Borwein, J. and Bailey, D. Mathematics by Experiment: Plausible Reasoning in the 21st Century. Wellesley, MA: A
K Peters, 2003.Finch, S. R. "Pólya's Random Walk Constant."
§5.9 in Mathematical
Constants. Cambridge, England: Cambridge University Press, pp. 322-331,
2003.Domb, C. "On Multiple Returns in the Random-Walk Problem."
Proc. Cambridge Philos. Soc.50, 586-591, 1954.Glasser,
M. L. and Zucker, I. J. "Extended Watson Integrals for the Cubic Lattices."
Proc. Nat. Acad. Sci. U.S.A.74, 1800-1801, 1977.McCrea,
W. H. and Whipple, F. J. W. "Random Paths in Two and Three Dimensions."
Proc. Roy. Soc. Edinburgh60, 281-298, 1940.Montroll,
E. W. "Random Walks in Multidimensional Spaces, Especially on Periodic
Lattices." J. SIAM4, 241-260, 1956.Sloane, N. J. A.
Sequences A086230, A086231,
A086232, A086233,
A086234, A086235,
and A086236 in "The On-Line Encyclopedia
of Integer Sequences."Watson, G. N. "Three Triple Integrals."
Quart. J. Math., Oxford Ser. 210, 266-276, 1939.
be the probability that a random walk on a 
-D lattice returns to the origin. In 1921, Pólya proved
that
.
Watson (1939), McCrea and Whipple (1940), Domb (1954), and Glasser and Zucker (1977)
showed that
![(12)/(pi^2)(18+12sqrt(2)-10sqrt(3)-7sqrt(6)){K[(2-sqrt(3))(sqrt(3)-sqrt(2))]}^2](/images/equations/PolyasRandomWalkConstants/Inline9.svg)
![3(18+12sqrt(2)-10sqrt(3)-7sqrt(6))[1+2sum_(k=1)^(infty)exp(-k^2pisqrt(6))]^4](/images/equations/PolyasRandomWalkConstants/Inline12.svg)
is a complete
elliptic integral of the first kind, 
is a Jacobi
theta function, and 
is the gamma function.
are not known, but Montroll (1956) showed that for 
,
![p(d)=1-[u(d)]^(-1),](/images/equations/PolyasRandomWalkConstants/NumberedEquation4.svg)
![int_0^infty[I_0(t/d)]^de^(-t)dt,](/images/equations/PolyasRandomWalkConstants/Inline32.svg)
is a modified Bessel function
of the first kind.
from Montroll (1956) and Flajolet (Finch 2003) are given
in the following table.
