On upper and lower ω-irresolute multifunctions

Downloads

DOI:

https://doi.org/10.4067/S0719-06462014000300001

Abstract

In this paper we define upper (lower) ω-irresolute multifunction and obtain some characterizations and some basic properties of such a multifunction.

Keywords

ω-open set , ω-continuous multifunctions , ω-irresolute multifunctions
  • C. Carpintero Department of Mathematics, Universidad De Oriente, Núcleo De Sucre Cumana, Venezuela. Facultad de Ciencias Básicas, Universidad del Atlantico, Colombia.
  • E. Rosas Department of Mathematics, Universidad De Oriente, Núcleo De Sucre Cumana, Venezuela – Facultad de Ciencias Básicas, Universidad del Atlantico, Colombia.
  • N. Rajesh Department of Mathematics, Rajah Serfoji Govt. College, Thanjavur-613005, Tamilnadu, India.
  • S. Saranyasri Department of Mathematics, M. R. K. Institute of Technology, Kattumannarkoil, Cuddalore -608 301, Tamilnadu, India.
  • Pages: 01–10
  • Date Published: 2014-10-01
  • Vol. 16 No. 3 (2014): CUBO, A Mathematical Journal
[1] K. Al-Zoubi and B. Al-Nashef, The topology of ω-open subsets, Al-Manarah (9) (2003), 169- 179.
[2] A. Al-omari ans M. S. M. Noorani, Contra-ω-continuous and almost ω-continuous functions, Int. J. Math. Math. Sci. (9) (2007), 169-179.
[3] T. Banzaru, Multifunctions and M-product spaces, Bull. Stin. Tech. Inst. Politech. Timisoara, Ser. Mat. Fiz. Mer. Teor. Apl., 17(31)(1972), 17-23.
[4] C. Carpintero, N. Rajesh, E. Rosas and S. Saranyasri, Some properties of upper/lower ω- continuous multifunctions (submitted).
[5] C. Carpintero, N.Rajesh, E.Rosas and S. Saranyasri, On upper and lower faintly ω-continuous multifunctions (submitted).
[6] C. Carpintero, N. Rajesh, E. Rosas and S. Saranyasri, On Slightly omega-continuous multi- functions, to appear in Punjab University Journal of Mathematics (2014).
[7] C. Carpintero, N. Rajesh, E. Rosas and S. Saranyasri, Properties of Faintly ω-continuous functions, Boletín de Matemáticas, 20(2) (2014). 135-143.
[8] I. Kovacevic, Subsets and paracompactness, Univ. u. Novom Sadu, Zb. Rad. Prirod. Mat. Fac. Ser. Mat., 14(1984), 79-87.
[9] H. Z. Hdeib, ω-closed mappings, Revista Colombiana Mat., 16(1982), 65-78.
[10] T. Noiri, A. Al-omari and M. S. M. Noorani, Slightly ω-continuous functions, Fasc. Math., (41) (2009), 97-106.
[11] T. Noiri and V. Popa, Almost weakly continuous multifunctions, Demonstratio Math., 26 (1993), 363-380.
[12] T. Noiri and V. Popa, A unified theory of almost continuity for multifunctions, Sci. Stud. Res. Ser. Math. Inform., 20(1) (2010),185-214.
[13] T. Noiri and V. Popa, A unified theory of weak continuity for multifunctions, Stud. Cerc. St Ser. Mat. Univ. Bacau, 16 (2006),167-200.
[14] G. T. Whyburn, Retracting multifunctions, Proc. Nat. Acad. Sci., 59(1968), 343-348.
[15] I. Zorlutuna, ω-continuous multifunctions, Filomat, 27(1) (2013), 155-162.

Similar Articles

<< < 1 2 3 4 5 6 7 8 9 10 11 12 > >> 

You may also start an advanced similarity search for this article.

Downloads

Download data is not yet available.

Published

2014-10-01

How to Cite

[1]
C. Carpintero, E. Rosas, N. Rajesh, and . S. Saranyasri, “On upper and lower ω-irresolute multifunctions”, CUBO, vol. 16, no. 3, pp. 01–10, Oct. 2014.

Issue

Vol. 16 No. 3 (2014): CUBO, A Mathematical Journal

Section

Articles

Similar Articles

<< < 1 2 3 4 5 6 7 8 9 10 11 12 > >> 

You may also start an advanced similarity search for this article.