Magdalena Nowak

Publikacje:

1. K. Leśniak, M. Nowak, Split square and split carpet as examples of non-metrizable IFS attractors, Banach Center Publ., 125 (2023), 71-80.
2. M. Nowak, Peano continua with self regenerating fractals, Topol. Appl., 300 (2021) 107754.
3. T. Banakh, M. Nowak, F. Strobin, Embedding fractals in Banach, Hilbert or Euclidean spaces, J. Fractal Geom. 7 (2020), 351-386.
4. M. Nowak, W. Kaca, G. Czerwonka, Comparison of Genomes of Pseudomonas Aeruginosa Strains by using Chaos Game Representation, Int J Biomed Data Min (2018) 7:1.
5. M. Fernádez-Martínez, M. Nowak, M.A. Sánchez-Granero, Counterexamples in theory of fractal dimension for fractal structures, Chaos, Solitons & Fractals, 89 (2016) 210-223.
6. M. Fernádez-Martínez, M. Nowak, Counterexamples for IFS-attractors, Chaos, Solitons & Fractals, 89 (2016) 316-321.
7. T. Banakh, W. Kubiś, N. Novosad, M. Nowak, F. Strobin. Contractive function systems, their attractors and metrization, Topol. Methods Nonlinear Anal. 46 (2015) 1029-1066.
8. T. Banakh, M. Nowak, F. Strobin, Detecting topological and Banach fractals among zero-dimensional spaces, Topology and its Applications 196 A (2015) 22-30.
9. M. Nowak, T. Szarek, The Shark Teeth is a Topological IFS-Attractor, Siberian Mathematical Journal 2014. 55(2) 296-300(Translated from Sibirskii Matematicheskii Zhurnal, Vol. 55, No. 2, pp. 364–369)
10. M. Nowak, PHD Thesis: Topological properties of attractors of iterated function systems, Jagiellonian University 2014.
11. M. Nowak, Topological classification of scattered IFS-attractors, Topology and its Applications 160 (2013) 1889–1901
12. T. Banakh, M. Nowak, A 1-dimensional Peano continuum which is not an IFS attractor, Proc. Amer. Math. Soc. 141 (2013), 931–935.
13. M. Kulczycki, M. Nowak, A class of continua that are not attractors of any IFS, Centr. Eur. J. Math. 2012, 10(6), 2073-2076