Show/Hide Menu
Hide/Show Apps
Logout
Türkçe
Türkçe
Search
Search
Login
Login
OpenMETU
OpenMETU
About
About
Open Science Policy
Open Science Policy
Communities & Collections
Communities & Collections
Help
Help
Frequently Asked Questions
Frequently Asked Questions
Guides
Guides
Thesis submission
Thesis submission
MS without thesis term project submission
MS without thesis term project submission
Publication submission with DOI
Publication submission with DOI
Publication submission
Publication submission
Supporting Information
Supporting Information
General Information
General Information
Copyright, Embargo and License
Copyright, Embargo and License
Contact us
Contact us
Recent Trends in Boundary Value Problems
Download
index.pdf
Date
2013-01-01
Author
Ahmad, Bashir
Nieto, Juan J.
O'Regan, Donal
Zafer, Ağacık
Metadata
Show full item record
This work is licensed under a
Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License
.
Item Usage Stats
74
views
43
downloads
Cite This
Subject Keywords
Mathematics
,
Applied mathematics
URI
https://hdl.handle.net/11511/57631
Journal
ABSTRACT AND APPLIED ANALYSIS
DOI
https://doi.org/10.1155/2013/431375
Collections
Department of Mathematics, Article
Suggestions
OpenMETU
Core
Concrete description of CD0(K)-spaces as C(X)-spaces and its applications
Ercan, Z (American Mathematical Society (AMS), 2004-01-01)
We prove that for a compact Hausdorff space K without isolated points, CD0(K) and C(K x {0, 1}) are isometrically Riesz isomorphic spaces under a certain topology on K x {0, 1}. Moreover, K is a closed subspace of K x {0, 1}. This provides concrete examples of compact Hausdorff spaces X such that the Dedekind completion of C(X) is B(S) (= the set of all bounded real-valued functions on S) since the Dedekind completion of CD0(K) is B(K) (CD0(K, E) and CDw (K, E) spaces as Banach lattices).
An observation on realcompact spaces
Ercan, Z (American Mathematical Society (AMS), 2006-01-01)
We give a characterization of realcompact spaces in terms of nets. By using the technique of this characterization we give easy proofs of the Tychonoff Theorem and the Alaoglu Theorem.
Functional Differential and Difference Equations with Applications 2013
Diblik, J.; Braverman, E.; Gyori, I.; Rogovchenko, Yu.; Ruzickova, M.; Zafer, Ağacık (2014-01-01)
Nonlinear oscillation of second-order dynamic equations on time scales
Anderson, Douglas R.; Zafer, Ağacık (Elsevier BV, 2009-10-01)
Interval oscillation criteria are established for a second-order nonlinear dynamic equation on time scales by utilizing a generalized Riccati technique and the Young inequality. The theory can be applied to second-order dynamic equations regardless of the choice of delta or nabla derivatives.
On oscillation and nonoscillation of second-order dynamic equations
Zafer, Ağacık (Elsevier BV, 2009-01-01)
New oscillation and nonoscillation criteria are established for second-order linear equations with damping and forcing terms. Examples are given to illustrate the results.
Citation Formats
IEEE
ACM
APA
CHICAGO
MLA
BibTeX
B. Ahmad, J. J. Nieto, D. O’Regan, and A. Zafer, “Recent Trends in Boundary Value Problems,”
ABSTRACT AND APPLIED ANALYSIS
, pp. 0–0, 2013, Accessed: 00, 2020. [Online]. Available: https://hdl.handle.net/11511/57631.