Abel polynomials

The Abel polynomials in mathematics form a polynomial sequence, the nth term of which is of the form

p_{n}(x)=x(x-an)^{n-1}.

The sequence is named after Niels Henrik Abel (1802-1829), the Norwegian mathematician.

This polynomial sequence is of binomial type: conversely, every polynomial sequence of binomial type may be obtained from the Abel sequence in the umbral calculus.

Examples

For $a=1$ , the polynomials are (sequence A137452 in the OEIS)

p_{0}(x)=1;

p_{1}(x)=x;

p_{2}(x)=-2x+x^{2};

p_{3}(x)=9x-6x^{2}+x^{3};

p_{4}(x)=-64x+48x^{2}-12x^{3}+x^{4};

For $a=2$ , the polynomials are

p_{0}(x)=1;

p_{1}(x)=x;

p_{2}(x)=-4x+x^{2};

p_{3}(x)=36x-12x^{2}+x^{3};

p_{4}(x)=-512x+192x^{2}-24x^{3}+x^{4};

p_{5}(x)=10000x-4000x^{2}+600x^{3}-40x^{4}+x^{5};

p_{6}(x)=-248832x+103680x^{2}-17280x^{3}+1440x^{4}-60x^{5}+x^{6};

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References

Rota, Gian-Carlo; Shen, Jianhong; Taylor, Brian D. (1997). "All Polynomials of Binomial Type Are Represented by Abel Polynomials". Annali della Scuola Normale Superiore di Pisa - Classe di Scienze Sér. 4. 25 (3–4): 731–738. MR 1655539. Zbl 1003.05011.

External links

Weisstein, Eric W. "Abel Polynomial". MathWorld.

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