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Last Updated: November, 2004

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\begin{thebibliography}{99}

\bibitem{BT}
Tomek Bartoszy\'{n}ski, Boaz Tsaban,
{\it Hereditary Topological Diagonalizations and
the Menger-Hurewicz Conjectures}, Proc. Amer. Math. Soc., to appear.

\bibitem{[Be1]} {A. S. Besicovitch,}
{\em On density of perfect sets},
{J. London Math. Soc.} {\bf 31} (1956), 48--53.

\bibitem{BBT} A.~M. Bruckner, J.~B. Bruckner and B.~S. Thomson,
{\it Real Analysis}, Prentice-Hall (1996).

\bibitem{BS1} A. M. Bruckner and J. Smital, \textit{A
characterization of }$\omega $-\textit{limit sets of maps of the interval
with zero topological entropy}, Ergodic Theory and Dynam. Systems, \textbf{13}
(1993), 7--19.

\bibitem{B2}
J. Bors\'{\i}k, {\it Algebraic structures generated by real
quasicontinuous functions}, Tatra Mt. Math. Publ., {\bf 8}
(1996), 175--184.

\bibitem{[BP]} {Z. Buczolich and W. F. Pfeffer,}
{\em On absolute continuity},
{J. Math. Anal. Appl.} {\bf 222} (1998), no. 1, 64--78.

\bibitem{Csa}
\'A. Cs\'asz\'ar and M. Laczkovich, {\em Discrete and equal
convergence}, Studia Sci. Math. Hungar., {\bf 10} (1975), 463--472.

\bibitem{[D3]} { A. A. Danielyan,}
{\em Functions of the first Baire class, defined on compact sets},
{Reports of the Extended Sessions of the I. N. Vekua
Institute of Applied Mathematics (Tbilisi, 1985)}, {\bf 1} (1985), no. 2,
64--67, 1985 (Russian).

\bibitem{Faure} C.-A.~Faure, \textit{The Lebesgue Differentiation Theorem via the Rising Sun
Lemma}, Real Anal. Exchange, \textbf{29} (2004-05), this issue.

\bibitem{GM}
Fred Galvin, Arnold W. Miller, {\it $\gamma$-Sets and Other Singular Sets of
Real Numbers}, Topology Appl., {\bf 17} (1984), 145--155.

\bibitem{gr} S. Graf, {\sl A selection theorem for Boolean
correspondences}, J. Reine Angew. Math., {\bf 295} (1977), 169--186.

\bibitem{HC}
R. C. Haworth, R. A. McCoy, {\it Baire spaces},
Dissertationes Math., {\bf 141} (1977), 1--77.

\bibitem{kunen}
Kenneth Kunen, {\it Ultrafilters and Independent Sets}, Trans.
Amer. Math. Soc., {\bf 172} (1972), 299--306.

\bibitem{set}
Kenneth Kunen, {\it Set Theory. An Introduction to Independence Proofs.}
Studies in Logic and the Foundations of Mathematics, {\bf 102} North-Holland
Publishing Co., Amsterdam-New York, 1980.

\bibitem{LP} M. Laczkovich and G. Petruska, {\it Remarks on a problem of A. M. Bruckner}, Acta Math. Acad. Sci. Hungar., {\bf 38} (1981), 205--214.

\bibitem{ma} D. Maharam, {\sl Category, Boolean algebras and
measures}, Lecture Notes in Math. {\bf 609} (1977), 124--135,
Springer-Verlag.

\bibitem{Na}
A. Neubrunnov\'{a}, {\it On certain generalizations of the notion of
continuity}, Mat. \v{C}asopis, {\bf 23}
(1973), 374--380.

\bibitem{O} R. J. O'Malley, {\it Approximately differentiable functions.
The $r$ topology}, Pacific J. Math., {\bf 72} (1977), 207--222.

\bibitem{WS1}
W. Sierpi\'{n}ski, {\it Sur l'ensemble des points de convergence d'une suite
de fonctions continues}, Fund. Math., {\bf 2} (1921), 41--49.

\bibitem{Saks}
S.~Saks, \textit{Theory of the Integral}, Dover, (1937).

\bibitem{Th}
H. P. Thielman, {\it Types of functions}, Amer. Math. Monthly,
{\bf 60} (1953), 156--161.

\bibitem{thomson1}
B.~S.~Thomson,
{\em Derivates of Interval Functions,}
Mem. Amer. Math. Soc., {\bf 452}, Providence, 1991.

\bibitem{Zyg}A. Zygmund, {\em Trigonometric Series}, 2nd ed.,
{\bf 1} and {\bf 2}, Cambridge University Press, Cambridge, (1959)
reprinted (1993).

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