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A357557
a(n) is the numerator of the coefficient c in the polynomial of the form y(x)=x^n+c such that starting with y(x)=x for n=1 each polynomial is C-1 continuous with the previous one.
1
0, 1, 43, 3481, 12647597, 380547619, 340607106994117, 23867104301800579837, 13408353860832026243555117, 43926321999197203038889578577, 13055436009603783636664151666161626100547, 6766346844526064783736339920897644104961
OFFSET
1,3
COMMENTS
The polynomials y(x)=x^n+c(n) can only be connected at x=n/(n+1) and with coefficients c(n) = { 0, 1/4, 43/108, 3481/6912, ... }. The denominator of c(n) is A061464. The numerator is our sequence a(n)
FORMULA
a(n) = numerator of Sum_{i=1..n} (i^i)/((i+1)^(i+1)).
PROG
(PARI) a(n) = my(p=1); numerator(sum(i=2, n, p/(p=i^i))); \\ Kevin Ryde, Oct 03 2022
CROSSREFS
Cf. A061464 (denominators).
Sequence in context: A130014 A246535 A265234 * A015323 A145315 A110704
KEYWORD
nonn,frac
AUTHOR
Inigo Quilez, Oct 03 2022
STATUS
approved