I am a mathematician teaching computer science students math. My research interests are connected to topology and its applications to computer science. Lately I have been working mostly in computational topology. Computational topoogy is an exciting growing field on the border between mathematics and computer science, the central topic of the European Science Foundation networking programme Algebraic and Computational Topology. I am also a member of the Institute for Mathematics, Physics and Mechanics of Slovenia.
Neža Mramor Kosta, Mehmetcik Pamuk, Hanife Varli, Perfect discrete Morse functions oin connected sums, arXiv:1501.06200
Henry King, Kevin Knudson, Neža Mramor, Birth and death in discrete Morse theory, arXiv:0808.0051
Borut Jurčič Zlobec, Neža Mramor Kosta, Geometric constructions on cycles in R'n, arXiv:1311.5656
AYALA, Rafael, VILCHES, Jose Antonio, JERŠE, Gregor, MRAMOR KOSTA, Neža. Discrete gradient fields on infinite complexes. Discrete and continuous dynamical systems
JERŠE, Gregor, MRAMOR KOSTA, Neža. Ascending and descending regions of a discrete Morse function. Computational geometry
MRAMOR KOSTA, Neža, TRENKLEROVÁ, Eva. Basic sets in the digital plane. Lecture notes in computer science, ISSN 0302-9743, 4910, 2008, str. 376-387.
JAWOROWSKI, Jan, MRAMOR KOSTA, Neža. The degree of maps of free G-manifolds. Journal of fixed point theory and its applications, ISSN 1661-7738, 2007, vol. 2, no. 2, str. 209-213.
KING, Henry C., KNUDSON, Kevin, MRAMOR KOSTA, Neža. Generating discrete Morse functions from point data. Experimental mathematics, ISSN 1058-6458, 2005, vol. 14, no. 4, str. 435-444.
JURČIČ-ZLOBEC, Borut, MRAMOR KOSTA, Neža. Geometric constructions on cycles. Rocky Mountain journal of mathematics.
CENCELJ, Matija, MRAMOR KOSTA, Neža, VAVPETIČ, Aleš. G-complexes with a compatible CW structure. Journal of mathematics of Kyoto University.