Japanese pages are here.
Hiroshi Fujita
Assistant Professor
Graduate School of Science and Engineering
Ehime University
E-mail:
Published Papers
- Hiroshi P. FUJITA,
Mansfield and Solovay type results on covering plane sets by lines,
Nagoya Mathematical Journal, vol.124 (1991), pages 145-155.
- H. Fujita and S. Taniyama,
On homogeneity of hyperspace of the Rationals,
Tsukuba Journal of Mathematics, vol.20-1 (1996), pages 213--218.
- H. Fujita,
A measure theoretic basis theorem for \(\Pi^1_2\),
Journal of Mathematical Society of Japan, vol.52-2 (2000), pages 335--341.
- Hiroshi Fujita and Dmitri B. Shakhmatov,
Topological groups with dense compactly generated subgroups,
Applied General Topology, vol.3-1 (2002), pages 85--89.
- Hiroshi Fujita and Dmitri B. Shakhmatov,
A characterization of compactly generated metric groups,
Proceedings of American Mathematical Society, vol. 131-3 (2002), pages 953--961.
- Hiroshi Fujita,
Remarks on two problems by M.Laczkovich on functions with Borel measurable differences,
Acta Mathematica Hungarica, vol. 117 (2007), pages 153--160.
- Hiroshi Fujita and Tamás Tátrai,
On difference property of Borel measurable functions,
Fundamenta Mathematicae, vol. 208 (2010), pages 57--73.
Preprints
Abstract and link to the online resource
- [1] A measure theoretic basis theorem for \(\Pi^1_2\) [pdf]
- If \(0^\sharp\) exists, every \(\Pi^1_2\) set of positive Lebesgue measure has a member that is arithmetically definable from \(0^\sharp\). In this note we give a proof of this statement using unfolded covering game invented by Harrington and Kechris. Appears in Journal of the Mathematical Society of Japan.
- [2] A weak basis theorem for \(\Pi^1_2\) [pdf]
- If \(\aleph_1^L\) (the smallest ordinal which is uncountable in the constructible universe) is recursive in \(a\subset\omega\), then every \(\Pi^1_2\) set of positive Lebesgue measure has a member that is hyperarithmetically definable from \(a\). This result gives an alternative proof of the main result of [1]. It also suggests that the sort of basis result for \(\Pi^1_2\) holds in univereses that are smaller than \(0^\sharp\).
- [3] Lebesgue's basis theorem [pdf]
- As shown by H. Tanaka, every \(\Pi^0_1\) set of positive Lebesgue measure contains an arithmetical real but it may fail to contain a recursive real. Here we prove, if A is a \(\Pi^0_1\) set of reals and if the Lebesgue measure of A is a positive recursive real, then A contains a recursive real. The proof is based on H.Lebesgue's effective existence proof of normal numbers.
- [4] Determinacy of covering games is equivalent to Lebesgue measurability [pdf]
- Covering games has been invented by Leo Harrington in order to give a simplified proof of the Mycielski--Swierczkovski Theorem (that Axiom of determinacy implies Lebesgue measurability of every sets of reals). In fact the determinacy of covering games is a consequence of Lebesgue measurability, under ZF+DC.
- [5] Remarks on two problems of Laczkovich on functions with Borel measurable differences [pdf]
- (Published: Acta Mathematica Hungarica, vol. 117 (2007), pages 153--160.)
This note gives a partial answer to a problem raised by Miklós Laczkovich. Main result is:
if \(f:{\mathbb R}\to{\mathbb R}\) is Borel and the difference function \(\triangle_hf(x)\) is of Baire class \(\alpha\) for every \(h\), then \(f\) itself is of Baire class \(1+\alpha\).
- [6] On almost translation invariant sets of reals [pdf]
- Some notes about sets of reals which are uncountable, co-uncountable and traslation invariant modulo countable sets. No Borel set has such property. It is independent of ZFC that such a \(\mathbf\Delta^1_2\) set exists.
- [7] A consistency result about functions with Borel measurable differences
- If the existence of a measurable cardinal is consistent, so is the following statement: if \(f:{\mathbb R}\to{\mathbb R}\) is bounded and the difference function \(\triangle_hf(x)\) is Borel for every \(h\), then \(f\) itself is Borel. This means that in the construction of counter-example against Laczkovich's Problem 2 due to R.Filipów and I.Recław, the use of the Continuum Hypothesis is unavoidable.
(Added: Aug 22, 2008) This paper has been obsoleted by the next one.
- [8] On difference property of Borel measurable functions [pdf]
- (A joint paper with Tamás Mátrai. Published: Fundamenta Mathematicae 208(1), pp.57-73.)
If an atomlessly measurable cardinal exists, then the class of Lebesgue measurable functions, the class of Borel functions, and the Baire classes of all order have the difference property. This gives a consistent positive answer to Laczkovich's Problem 2. We also give a complete positive answer to Laczkovich's Problem 3 concerning Borel functions with Baire-α differences.
Seminar handouts etc.
- [9] Coanalytic sets with Borel sections [pdf]
- Seminar talk at 8th Kansai Set Theory Seminar (March 6 2009, Kobe University)
- [10] On effectivization of Freiling's Axioms of Symmetry [pdf]
- Proposes an alternative formulation of effective version of Axioms of Symmetry. Our version circumvents certain difficulties that Weitkamp's formulation possesses.
- [11] On points of differentiability of discontinuous functions [pdf]
- If \(A\) and \(B\) are disjoint \(F_\sigma\) sets of real numbers, then there exists a real function which is discontinuous at each point of \(A\), continous anywhere else, and differentiable at each point of \(B\). If a real function is discontinous on a dense set, then its set of points of differentiability is meager. Based on a seminar talk given at Kobe University, Nov.18, 2010. Submitted to a forthcoming volume of RIMS Kokyuroku series.
- [12] Notes on an old theorem of Erdös concerning CH [pdf]
- An old theorem of Erdös says that the Continuum Hypothesis holds if and only if there exists an uncountable family \(\mathcal{F}\) of entire functions on the complex plane whose section \(\{\,f(z)\,:\,f\in\mathcal{F}\,\}\) is countable for every \(z\). We show in this note that there exists such \(\mathcal{F}\) among \(\Pi^1_1\) sets if and only if every set of integers is constructible.
Some more?
There are several notes written in Japanese. Come here if you'd like to read Japanese text.