Stoneham Number

In mathematics, the Stoneham numbers are a certain class of real numbers, named after mathematician R. Stoneham. For coprime numbers b, c > 1, the Stoneham number αb,c is defined as
\alpha_{b,c} = \sum_{n=c^k>1} \frac{1}{b^nn} = \sum_{k=1}^\infty \frac{1}{b^{c^k}c^k}
It was shown by Stoneham in 1973 that αb,c is b-normal whenever c is an odd prime and b is a primitive root of c2.

References

  • R. Stoneham, On absolute (j,∈)-normality in the rational fractions with applications to normal numbers, Acta arithmetica, vol. 22 (1973), pp. 277-286

 

<< PreviousWord BrowserNext >>
pacific madrone
the games (australian tv)
skeet
aspet
the cat empire
syro malabar catholic church
barber scotia college
cammell laird
187 (murder)
alternative technology
cutter
contract curve
bethune cookman college
feldbach, switzerland
kings dominion
kenji kawai
sands end
evald ilyenkov
culture of mauritius
anti immigrant
sergei lavrov
essequibo river
champernowne constant
anadolu province
fordlndia
aass bryggeri
testis determining factor
fly or die
encod
gig racing
autosomal dominant
warnemnde
erowid
stanislaw mikolajczyk
gist
septuagesima
free papua movement
peggy ashcroft
saddle butte
hms blake (c99)
saddle river
telstra dome
len hutton
birkebeiner
Copyright 2005-2009 OnPedia.com. All Rights Reserved