1.Luchko Yuri Fedorovich:

 

Title of Ph.D. thesis: Operational Relations

For General H-Transforms.Date of defence: January 1993.

Place: Belarusian State University, Minsk.

 

2. Staroseletz Natalya Petrovna:

 

Title of Master thesis: Integral Transforms of the Lebedev-Skalskaya Type.

Date of defence: June 1992. Place: Belarusian State University, Minsk.

 

3.Vasilev Yuri Valerevich:

Title of Master thesis: Index Transforms Associated with Whittaker Functions.

Date of defence: June 1992. Place: Belarusian State University, Minsk.

 

4. Yarotzkaya Lyudmila Dmitrievna:

 

Title of Master thesis:Index Transforms Associated with Bessel

and Meijer G-functions. Date of defence: June 1995.Place: Belarusian

State University, Minsk.

 

Title of Ph.D. thesis: Integral Index Transforms with Bessel Type

Functions and Meijer G-Functions in the Kernels. Date of defence: March 2003.

Place: Belarusian State University, Minsk.

 

5. Aldina Isabel de Azevedo Correia:

Title of Master thesis: An Application of the Laplace Transform Method to the one

Class of Convolution Operators. Date of defence: May 2004.Place: University of Porto, Portugal.

 

6. Salome da Silva Vieira:

Title of Master thesis: Certain Classes of Integrals with Hypergeometric Functions.

Date of defence: May 2005.Place: University of Porto, Portugal.

 

7. Sadegh Nazardonyavi:

 

Title of Ph.D. Thesis: A Class of Equivalent Problems Related to the Riemann Hypothesis.

Date of defence: June 2013. Place: University of Porto, Portugal.

 

 

8. Helder Lima:

Title of Master Thesis: Arithmetic transforms related to the Riemann zeta-function and formulas of the Muntz and Poisson type.

Date of defence: November 2016. Place: University of Porto, Portugal.

 

9. Pedro Manuel Macedo Ribeiro:

Title of Master Thesis: Summation and Transformation Formulas Related With Special Functions.

Date of defence: December 4, 2020. Place: University of Porto, Portugal.

 

10. Ruben Azevedo de Sousa:

Title of Ph.D. Thesis: Convolution-like structures, differential operators and diffusion processes.

Date of defence: April 15, 2021. Place: University of Porto, Portugal.