About: Struve function

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In mathematics, the Struve functions Hα(x), are solutions y(x) of the non-homogeneous Bessel's differential equation: introduced by Hermann Struve. The complex number α is the order of the Struve function, and is often an integer. And further defined its second-kind version as . The modified Struve functions Lα(x) are equal to −ie−iαπ / 2Hα(ix), are solutions y(x) of the non-homogeneous Bessel's differential equation: And further defined its second-kind version as .

Property	Value
dbo:abstract	En matemàtiques, les funcions de Struve, denotat com Hα(x), són solucions y(x) de l'equació diferencial no homogènia de Bessel: presentat per (1882). El nombre complex α és l'ordre de la funció Struve i és sovint un enter. Les funcions de Struve modificades, denotades com Lα(x), són iguals a −ie−iαπ / 2Hα(ix). (ca) In mathematics, the Struve functions Hα(x), are solutions y(x) of the non-homogeneous Bessel's differential equation: introduced by Hermann Struve. The complex number α is the order of the Struve function, and is often an integer. And further defined its second-kind version as . The modified Struve functions Lα(x) are equal to −ie−iαπ / 2Hα(ix), are solutions y(x) of the non-homogeneous Bessel's differential equation: And further defined its second-kind version as . (en) In matematica, le funzioni di Struve sono funzioni speciali che sono soluzioni dell'equazione differenziale lineare del secondo ordine non omogenea di Bessel: dove è la funzione Gamma. La sua soluzione generale ha una forma del tipo: dove e sono costanti arbitrarie, mentre e denotano rispettivamente le funzioni di Bessel del primo e del secondo genere. La funzione è una qualsiasi soluzione particolare dell'equazione differenziale precedente, e viene chiamata funzione di Struve di ordine . (it) In de wiskunde is de Struve-functie een speciale functie die in 1882 werd geïntroduceerd door de astronoom Hermann Struve tijdens zijn theoretisch onderzoek van diffractieverschijnselen in de optica. De functie heeft inmiddels toepassingen gevonden in de wiskunde, de optica, de hydrodynamica en de akoestiek. De functie wordt meestal voorgesteld door waarin de orde aangeeft. De Struve-functie beschrijft oplossingen van de Besselse differentiaalvergelijking. (nl) Inom matematiken är Struves funktioner en speciell funktion som definieras som lösningen y(x) av den icke-homogena Bessels differentialekvationen Funktionerna introducerades av 1882.Det komplexa talet α är ordningen av Struves funktion och är ofta ett heltal. De modifierade Struvefunktionerna definieras som . (sv) Функция Струве — неэлементарная функция, которая является частным решением неоднородного уравнения Бесселя: Интегральное выражение функции Струве: Разложение в ряд: Модифицированная функция Струве: (ru) 司徒卢威函数（Hα(x)），满足下列非齐次贝塞尔方程：变形司徒卢威函数 (zh)
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dbo:wikiPageExternalLink	https://research.tue.nl/nl/publications/efficient-approximation-of-the-struve-functions-hn-occurring-in-the-calculation-of-sound-radiation-quantaties(c68b8858-9c9d-4ff2-bf39-e888bb638527).html http://functions.wolfram.com/Bessel-TypeFunctions/StruveH/introductions/Struves/ https://zenodo.org/record/1423790 http://functions.wolfram.com
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dbp:authorlink	Hermann Struve (en)
dbp:first	Hermann (en) A. B. (en)
dbp:id	S/s090700 (en)
dbp:last	Ivanov (en) Struve (en)
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dbp:year	1882 (xsd:integer)
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rdfs:comment	En matemàtiques, les funcions de Struve, denotat com Hα(x), són solucions y(x) de l'equació diferencial no homogènia de Bessel: presentat per (1882). El nombre complex α és l'ordre de la funció Struve i és sovint un enter. Les funcions de Struve modificades, denotades com Lα(x), són iguals a −ie−iαπ / 2Hα(ix). (ca) In mathematics, the Struve functions Hα(x), are solutions y(x) of the non-homogeneous Bessel's differential equation: introduced by Hermann Struve. The complex number α is the order of the Struve function, and is often an integer. And further defined its second-kind version as . The modified Struve functions Lα(x) are equal to −ie−iαπ / 2Hα(ix), are solutions y(x) of the non-homogeneous Bessel's differential equation: And further defined its second-kind version as . (en) In matematica, le funzioni di Struve sono funzioni speciali che sono soluzioni dell'equazione differenziale lineare del secondo ordine non omogenea di Bessel: dove è la funzione Gamma. La sua soluzione generale ha una forma del tipo: dove e sono costanti arbitrarie, mentre e denotano rispettivamente le funzioni di Bessel del primo e del secondo genere. La funzione è una qualsiasi soluzione particolare dell'equazione differenziale precedente, e viene chiamata funzione di Struve di ordine . (it) In de wiskunde is de Struve-functie een speciale functie die in 1882 werd geïntroduceerd door de astronoom Hermann Struve tijdens zijn theoretisch onderzoek van diffractieverschijnselen in de optica. De functie heeft inmiddels toepassingen gevonden in de wiskunde, de optica, de hydrodynamica en de akoestiek. De functie wordt meestal voorgesteld door waarin de orde aangeeft. De Struve-functie beschrijft oplossingen van de Besselse differentiaalvergelijking. (nl) Inom matematiken är Struves funktioner en speciell funktion som definieras som lösningen y(x) av den icke-homogena Bessels differentialekvationen Funktionerna introducerades av 1882.Det komplexa talet α är ordningen av Struves funktion och är ofta ett heltal. De modifierade Struvefunktionerna definieras som . (sv) Функция Струве — неэлементарная функция, которая является частным решением неоднородного уравнения Бесселя: Интегральное выражение функции Струве: Разложение в ряд: Модифицированная функция Струве: (ru) 司徒卢威函数（Hα(x)），满足下列非齐次贝塞尔方程：变形司徒卢威函数 (zh)
rdfs:label	Funció de Struve (ca) Funzioni di Struve (it) Struve-functie (nl) Struve function (en) Функция Струве (ru) Struves funktion (sv) 司徒卢威函数 (zh)
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