Gradimir Milovanović Explained

Gradimir V. Milovanović
Birth Date:2 January 1948
Birth Place:Zorunovac, Serbia
Fields:Mathematics
Workplaces:University of Niš
Megatrend University
Mathematical Insfitute of SASA
Alma Mater:University of Niš
(B.Sc., M.Sc., D.Sc.)
Doctoral Advisor:Dragoslav Mitrinović
Known For:Gautschi–Milovanovic method

Gradimir V. Milovanović (born January 2, 1948) is a Serbian mathematician known for his contributions to approximation theory and numerical analysis. He has published over 280 papers and authored five monographs and more than twenty books in his area.[1] He is a full member of the Serbian Academy of Sciences and Arts and of other Serbian and international scientific societies.

Early life and education

Born in Zorunovac, in the Knjaževac municipality of mideastern Serbia, he studied at University of Niš, obtaining a B.Sc. in electrical engineering and computer science (1971), an M.Sc. in mathematics (1974) and a D.Sc. (1976). His thesis was titled On Some Functional Inequalities advised by Dragoslav Mitrinović.

Career

He served as a member of the faculty of electronic engineering and the department of mathematics at the University of Niš, and was promoted to professor in 1986 before serving as the acting Dean of the Faculty of Electronic Engineering from 2002 to 2004. He served as rector of the University of Niš from 2004 to 2006, as well as dean of the Faculty of Computer Sciences at the Megatrend University from 2008 to 2011 until he joined the Mathematical Institute[2] of the Serbian Academy of Sciences and Arts in Belgrade (2011).

He has been a member of the board of the Mathematical Society of Serbia (2003–2006), president of the Scientific Council of the Mathematical Institute at Serbian Academy of Sciences and Arts in Belgrade (1997–2010), vice president of the Scientific Society of Serbia since 2002, president of the National Council for Scientific and Technological Development (2006–2010), and president of the Scientific Committee for Mathematics, Computer Sciences and Mechanics.

Notes and References

  1. http://www.mi.sanu.ac.rs/~gvm/ Homepage at Mathematical Institute
  2. http://www.mi.sanu.ac.rs/ Mathematical Institute