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Šime Ungar

 

Znanstveni radovi


  1. S. Mardešić, Š. Ungar. The relative Hurewicz theorem in shape theory, Glasnik Matematički, 9(29)(1974), 317–327.
  2. Š. Ungar. The Freudenthal suspension theorem in shape theory, Bull. Acad. Polon. Sci. Sér. Sci. Math. Astr. Phys., 24(1976), 275–280.
  3. Š. Ungar, n-Connectedness of inverse systems and applications to shape theory, Glasnik Matematički, 13(33)(1978), 371–396.
  4. Š. Ungar. Van Kampen theorem for fundamental pro-groups, Bull. Acad. Polon. Sci. Sér. Sci. Math. Astr. Phys., 27(1979), 171–181.
  5. Š. Ungar. On local homotopy and homology pro-groups, Glasnik Matematički, 14(34)(1979), 151–158.
  6. Š. Ungar. Shape bundles, Topology and Appl., 12(1981), 89–99.
  7. Š. Ungar. A remark on shape paths and homotopy pro-groups, General Topology and its relations to Modern Analysis and Algebra V, Proc. Fifth Prague Topol. Symp. 1981, J. Novak(ed.), Heldermann Verlag, Berlin, 1982, pp. 642–647.
  8. Š. Ungar. A remark on the composition of cell-like maps, Glasnik Matematički, 22(42)(1987), 459–461.
  9. Š. Ungar. On a homotopy lifting property for inverse sequences, Berichte der Mathematisch-Statistischen Section in der Forschungsgesellschaft Joanneum, Bericht Nr. 282(1987), 1–11.
  10. R. Scitovski, Š. Ungar, D. Jukić, M. Crnjac. Moving total least squares for parameter identification in mathematical model, Operations Research Proceedings 1995 (Symposium on Operations Research, Passau, 13.–15. 9. 1995), Springer-Verlag, 1996, pp. 196–201.
  11. R. Scitovski, Š. Ungar, D. Jukić. Approximating surfaces by moving total least squares method, Applied Mathematics and Computation, 93(1998), 219–232.
  12. I. Herburt, Š. Ungar. Rigid sets of dimension n-1 in Rn, Geometriae Dedicata, 76(1999), 331–339.
  13. D. Jukić, R. Scitovski, Š. Ungar. The best total least squares line in R3, Proceedings of the 7th International Conference on Operational Research, (1998), (I. Aganović et all., Eds.), HDOI, Osijek, 1999, 311–316.
  14. Š. Ungar. Unutarnja geometrija i kruti skupovi, Zbornik predavanja, Podružnica Hrvatskog matematičkog društva u Splitu, Split, 1999, str. 50–55.
  15. Š. Ungar. The Koch Curve: A Geometric Proof, American Mathemathical Monthly, 114(2007), No. 1, 60–65.
  16. Š. Ungar. Partitions of sets and the Riemann integral, Mathematical Communications, 11(2006), 55–61.
  17. J. Pečarić, Š. Ungar. On an inequality of Ostrowski type, Journal of Inequalities in Pure and Applied Mathematics, Vol. 7(4), Article 151, 2006, 1–5.
  18. J. Pečarić, Š. Ungar. On an inequality of Grüss type, Mathematical Communications, 11(2006), No. 2, 137–141.
  19. M. Matić, Š. Ungar. More on the two-point Ostrowski inequality, Journal of Mathematical Inequalities, 3(2009), No. 3, 417–426.
  20. J. Pečarić, Š. Ungar. On the two-point Ostrowski inequality, Mathematical Inequalities & Applications, 13(2010), No. 2, 339–347.

 

Sveučilišni udžbenici


  1. Š. Ungar. Matematička analiza 3, PMF-Matematički odjel, Zagreb, 1992. i 1994. (2. dopunjeno izdanje), str. iv+189.
  2. Š. Ungar. Ne baš tako kratak uvod u LATEX, s naglaskom na LATEX2ε, Sveučilište J. J. Strossmayera u Osijeku, Osijek, 2002, str. xii+107.
  3. Š. Ungar. Matematička analiza u Rn, Sveučilište u Zagrebu, Golden marketing-Tehnička knjiga, Zagreb, 2005, str. xii+314.

 

Prijevodi


  1. P. J. Davis, R. Hersh, E. A. Marchisotto. Doživljaj matematike, Golden marketing-Tehnička knjiga, Zagreb, 2004, str. xix+456. (prijevod Z. i Š. Ungar), (original: The Mathematical Experience. With an introduction by Gian-Carlo Rota. Study Edition, Birkhäuser, Boston 2002.)

 

Ostale publikacije


  1. Š. Ungar: E. P. Klement, Elementare Topologie. Mit Anwendungen, Rudolf Trauner, Linz, 1982. (book review), Mathematical Reviews 85e:54001.
  2. Š. Ungar: H. Horst, Einführung in die Topologie, Helderman Verlag, Berlin, 1986 (book review), Mathematical Reviews 87k:54001.
  3. Š. Ungar: D. Adnađević, Topologija, (prikaz knjige) Glasnik Matematički 17(37) (1982), No. 1, 223–224.
  4. Š. Ungar. Indeks krivulje i neke primjene u topologiji i geometriji, Matematika, 1(1985), 21–34.
  5. Š. Ungar. Slutnja koja je postala teorem, Matematičko-fizički list, 61(2010), br. 1, 20–23.