Arcsine law
A limit theorem describing the fluctuations of a random walk on the real line, which results in an arcsine distribution or a generalized arcsine distribution. The following feature of a Brownian motion 
was noted in 1939 by P. Lévy. Let 
be the Lebesgue measure of the set 
or, in other words, the time spent by a Brownian particle on the positive semi-axis during the interval of time 
. The ratio 
will then have the arcsine distribution:
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It was subsequently noted [2] that a random walk with discrete time obeys the following arcsine law: Let 
be the successive locations in the random walk,
 |
where 
are independent and identically distributed, let 
be equal to the number of indices 
among 
for which 
, and let
 |
then the relationships
 |
 |
are all satisfied or not satisfied at the same time; here, 
for 
is the generalized arcsine distribution,
 |
where 
if 
and 
if 
.
The arcsine law in renewal theory states that for 
the following equalities are valid:
 |
and for
 |
where 
is defined by the relation 
,
 |
if and only if
 |
for 
, where 
is a function which is defined for 
and which has the property
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There exists a close connection between the arcsine law in renewal theory and the arcsine law governing a random walk [3].
References
| [1] | W. Feller, "An introduction to probability theory and its applications", 2, Wiley (1971) |
| [2] | F. Spitzer, "Principles of random walk", Springer (1976) |
| [3] | B.A. Rogozin, "The distribution of the first ladder moment and height and fluctuation of a random walk" Theory Probab. Appl., 16 : 4 (1971) pp. 575–595 Teor. Veroyatnost. i Primenen., 16 : 4 (1971) pp. 593–613 |
Comments
The function 
in the article above is called a slowly varying function, cf. [1], p. 269.
Arcsine law. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Arcsine_law&oldid=25962