Neumann polynomials

Summary

Neumann polynomials is a polynomial sequence^[1]. It draws 8 Wikipedia views per month (polynomial_sequence category, ranking #5 of 7).^[2]

Key Facts

• Neumann polynomials's instance of is recorded as polynomial sequence^[3].
• Neumann polynomials's instance of is recorded as mathematical concept^[4].
• Carl Neumann is named after Neumann polynomials^[5].
• Neumann polynomials's Freebase ID is recorded as /m/07kjhfd^[6].
• Neumann polynomials's uses is recorded as Bessel function^[7].
• Neumann polynomials's defining formula is recorded as O_n^{(\alpha)}(t)= \frac{\alpha+n}{2\alpha} \sum_{k=0}^{\lfloor n/2\rfloor} (-1)^{n-k}\frac {(n-k)!} {k!} {-\alpha \choose n-k}\left(\frac 2 t \right)^{n+1-2k}^[8].
• Neumann polynomials's MathWorld ID is recorded as NeumannPolynomial^[9].
• Neumann polynomials's maintained by WikiProject is recorded as WikiProject Mathematics^[10].

Why It Matters

Neumann polynomials draws 8 Wikipedia views per month (polynomial_sequence category, ranking #5 of 7).^[2]