Pointwise convergence and Ascoli theorems for nearness spaces
-
Yang, Zhanbo [1]
-
[1] University of the Incarnate Word
University of the Incarnate Word
Estados Unidos
-
- Localización: Applied general topology, ISSN-e 1989-4147, ISSN 1576-9402, Vol. 10, Nº. 1, 2009, págs. 49-68
- Idioma: inglés
- DOI: 10.4995/agt.2009.1787
- Enlaces
-
Resumen
We first study subspaces and product spaces in the context of nearness spaces and prove that U-N spaces, C-N spaces, PN spaces and totally bounded nearness spaces are nearness hereditary; T-N spaces and compact nearness spaces are N-closed hereditary. We prove that N2 plus compact implies N-closed subsets. We prove that totally bounded, compact and N2 are productive. We generalize the concepts of neighborhood systems into the nearness spaces and prove that the nearness neighborhood systems are consistent with existing concepts of neighborhood systems in topological spaces, uniform spaces and proximity spaces respectively when considered in the respective sub-categories. We prove that a net of functions is convergent under the pointwise convergent nearness structure if and only if its cross-section at each point is convergent. We have also proved two Ascoli-Arzelà type of theorems.
-
Referencias bibliográficas
- H. L. Bentley, J. W. Carlson and H, Herrlich, On the epireflective Hull of Top in Near, Topology Appl. 153 (2007), 3071-3084. http://dx.doi.org/10.1016/j.topol.2005.04.013
- H. L. Bentley and H. Herrlich, Compleness Is Productiver, Categorical Topology (Dold A. and Eckmann B., Eds.), 719 Proceedings, Berlin , Springer-Verlag,...
- H. L. Bentley and H. Herrlich, Ascoli’s Theorem for a Class of Merotopic spaces, Convergence Structures (Dold A. and Eckmann B. Eds.), Proc....
- B. B. Chaudhuri, A new definition of neighborhood of a point in multi-dimensional space, Pattern Recognition Letters 17 (1996), 11–17. http://dx.doi.org/10.1016/0167-8655(95)00093-3
- P. R. Fu, Proximity on Function Space of Set-Valued Functions, Journal of Mathematics 13, no. 3 (1993), 347–350.
- J. W. Gray, Ascoli’s Theorem for topological categories, Categorical Aspects of Topology and Analysis (Dold A. and Eckmann B. Eds.), 915 Proceedings,...
- N. C. Heldermann, Concentrated Nearness Spaces, Categorical Topology (Dold A. and Eckmann B., Eds.), 719 Proceedings, Berlin , Springer-Verlag,...
- H. Herrlicht, A Concept of Nearness, General Topology and Application 5 (1974), 191–212. http://dx.doi.org/10.1016/0016-660X(74)90021-X
- W. N. Hunsaker and P. L. Sharma, Nearness Structure Compatible with a Topological Space, Arch. Math. XXV (1974), 172–178. http://dx.doi.org/10.1007/BF01238660
- V. M. Ivanova and A. A. Ivanov, Contiguity spaces and bicompact extensions, Izv. Akad. Nauk. SSSR 23 (1959), 613–634.
- J. L. Kelley, General Topology, (D. Van Norstrand, Princeton Toronto London New Work, 1974).
- L. Latecki and F. Prokop, Semi-proximity continuous functions in digital images, Pattern Recognition Letters 16 (1995), 1175–1187. http://dx.doi.org/10.1016/0167-8655(95)00069-S
- Y. F. Lin and D. Rose, Ascoli’s Theorem for Spaces of Multifunctions, Pacific Journal of Mathematics 34, no. 3 (1970), 741–747. http://dx.doi.org/10.2140/pjm.1970.34.741
- S. A. Naimpally and B. D. Warrack, Proximity Spaces, (Cambridge University Press, London 1970).
- J. F. Peters, A. Skowron and J. Stepaniuk, Nearness of Objects: Extension of Approximation Space Model, Fundamenta Informaticae 79 (2007),...
- P. Ptak and W. G. Kropatsch, Nearness in Digital Images and Proximity Spaces, DGCI 2000, LNCS 1953 (2000), 69–77.
- G. Sonck, An Ascoli Theorem for Sequential Spaces, Int. J. Math. Math. Sci. 26, no. 5 (2001), 303–315. http://dx.doi.org/10.1155/S0161171201004264
- M. Wolski, Approximation Spaces and Nearness Structures, Fundamenta Informaticae 79 (2007), 567–577.
- Z. Yang, A New Proof on Embedding the Category of Proximity Spaces into the Category of Nearness Spaces, Fundamenta Informaticae 88, no. 1-2...
- J. Adàmek, H. Herrlich and G. E. Strecker, Abstract and Concrete Categories, The Joy of Cats, (John Wiley and Sons, New Work 1970).
