Miroslav Zelený

Research papers

1. M. Zelený, The Banach-Mazur game and $\sigma$-porosity, Fund. Math. 150 (1996), 197-210.

2. M. Zelený, Sets of extended uniqueness and $\sigma$-porosity, Comment. Math. Univ. Carolinae 38 (1997), 337-341.

3. M. Zelený, Calibrated thin coanalytic $\sigma$-ideals are G-$\delta$, Proc. Amer. Math. Soc. 125 (1997), 3027-3032.

4. M. Zelený, On singular boundary points of complex functions, Mathematika 45 (1998), 119-133.

5. P. Holický, S.P. Ponomarev, L. Zajíček, M. Zelený, Structure of the set of continuous functions with Luzin's property (N),
    Real Anal. Exchange 24 (1998-99), 635-656.

6. M. Zelený, The Dynkin system generated by balls in $\mathbb R^d$ contains all Borel sets, Proc. Amer. Math. Soc. 128 (2000), 433-437.

7. P. Holický, M. Zelený, A converse of the Arsenin-Kunugui theorem on Borel sets with $\sigma$-compact sections, Fund. Math. 165 (2000), 191-202.

8. M. Zelený, A remark on the Debs - Saint-Raymond theorem, Proc. Amer. Math. Soc. 129 (2001), 3711-3714.

9. M. Zelený, An example of a $\mathcal C^{1,1}$-function, which is not a d.c. function, Comment. Math. Univ. Carolinae 43 (2002), 149-154.

10. E. Matoušková, M. Zelený, A note on intersections of non-Haar null sets, Colloq. Math. 96 (2003), 1-4.

11. L. Zajíček, M. Zelený, On the complexity of some $\sigma$-ideals of $\sigma$-P-porous sets, Comment. Math. Univ. Carolinae 44 (2003), 531-554.

12. M. Zelený, J. Pelant, The structure of the $\sigma$-ideal of $\sigma$-porous sets, Comment. Math. Univ. Carolinae 45 (2004), 37-72.

13. P. Holický, L. Zajíček, M. Zelený, A remark on a theorem of Solecki, Comment. Math. Univ. Carolin. 46 (2005), 43-54.

14. M. Zelený, L. Zajíček, Inscribing compact non-$\sigma$-porous sets into analytic non-$\sigma$-porous sets, Fund. Math. 185 (2005), 19-39.

15. E. Matheron, M. Zelený, Rudin-like sets and hereditary families of compact sets, Fund. Math. 185 (2005), 97-116.

16. L. Zajíček, M. Zelený, Inscribing closed non-$\sigma$-lower porous sets into Suslin non-$\sigma$-lower porous sets, Abstr. Appl. Anal. 2005, 221-228.

17. M. Zelený, An absolutely continuous function with non-$\sigma$-porous graph, Real. Anal. Exchange 30 (2004-05), 547-564.

18. M. Zelený, Descriptive properties of $\sigma$-porous sets, Real Anal. Exchange 30 (2004-05), 657-674.

19. E. Matheron, S. Solecki, M. Zelený, Trichotomies for ideals of compact sets, Jour. Symb. Logic 71 (2006), 586-598.

20. J. Malý, M. Zelený, A note on Buczolich's solution of the Weil gradient problem: a construction based on an infinite game,
      Acta Math. Hungar. 113 (2006), 145-158.

21. E. Matheron, M. Zelený, Descriptive set theory of families of small sets, Bull. Symb. Logic 13 (2007), 482-537. Updates

22. M. Zelený, The Denjoy-Clarkson property with respect to Hausdorff measures for the gradient mapping of functions of several variables,
      Ann. Inst. Fourier. 58 (2008), 405-428.

23. V. Vlasák, M. Zelený, Compact sets of continuity for Borel functions, Topol. Appl. 155 (2008), 1672-1676.

24. T. Mátrai, M. Zelený, On monotone presentations of Borel sets, Real Anal. Exchange 34 (2009), 311-318.

25. J. Spurný, M. Zelený, Additive families of low Borel classes and Borel measurable selectors, Canad. Math. Bull. 54 (2011), 180-192.

26. D. Lecomte, M. Zelený, Baire-class $\xi$ colorings: the first three levels, submitted. Arxive.

27. R. Levínský, A. Neyman, M. Zelený, Should I remeber more than you?, submitted.

28. R. van den Brink, R. Levínský, M. Zelený, The balanced solution for cooperative transferable utility games, submitted.

29. M. Doležal, M. Zelený, Infinite games and $\sigma$-porosity, submitted.