Devil's Staircase
In
mathematics
, a
devil's staircase
is any
function
f
(
x
) defined on the
interval
b
that has the following properties:
f
(
x
) is
continuous
on
b
.
there exists a set
N
of
measure
0 such that for all
x
outside of
N
the
derivative
f
′(
x
) exists and is zero.
f
(
x
) is nondecreasing on
b
.
f
(
a
) <
f
(
b
).
A standard example of a devil's staircase is the
Cantor function
, which is sometimes called "the" devil's staircase. There are, however, other functions that have been given that name. One is defined in terms of the
circle map
. If
f
(
x
) = 0 for all
x
≤
a
and
f
(
x
) = 1 for all
x
≥
b
, then the function can taken to represent a
cumulative distribution function
for a
random variable
which is neither a
discrete random variable
(since the
probability
is zero for each point) nor a
continuous random variable
(since the
probability density
is zero everywhere it exists).
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