Upper and Lower Continuous Multifunctions Defined between an Ideal Topological Space and a Bitopological Space

Authors

  • Jeeranunt Khampakdee Mathematics and Applied Mathematics Research Unit, Department of Mathematics, Faculty of Science, Mahasarakham University, Maha Sarakham, 44150, Thailand
  • Areeyuth Sama-Ae Department of Mathematics and Computer Science, Faculty of Science and Technology, Prince of Songkla University, Pattani Campus, Pattani, 94000, Thailand
  • Chawalit Boonpok Mathematics and Applied Mathematics Research Unit, Department of Mathematics, Faculty of Science, Mahasarakham University, Maha Sarakham, 44150, Thailand

DOI:

https://doi.org/10.29020/nybg.ejpam.v18i3.6565

Keywords:

upper $\tau^\star(\sigma_1,\sigma_2)$-continuous multifunction;, lower $\tau^\star(\sigma_1,\sigma_2)$-continuous multifunction

Abstract

This paper presents new concepts of continuous multifunctions defined from an ideal topological
space into a bitopological space, called upper $\tau^\star(\sigma_1,\sigma_2)$-continuous multifunctions and
lower $\tau^\star(\sigma_1,\sigma_2)$-continuous multifunctions. Furthermore, several characterizations and some
properties concerning upper $\tau^\star(\sigma_1,\sigma_2)$-continuous multifunctions and lower
$\tau^\star(\sigma_1,\sigma_2)$-continuous multifunctions are investigated.

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Published

2025-08-01

Issue

Vol. 18 No. 3: (July 2025)

Section

Topology

License

Copyright (c) 2025 Jeeranunt Khampakdee, Areeyuth Sama-Ae, Chawalit Boonpok

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How to Cite

Upper and Lower Continuous Multifunctions Defined between an Ideal Topological Space and a Bitopological Space. (2025). European Journal of Pure and Applied Mathematics, 18(3), 6565. https://doi.org/10.29020/nybg.ejpam.v18i3.6565