Publications of Rafał Filipów

Published

  1. On the difference property of Borel measurable and (s)-measurable functions, Acta Math. Hungar. 96 (2002), no. 1-2, 21-25 (with I. Recław) [pdf, doi]
  2. On the difference property of the family of functions with the Baire property, Acta Math. Hungar. 100 (2003), no. 1-2, 97-104 [pdf, doi]
  3. On the difference property of families of measurable functions, Colloq. Math. 97 (2003), no. 2, 169-180 [pdf, doi]
  4. Algebraic sums of sets in Marczewski-Burstin algebras, Real Anal. Exchange 31 (2005/2006), no. 1, 133-142 (with F. Dorais) [pdf, doi]
  5. Ideal convergence of bounded sequences, J. Symbolic Logic 72 (2007), no. 2, 501--512 (with N. Mrożek, I. Recław and P. Szuca) [pdf, doi]
  6. Rearrangement of conditionally convergent series on a small set, J. Math. Anal. Appl. 362 (2010), no. 1, 64-71 (with P. Szuca) [pdf, doi]
  7. Density versions of Schur's theorem for ideals generated by submeasures, J. Combin. Theory Ser. A 117 (2010), no. 7, 943-956 (with P. Szuca) [pdf, doi]
  8. On some questions of Drewnowski and Łuczak concerning submeasures on N, J. Math. Anal. Appl. 371 (2010), no. 2, 655-660 (with P. Szuca) [pdf, doi]
  9. There are measurable Hamel functions, Real Anal. Exchange 36 (2010/2011), no. 1, 223-230 (with A. Nowik and P. Szuca) [pdf, doi]
  10. Ideal version of Ramsey's theorem, Czechoslovak Math. J., 61 (2011), no. 2, 289-308 (with N. Mrożek, I. Recław and P. Szuca) [pdf, doi]
  11. Uniform density u and Iu-covergence on a big set, Math. Commun. 16 (2011), no. 1, 125-130 (with P. Barbarski, N. Mrożek and P. Szuca) [pdf, doi]

Submitted

  1. Three kinds of convergence and the associated I-Baire classes, 23 June 2011 (with P. Szuca) [pdf]
  2. On some properties of Hamel bases and their applications to Marczewski measurable functions, 19 September 2011 (with F. Dorais and T. Natkaniec) [pdf]
  3. I-selection principles for sequences of functions, 6 January 2012 (with N. Mrożek, I. Recław and P. Szuca) [pdf]

Others

  1. Własność różnicy w sensie de Bruijna dla rodzin funkcji mierzalnych (The difference property in the sense of de Bruijn for families of measurable functions), PhD Thesis, 2004, Institute of Mathematics of the Polish Academy of Sciences, Warsaw, Poland [Summary] [pdf]