Hermite polynomial
polynomial sequence
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Hermite polynomial
Summary
Hermite polynomial is a special function[1]. It draws 635 Wikipedia views per month (special_function category, ranking #4 of 11).[2]
Key Facts
- Hermite polynomial's instance of is recorded as special function[3].
- Hermite polynomial's instance of is recorded as mathematical concept[4].
- Charles Hermite is named after Hermite polynomial[5].
- Hermite polynomial's GND ID is recorded as 4293831-4[6].
- Hermite polynomial's Library of Congress authority ID is recorded as sh85060414[7].
- Hermite polynomial's Bibliothèque nationale de France ID is recorded as 12390510h[8].
- Hermite polynomial's IdRef ID is recorded as 032991584[9].
- Hermite polynomial's subclass of is recorded as polynomial sequence[10].
- Hermite polynomial's subclass of is recorded as Classical orthogonal polynomials[11].
- Hermite polynomial's Commons category is recorded as Hermite polynomials[12].
- Hermite polynomial's BNCF Thesaurus ID is recorded as 38388[13].
- Hermite polynomial's Freebase ID is recorded as /m/01bvmr[14].
- Hermite polynomial's NL CR AUT ID is recorded as ph161656[15].
- Hermite polynomial's Dewey Decimal Classification is recorded as 515.55[16].
- Hermite polynomial's described by source is recorded as ISO 80000-2:2019 Quantities and units — Part 2: Mathematics[17].
- Hermite polynomial's used by is recorded as Hermite transform[18].
- Hermite polynomial's different from is recorded as probabilists' Hermite polynomials[19].
- Hermite polynomial's computes solution to is recorded as Hermite differential equation (physicists')[20].
- Hermite polynomial's FAST ID is recorded as 955533[21].
- Hermite polynomial's defining formula is recorded as \mathrm{H}_n(z) = (-1)^n \mathrm{e}^{z^2} \frac{\mathrm{d}^n}{\mathrm{d}z^n} \mathrm{e}^{-z^2}, n \in \boldsymbol{\mathsf{N}}[22].
- Hermite polynomial's BabelNet ID is recorded as 01230030n[23].
- Hermite polynomial's MathWorld ID is recorded as HermitePolynomial[24].
- Hermite polynomial's Great Russian Encyclopedia Online ID is recorded as 4938099[25].
- Hermite polynomial's Quora topic ID is recorded as Hermite-Polynomials[26].
- Hermite polynomial's JSTOR topic ID is recorded as hermite-polynomials[27].
Why It Matters
Hermite polynomial draws 635 Wikipedia views per month (special_function category, ranking #4 of 11).[2] It has Wikipedia articles in 22 language editions, a strong signal of global cultural recognition.[28] It is known by 25 alternative names across languages and contexts.[29]