Qualifications: PhD in Mathematics, Harmonic Analysis and Applications, Research Master in Mathematics, Harmonic Analysis and Applications, Fundamental Licence of Science in Mathematics
Iness Jebabli is an assistant professor at the Mediterranean School of Business (MSB). She earned her Ph.D. in Mathematics, specializing in Harmonic Analysis, from the University of Tunis El Manar, where she also obtained her Licence and Master’s degrees. Additionally, she completed a one-year agrégation training in mathematics at IPEST. Her research interests include integral transforms, fractional powers of Bessel operators, and transmutation theory.
Dr. Jebabli has taught a diverse range of courses, including Mathematical Analysis, Linear Algebra, Descriptive Statistics, and Graph Theory, for both undergraduate and engineering classes at the Higher Institute of Computer Science of Tunis (ISI Ariana) and other respected institutions. She actively contributes to the academic community through her involvement in the Tunisian Women Mathematicians' Association (TWMA).
Applications of integral transforms composition method to index shift transmutations (Poster presentation), CSMT
https://fr.readkong.com/page/programme-scientifique-societe-mathematique-de-tunisie-4095854
Applications of Integral Transforms Composition Method to the Transmutation Theory? International Conference on Operator Theory (ICOT)
Transmutation operators and generalizations of Hilbert operators, CSMT
Integral Transforms Composition Method and Applications, JASMT
Applications of the integral transforms composition method to wave-type singular differential equations and index shift transmutations
http://ejde.math.txstate.edu or http://ejde.math.unt.edu
Application of Integral Transforms Composition Method (ITCM) to obtaining transmutations via integral transforms with Bessel functions in kernels
http://semr.math.nsc.ru
On Applications of Integral Transforms Composition Method
Applications of the integral transforms composition method to wave-type singular differential equations and index shift transmutations
http://ejde.math.txstate.edu or http://ejde.math.unt.edu
The Integral Transforms Composition Method for generalized index shifted transmutations
https://link.springer.com/article/10.1134/S1995080224603631
