|
|
|
|
Viswanath's constant
|
(Definition)
|
|
|
Viswanath's constant
 is a real number whose  th power approximates the absolute value of the  th term of some random Fibonacci sequences, especially as  gets
larger. In his 2000 paper, Divakar Viswanath gave the value of the function to just eight decimal places as 1.13198824. Viswanath believed the logarithm of the constant to lie between 0.123975598 and 0.1239755995. Oliveira and Figuereido in 2002 computed the value again using interval arithmetic instead of Viswanath's “detailed rounding-error analysis,” in order to obtain “slightly better
results.” Using Mathematica, Eric Weisstein computed a different value: 1.1321506910656020459.
The continued fraction of Viswanath's constant, which is not periodic, begins
and aside from some instances of 2s, is thought to contain mostly odd numbers.
- 1
- S. R. Finch, Mathematical Constants. Cambridge: Cambridge University Press (2003): 1.2.4
- 2
- João Batista Oliveira & Luiz Henrique de Figuereido, ``Interval Computation of Viswanath's Constant'' Reliable Computing 8 2 (2002): 131 - 138
- 3
- Divakar Viswanath ``Random Fibonacci sequences and the number 1.13198824....'' Mathematics of Computation 69 231 (2000): 1131 - 1155
|
"Viswanath's constant" is owned by PrimeFan.
|
|
(view preamble)
| Other names: |
Viswanath constant |
|
|
Cross-references: odd numbers, contain, periodic, continued fraction, Eric Weisstein, Mathematica, order, arithmetic, interval, logarithm, decimal places, function, random Fibonacci sequences, term, absolute value, real number
There is 1 reference to this entry.
This is version 3 of Viswanath's constant, born on 2008-06-22, modified 2008-07-01.
Object id is 10716, canonical name is ViswanathsConstant.
Accessed 282 times total.
Classification:
| AMS MSC: | 11B39 (Number theory :: Sequences and sets :: Fibonacci and Lucas numbers and polynomials and generalizations) |
|
|
|
|
|
|
Pending Errata and Addenda
|
|
|
|
|
|
|
|
|
|
|
