Faculty of Natural and Agricultural Sciences
Department of Mathematics and Applied Mathematics
Anguelov, R
MSc(Sofia) PhD(Unisa) - Associate Professor
NRF Rating: C1
Contact Details
Research Interests
Research Output
Contact Details:
Telephone number: 012 420 2874
Fax number: 012 420 3893
E-mail address: roumen.anguelov@up.ac.za
Research Interests:
Partial differential equations, their numerical analysis and mathematical modelling
Research Output:
Research articles in refereed specialist journals:
Anguelov R, Fabris-Rotelli IN: 2010. LULU Operators and Discrete Pulse Transform for Multidimensional Arrays. IEEE Transactions on Image Processing, 19 (11) / Nov, pp 3012-3023, Full Text
Anguelov R, Popova E: 2010. Topological structure preserving numerical simulations of dynamical models. Journal of Computational and Applied Mathematics, (235), pp 358-365, Full Text
Anguelov R, Lubuma JM-S, Minani F: 2010. Total variation diminishing nonstandard finite difference schemes for conservation laws. Mathematical and Computer Modelling, 51, pp 160-166, Full Text
Papers in refereed, published conference proceedings:
Anguelov R, Brettschneider H, Bastos AD: 2010. A case of multi-vector and multi-host epidemiology model: Bartonella infection. In Proceedings of the 2nd International Conference on Application of Mathematics in Technical and Natural Sciences (AMiTaNS’10), American Institute of Physics (AIP), pp 175-187.
Anguelov R: 2010. Structurally stable numerical schemes for applied dynamical models. In Proceedings of the 7th International Conference on Large Scale Scientific Computing (LSSC) 2009, Springer-Verlag, Berlin, Heidelberg, pp 554-562.
Anguelov R, Markov S, Minani F: 2010. Hausdorff continuous viscosity solutions of Hamilton-Jacobi equations. In Proceedings of the 7th International Conference on Large Scale Scientific Computing (LSSC) 2009, Springer-Verlag, Berlin, Heidelberg, pp 231-238.
Research and technical/policy output for clients:
Anguelov R, Fabris-Rotelli I: Technical Report: 2010. Properties of the Discrete Pulse Transform for Multi-Dimensional Arrays. For: Department of Mathematics and Applied Mathematics, UP.
|