Hassen Aydi
University of Sousse
590 Papers
2.2K Citations
Hassen Aydi is an academic researcher from University of Sousse. The author has contributed to research in topics: Metric space & Fixed point. The author has an hindex of 41, co-authored 297 publications. Previous affiliations of Hassen Aydi include China Medical University (PRC) & University of Paris.
Chat about Author
Papers
Results on fixed circles and discs for L ( ω , C ) $L_{ (\omega,C ) }$ -contractions and related applications
TL;DR: In this paper, the authors studied the behavior of O(n, c) -contraction mappings and established some results on common fixed circles and discs, and explained the significance of their main theorems through examples and applications.
Common fixed points for generalized (v,o)-weak contractions in ordered cone metric spaces
Hemant Kumar Nashine,Hassen Aydi +1 more
TL;DR: In this article, the authors established coincidence point and common fixed point results for four maps satisfying generalized (v,o)-weak contractions in partially ordered cone metric spaces, and some illustrative examples are presented.
3
Certain dynamic iterative scheme families and multi-valued fixed point results
TL;DR: In this paper, the authors present a systematic investigation of an extension of the developments concerning $ F $-contraction mappings which were proposed in 2012 by Wardowski and prove multi-valued fixed point results in controlled-metric spaces.
3
A relation theoretic m-metric fixed point algorithm and related applications
TL;DR: In this article , the concept of generalized rational type $ F $ -contractions on relation theoretic m-metric spaces (denoted as $ F_{R}^{m} $-contractions, where $ R $ is a binary relation) and some related fixed point theorems are provided.
3
Common fixed-point results of fuzzy mappings and applications on stochastic Volterra integral equations
TL;DR: In this article , the authors established and proved common fuzzy fixed-point theorems for fuzzy set-valued mappings involving Θ-contractions in a complete metric space.