17/12/11 23:42:45.13 H5YTMI7H.net
>>565 つづき
[15] Gerald Arthur Heuer, "Functions continuous at the
irrationals and discontinuous at the rationals",
American Mathematical Monthly 72 #4 (April 1965), 370-373.
[MR 31 #3550; Zbl 131.29201]
THEOREM 5: If g is a function discontinuous at the
rationals and continuous at the irrationals,
then there is a dense uncountable subset
of the reals at each point of which g fails
to satisfy a Lipschitz condition.
(p. 373) "We omit the proof, because it is rather lengthy,
and one would hope to generalize the theorem by replacing
the rationals by an arbitrary dense set, and possibly to
show that the set of points at which g fails to be
Lipschitzian is a residual set."
つづく