a new concept of Delta-quasi-slowly oscillating continuity is introduced. Furthermore, it is shown that this kind of continuity implies ordinary continuity. A new type of compactness is also defined and some new results related to compactness are proved. (C) 2010 Elsevier Inc. All rights reserved.
SourceAPPLIED MATHEMATICS AND COMPUTATION
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Firstly, some definitions and notations will be given in the following. Throughout this paper, N will denote the set of all positive integers. We will use boldface letters x,y,z,. . . for sequences x = (xn),y = (yn),z= ...
Cakalli, Huseyin (PERGAMON-ELSEVIER SCIENCE LTD, 2011)A sequence (x(n)) of points in a topological group is called Delta-quasi-slowly oscillating if (Delta x(n)) is quasi-slowly oscillating, and is called quasi-slowly oscillating if (Delta x(n)) is slowly oscillating. A ...
Atagun, Murat Ilhan; Guntekin, Bahar; Tan, Devran; Tulay, Emine Elif; Basar, Erol (ELSEVIER SCIENCE BV, 2015)Background: Previous resting-state electroencephalography studies have consistently shown that lithium enhances delta and theta oscillations in default mode networks. Cognitive task based networks differ horn resting-state ...