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
AN ANSWER TO A QUESTION ON THE AFFINE BIJECTIONS ON C(X, I)
Date
2009-03-01
Author
ERCAN, ZAFER
Önal, Süleyman
Metadata
Show full item record
This work is licensed under a
Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License
.
Item Usage Stats
137
views
0
downloads
Cite This
A complete description of the bijective a. ne map on C(X, I) is given. This provides an answer to a question of [2] on the affine bijections on C(X, I).
Subject Keywords
Mathematics (miscellaneous)
URI
https://hdl.handle.net/11511/48228
Journal
QUAESTIONES MATHEMATICAE
DOI
https://doi.org/10.2989/qm.2009.32.1.9.711
Collections
Department of Mathematics, Article
Suggestions
OpenMETU
Core
On characterization of a Riesz homomorphism on C(X)-space
AKKAR ERCAN, ZÜBEYDE MÜGE; Önal, Süleyman (Informa UK Limited, 2007-06-01)
Let X be a realcompact space. We present a very simple and elementary proof of the well known fact that every Riesz homomorphism pi : C(X) -> R is point evaluated. Moreover, the proof is given in ZF.
An obstruction to finding algebraic models for smooth manifolds with prescribed algebraic submanifolds
CELIKTEN, A; Ozan, Yıldıray (2001-03-01)
Let N ⊆ M be a pair of closed smooth manifolds and L an algebraic model for the submanifold N. In this paper, we will give an obstruction to finding an algebraic model X of M so that the submanifold N corresponds in X to an algebraic subvariety isomorphic to L.
A new representation of the Dedekind completion of C(K)-spaces
Ercan, Z; Onal, S (American Mathematical Society (AMS), 2005-01-01)
A new representation of the Dedekind completion of C( K) is given. We present a necessary and sufficient condition on a compact Haus-dorff space K for which the Dedekind completion of C(K) is B(S), the space of real valued bounded functions on some set S.
An answer to a question of Cao, Reilly and Xiong
Ercan, Z.; Onal, S. (Institute of Mathematics, Czech Academy of Sciences, 2006-01-01)
We present a simple proof of a Banach-Stone type Theorem. The method used in the proof also provides an answer to a conjecture of Cao, Reilly and Xiong.
The exponential of a constant matrix on time scales
Zafer, Ağacık (Cambridge University Press (CUP), 2006-07-01)
In this paper we describe an elementary method for calculating the matrix exponential on an arbitrary time scale. An example is also given to illustrate the result.
Citation Formats
IEEE
ACM
APA
CHICAGO
MLA
BibTeX
Z. ERCAN and S. Önal, “AN ANSWER TO A QUESTION ON THE AFFINE BIJECTIONS ON C(X, I),”
QUAESTIONES MATHEMATICAE
, pp. 115–117, 2009, Accessed: 00, 2020. [Online]. Available: https://hdl.handle.net/11511/48228.
