Random Fibonacci Sequence
Consider the Fibonacci-like recurrence
| a_n=+/-a_(n-1)+/-a_(n-2), |
(1)
|
where a_0=0, a_1=1, and each sign is chosen independently and at random with probability 1/2. Surprisingly, Viswanath (2000) showed that
| lim_(n->infty)|a_n|^(1/n)=1.13198824... |
(2)
|
(OEIS A078416) with probability one. This constant is sometimes known as Viswanath's constant.
Considering the more general recurrence
| x_(n+1)=x_n+/-betax_(n-1), |
(3)
|
the limit
| sigma(beta)=lim_(n->infty)|x_n|^(1/n) |
(4)
|
exists for almost all values of beta. The critical value beta^* such that sigma(beta^*)=1 is given by
| beta^*=0.70258... |
(5)
|
(OEIS A118288) and is sometimes known as the Embree-Trefethen constant.
Since Fibonacci numbers can be computed as products of Fibonacci Q-matrices, this same constant arises in the iterated multiplication of certain pairs of 2×2 random matrices (Bougerol and Lacrois 1985, pp. 11 and 157).
The growth constant in the random Fibonacci sequence may be termed the Rittaud constant.
See also
Fibonacci Number, Random Matrix, Rittaud ConstantExplore with Wolfram|Alpha
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References
Batista Oliveira, J. and De Figueiredo, L. H. "Interval Computation of Viswanath's Constant." Reliab. Comput. 8, 131-138, 2002.Bougerol, P. and Lacrois, J. Random Products of Matrices With Applications to Infinite-Dimensional Schrödinger Operators. Basel, Switzerland: Birkhäuser, 1985.Devlin, K. "Devlin's Angle: New Mathematical Constant Discovered: Descendent of Two Thirteenth Century Rabbits." March 1999. http://www.maa.org/devlin/devlin_3_99.html.Embree, M. and Trefethen, L. N. "Growth and Decay of Random Fibonacci Sequences." Roy. Soc. London Proc. Ser. A, Math. Phys. Eng. Sci. 455, 2471-2485, 1999.Livio, M. The Golden Ratio: The Story of Phi, the World's Most Astonishing Number. New York: Broadway Books, pp. 227-228, 2002.Michon, G. P. "Final Answers: Numerical Constants." http://home.att.net/~numericana/answer/constants.htm#viswanath.Peterson, I. "Fibonacci at Random: Uncovering a New Mathematical Constant." Sci. News 155, 376, June 12, 1999. http://sciencenews.org/sn_arc99/6_12_99/bob1.htm.Sloane, N. J. A. Sequences A078416 and A118288 in "The On-Line Encyclopedia of Integer Sequences."Viswanath, D. "Random Fibonacci Sequences and the Number 1.13198824...." Math. Comput. 69, 1131-1155, 2000.Referenced on Wolfram|Alpha
Random Fibonacci SequenceCite this as:
Weisstein, Eric W. "Random Fibonacci Sequence." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/RandomFibonacciSequence.html