[seqfan] Re: "A dream" of a series :-)
maximilian.hasler at gmail.com
Sun Feb 15 14:07:45 CET 2009
Very nice article.
Just, for the next update, you may want to fix the numerical data at
the very beginning of the article:
%1 = 1 + x + 1/2*x^2 + 1/6*x^3 + 1/24*x^4 + 1/120*x^5 + 1/720*x^6 +
1/5040*x^7 + 1/40320*x^8 + O(x^9)
%2 = 1 + 1/2*x^2 - 1/3*x^3 + 3/8*x^4 - 11/30*x^5 + 53/144*x^6 -
103/280*x^7 + 2119/5760*x^8 + O(x^9)
%3 = 1 - 1/3*x^3 + 3/8*x^4 - 1/5*x^5 + 13/72*x^6 - 15/56*x^7 +
533/1920*x^8 + O(x^9)
and not -3/8 x^3 as written in the article.
On Sun, Feb 15, 2009 at 3:16 AM, Gottfried Helms
<Annette.Warlich at t-online.de> wrote:
> Dear seqfans -
> there was no time in summer, when I discussed this
> "dream of a series". In the meantime I could put things
> together into a short readable article.
> Hope you enjoy!
> The main sequence exists in OEIS (A067911, (*1)) although
> - not with the relation to the generating process as described
> in the article (I'll supply that information soon)
> - modified in the sense, that in my article the sequence
> is defined by denominators of rational numbers and some
> missing primefactors may be seen as cancelled by the numerators
> of the coefficients by the rational-arithmetic-system in Pari/GP.
> If I want to add the numerator-sequence to OEIS we must decide,
> whether I expand my numerators such that the denominators match
> the values in A067911 or whether I should send numerators and
> denominators in their reduced versions.
> Neill - what's your opinion?
> Gottfried Helms
> (*1) http://www.research.att.com/~njas/sequences/A067911
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