Bessel function

special function of two complex variables

Thing bessel_function Q109546200

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Bessel function

Summary

Bessel function is an it^[1]. It draws 12 Wikipedia views per month (bessel_function category, ranking #2 of 1).^[2]

Key Facts

Bessel function's instance of is recorded as Bessel function^[3].
Bessel function's instance of is recorded as special function^[4].
Bessel function's instance of is recorded as binary function^[5].
Bessel function's described by source is recorded as ISO 80000-2:2019 Quantities and units — Part 2: Mathematics^[6].
Bessel function's defining formula is recorded as \mathrm{J}{\nu}(z) = \sum{k = 0}^{\infty} \frac{(-1)^k (z/2)^{\nu + 2 k}}{k! \mathrm{\Gamma}(\nu + k + 1)}^[7].
Bessel function's MathWorld ID is recorded as BesselFunctionoftheFirstKind^[8].
Bessel function's maintained by WikiProject is recorded as WikiProject Mathematics^[9].
Bessel function's ProofWiki ID is recorded as Definition:Bessel_Function/First_Kind^[10].
Bessel function's in defining formula is recorded as \mathrm{J}_{\nu}(z)^[11].
Bessel function's in defining formula is recorded as \nu^[12].
Bessel function's power series expansion is recorded as \mathrm{J}{\nu}(z) = \sum{k = 0}^{\infty} \frac{(-1)^k (z/2)^{\nu + 2 k}}{k! \mathrm{\Gamma}(\nu + k + 1)}^[13].
Bessel function's Digital Library of Mathematical Functions ID is recorded as 10.2.E2^[14].

Why It Matters

Bessel function draws 12 Wikipedia views per month (bessel_function category, ranking #2 of 1).^[2]

⭐ Popularity Graph

0/100 long tail

📈 Wikipedia Views · last 28h

66/mo 66/yr

📊 Google Search Volume

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Quick Facts

Instance of Bessel function, special function, binary function

Properties

Defining formula \mathrm{J}_{\nu}(z) = \sum_{k = 0}^{\infty} \frac{(-1)^k (z/2)^{\nu + 2 k}}{k! \mathrm{\Gamma}(\nu + k + 1)}

Described by source ISO 80000-2:2019 Quantities and units — Part 2: Mathematics

Imported from wholeness_audit_2026-05-02

In defining formula \mathrm{J}_{\nu}(z), \nu

Maintained by wikiproject WikiProject Mathematics

Power series expansion \mathrm{J}_{\nu}(z) = \sum_{k = 0}^{\infty} \frac{(-1)^k (z/2)^{\nu + 2 k}}{k! \mathrm{\Gamma}(\nu + k + 1)}

External References (3)

Digital library of mathematical functions id 10.2.E2

Mathworld id BesselFunctionoftheFirstKind

Proofwiki id Definition:Bessel_Function/First_Kind

References

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

Direct Wikidata claims

Class ancestry

[1] ↑ Bessel function is an instance of Bessel function (Q219637) [P31, primary]. Wikidata. wikidata.org.

Aggregate / graph-position facts

[2] ↑ Bessel function draws 12 Wikipedia views per month (bessel_function category, ranking #2 of 1).. Wikimedia Foundation. dumps.wikimedia.org.

📑 Cite this page

Use these citations when quoting this entity in research, articles, AI prompts, or wherever provenance matters. We aggregate Wikidata + Wikipedia + authoritative open-data sources; the stitched, scored, cross-referenced view is what 4ort.xyz contributes.

APA

4ort.xyz Knowledge Graph. (2026). Bessel function. Retrieved May 3, 2026, from https://4ort.xyz/entity/bessel-function-q109546200

MLA

“Bessel function.” 4ort.xyz Knowledge Graph, 4ort.xyz, 3 May. 2026, https://4ort.xyz/entity/bessel-function-q109546200.

BibTeX

@misc{4ortxyz_bessel-function-q109546200_2026, author = {{4ort.xyz Knowledge Graph}}, title = {{Bessel function}}, year = {2026}, url = {https://4ort.xyz/entity/bessel-function-q109546200}, note = {Accessed: 2026-05-03}}

LLM prompt

According to 4ort.xyz Knowledge Graph (aggregator of Wikidata, Wikipedia, and authoritative open-data sources): Bessel function — https://4ort.xyz/entity/bessel-function-q109546200 (retrieved 2026-05-03)

Canonical URL: https://4ort.xyz/entity/bessel-function-q109546200 · Last refreshed: May 3, 2026