Annie Cuyt

Annie A. M. Cuyt (born 1956) is a Belgian computational mathematician known for her work on continued fractions, numerical analysis, Padé approximants, and related topics.[1] She is a professor at the University of Antwerp, and a member of the Royal Flemish Academy of Belgium for Science and the Arts.

Education and career

Cuyt was born on 27 May 1956 in Elizabethstad (now Lubumbashi), in the Belgian Congo.[1][2] She earned her Ph.D. at the University of Antwerp in 1982. Her dissertation, Padé approximants for operators: theory and applications, was promoted by Luc Wuytack.[3] She was a postdoctoral researcher with support from the Alexander von Humboldt Foundation, and completed a habilitation in 1986.[2]

She is a professor in the Department of Mathematics and Computer Science at the University of Antwerp,[4] where she leads the computational mathematics group.[5]

Books

Cuyt is the author or coauthor of:

  • Padé Approximants for Operators: Theory and Applications (Lecture Notes in Mathematics 1065, Springer, 1984)[6]
  • Nonlinear Methods in Numerical Analysis (with Luc Wuytack, North-Holland Mathematics Studies 136, North-Holland, 1987)[7]
  • Handbook of Continued Fractions for Special Functions (with Vigdis Brevik Petersen, Brigitte Verdonk, Haakon Waadeland, and William B. Jones, Springer, 2008)[8]

Recognition

Cuyt was elected to the Royal Flemish Academy of Belgium for Science and the Arts in 2013.[4] The 4th Dolomites Workshop on Constructive Approximation and Applications, in 2016, and a special issue of the Dolomites Research Notes on Approximation, published in 2017, were dedicated to Cuyt in honor of her 60th birthday.[1]

References

  1. ^ a b c Weideman, J. A. C. (2017), "Annie@60: A Life in Approximation" (PDF), Dolomites Research Notes on Approximation, 10, Padova University Press: 1–5
  2. ^ a b "Annie A. M. Cuyt", Digital Library of Mathematical Functions, National Institute of Science and Technology, retrieved 2021-03-17
  3. ^ Annie Cuyt at the Mathematics Genealogy Project
  4. ^ a b Members, Royal Flemish Academy of Belgium for Science and the Arts, retrieved 2021-03-17
  5. ^ Computational Mathematics, University of Antwerp, retrieved 2021-03-17
  6. ^ Reviews of Padé Approximants for Operators: Claude Brezinski, MR0750977; M. G. de Bruin, Zbl 0538.41024; P. R. Graves-Morris, SIAM Review, doi:10.1137/1027130, ProQuest 926161357, JSTOR 2031602
  7. ^ Reviews of Nonlinear Methods in Numerical Analysis: Paulo Azevedo, Appl. Ocean Res., doi:10.1016/S0141-1187(05)80068-9; Detlef Elstner, Astron. Nachr., Bibcode:1990AN....311..308C; R. Glowinski, Comput. Methods Appl. Mech. Eng., doi:10.1016/0045-7825(88)90008-4, Bibcode:1988CMAME..66..369G; Pierre Hillion, MR0882724; Lisa Jacobsen, Math. Comp., doi:10.2307/2008603, JSTOR 2008603; P. Wynn, Zbl 0609.65001
  8. ^ Reviews of Handbook of Continued Fractions for Special Functions: Metin Demiralp, Zbl 1150.30003; Mehdi Hassani, MR2410517;