Meixner polynomials

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Meixner polynomials

Summary

Meixner polynomials ranks in the top 2% of general entities by monthly Wikipedia readership (17 views/month).^[1]

Key Facts

Meixner polynomials is credited with the discovery of Josef Meixner^[2].
Josef Meixner is named after Meixner polynomials^[3].
Meixner polynomials's subclass of is recorded as discrete orthogonal polynomials^[4].
Meixner polynomials's time of discovery or invention is recorded as +1934-00-00T00:00:00Z^[5].
Meixner polynomials's Freebase ID is recorded as /m/04mzz4g^[6].
Meixner polynomials's different from is recorded as Meixner–Pollaczek polynomials^[7].
Meixner polynomials's defining formula is recorded as M_n(x,\beta,\gamma) = \sum_{k=0}^n (-1)^k{n \choose k}{x\choose k}k!(x+\beta)_{n-k}\gamma^{-k}^[8].
Meixner polynomials's maintained by WikiProject is recorded as WikiProject Mathematics^[9].
Meixner polynomials's Microsoft Academic ID is recorded as 2777128197^[10].

Body

Works and Contributions

Meixner polynomials is credited with the discovery of Josef Meixner^[2].

Why It Matters

Meixner polynomials ranks in the top 2% of general entities by monthly Wikipedia readership (17 views/month).^[1] It has Wikipedia articles in 5 language editions, a strong signal of global cultural recognition.^[11] It is known by 3 alternative names across languages and contexts.^[12]

⭐ Popularity Graph

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🌐 Wiki Languages

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Quick Facts

Subclass of discrete orthogonal polynomials

Properties

Defining formula M_n(x,\beta,\gamma) = \sum_{k=0}^n (-1)^k{n \choose k}{x\choose k}k!(x+\beta)_{n-k}\gamma^{-k}

Different from Meixner–Pollaczek polynomials

Discoverer or inventor Josef Meixner

Maintained by wikiproject WikiProject Mathematics

Named after Josef Meixner

Time of discovery or invention 1934

External References (2)

Freebase id /m/04mzz4g

Microsoft academic id (discontinued) 2777128197

🌐 Available in 5 languages

enMeixner polynomials deMeixner-Polynome frPolynôme de Meixner ptPolinômios de Meixner zh梅西纳多项式

🏷️ Also known as

en discrete Laguerre polynomials ru дискретные многочлены Лагерра ru полиномы Мейкснера

🔗 Connections

Discoverer or inventor 1

Josef Meixner

Maintained by wikiproject 1

WikiProject Mathematics

Named after 1

Josef Meixner

Subtypes 1

Kravchuk polynomials

References

Programmatic citations — every numbered marker resolves to a verifiable graph row below.

Direct Wikidata claims

Aggregate / graph-position facts

[1] ↑ Meixner polynomials ranks in the top 2% of general entities by monthly Wikipedia readership (17 views/month).. Wikimedia Foundation. dumps.wikimedia.org.
[11] ↑ Meixner polynomials has Wikipedia articles in 5 language editions, a strong signal of global cultural recognition.. Wikidata sitelinks. wikidata.org.
[12] ↑ Meixner polynomials is known by 3 alternative names across languages and contexts.. Wikidata aliases. wikidata.org.

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APA

4ort.xyz Knowledge Graph. (2026). Meixner polynomials. Retrieved April 10, 2026, from https://4ort.xyz/entity/meixner-polynomials

MLA

“Meixner polynomials.” 4ort.xyz Knowledge Graph, 4ort.xyz, 10 Apr. 2026, https://4ort.xyz/entity/meixner-polynomials.

BibTeX

@misc{4ortxyz_meixner-polynomials_2026, author = {{4ort.xyz Knowledge Graph}}, title = {{Meixner polynomials}}, year = {2026}, url = {https://4ort.xyz/entity/meixner-polynomials}, note = {Accessed: 2026-04-10}}

LLM prompt

According to 4ort.xyz Knowledge Graph (aggregator of Wikidata, Wikipedia, and authoritative open-data sources): Meixner polynomials — https://4ort.xyz/entity/meixner-polynomials (retrieved 2026-04-10)

Canonical URL: https://4ort.xyz/entity/meixner-polynomials · Last refreshed: April 10, 2026