Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q658574> ?p ?o }
Showing triples 1 to 90 of
90
with 100 triples per page.
- Q658574 subject Q7138882.
- Q658574 subject Q7332074.
- Q658574 subject Q8789964.
- Q658574 abstract "In mathematics, the Hermite polynomials are a classical orthogonal polynomial sequence.The polynomials arise in: probability, such as the Edgeworth series; in combinatorics, as an example of an Appell sequence, obeying the umbral calculus; in numerical analysis as Gaussian quadrature; in finite element methods as shape functions for beams; in physics, where they give rise to the eigenstates of the quantum harmonic oscillator; in systems theory in connection with nonlinear operations on Gaussian noise. Hermite polynomials were defined by Laplace (1810) though in scarcely recognizable form, and studied in detail by Chebyshev (1859). Chebyshev's work was overlooked and they were named later after Charles Hermite who wrote on the polynomials in 1864 describing them as new. They were consequently not new although in later 1865 papers Hermite was the first to define the multidimensional polynomials.".
- Q658574 thumbnail Hermite_poly.svg?width=300.
- Q658574 wikiPageExternalLink Vol2.pdf.
- Q658574 wikiPageExternalLink HermitePolyMod.html.
- Q658574 wikiPageExternalLink legacybooks.
- Q658574 wikiPageWikiLink Q1052437.
- Q658574 wikiPageWikiLink Q1054475.
- Q658574 wikiPageWikiLink Q1055314.
- Q658574 wikiPageWikiLink Q1090038.
- Q658574 wikiPageWikiLink Q11216.
- Q658574 wikiPageWikiLink Q1124546.
- Q658574 wikiPageWikiLink Q1136644.
- Q658574 wikiPageWikiLink Q1307821.
- Q658574 wikiPageWikiLink Q131187.
- Q658574 wikiPageWikiLink Q133871.
- Q658574 wikiPageWikiLink Q13520655.
- Q658574 wikiPageWikiLink Q1411166.
- Q658574 wikiPageWikiLink Q1520657.
- Q658574 wikiPageWikiLink Q159375.
- Q658574 wikiPageWikiLink Q165498.
- Q658574 wikiPageWikiLink Q168401.
- Q658574 wikiPageWikiLink Q168698.
- Q658574 wikiPageWikiLink Q176623.
- Q658574 wikiPageWikiLink Q179976.
- Q658574 wikiPageWikiLink Q190056.
- Q658574 wikiPageWikiLink Q190524.
- Q658574 wikiPageWikiLink Q192276.
- Q658574 wikiPageWikiLink Q200125.
- Q658574 wikiPageWikiLink Q206012.
- Q658574 wikiPageWikiLink Q206925.
- Q658574 wikiPageWikiLink Q207522.
- Q658574 wikiPageWikiLink Q209675.
- Q658574 wikiPageWikiLink Q209812.
- Q658574 wikiPageWikiLink Q215084.
- Q658574 wikiPageWikiLink Q215193.
- Q658574 wikiPageWikiLink Q215405.
- Q658574 wikiPageWikiLink Q220184.
- Q658574 wikiPageWikiLink Q230883.
- Q658574 wikiPageWikiLink Q233415.
- Q658574 wikiPageWikiLink Q2365325.
- Q658574 wikiPageWikiLink Q24555.
- Q658574 wikiPageWikiLink Q269699.
- Q658574 wikiPageWikiLink Q2725903.
- Q658574 wikiPageWikiLink Q305936.
- Q658574 wikiPageWikiLink Q3503251.
- Q658574 wikiPageWikiLink Q3754582.
- Q658574 wikiPageWikiLink Q3754618.
- Q658574 wikiPageWikiLink Q395.
- Q658574 wikiPageWikiLink Q409415.
- Q658574 wikiPageWikiLink Q413.
- Q658574 wikiPageWikiLink Q470877.
- Q658574 wikiPageWikiLink Q471777.
- Q658574 wikiPageWikiLink Q4817582.
- Q658574 wikiPageWikiLink Q4914496.
- Q658574 wikiPageWikiLink Q5111650.
- Q658574 wikiPageWikiLink Q5337942.
- Q658574 wikiPageWikiLink Q5741915.
- Q658574 wikiPageWikiLink Q5761267.
- Q658574 wikiPageWikiLink Q619458.
- Q658574 wikiPageWikiLink Q6520159.
- Q658574 wikiPageWikiLink Q677864.
- Q658574 wikiPageWikiLink Q6809515.
- Q658574 wikiPageWikiLink Q7135227.
- Q658574 wikiPageWikiLink Q7138882.
- Q658574 wikiPageWikiLink Q7180966.
- Q658574 wikiPageWikiLink Q7332074.
- Q658574 wikiPageWikiLink Q740970.
- Q658574 wikiPageWikiLink Q76592.
- Q658574 wikiPageWikiLink Q767680.
- Q658574 wikiPageWikiLink Q7696507.
- Q658574 wikiPageWikiLink Q783948.
- Q658574 wikiPageWikiLink Q7856594.
- Q658574 wikiPageWikiLink Q7979829.
- Q658574 wikiPageWikiLink Q815666.
- Q658574 wikiPageWikiLink Q827230.
- Q658574 wikiPageWikiLink Q829645.
- Q658574 wikiPageWikiLink Q83478.
- Q658574 wikiPageWikiLink Q847600.
- Q658574 wikiPageWikiLink Q856103.
- Q658574 wikiPageWikiLink Q860609.
- Q658574 wikiPageWikiLink Q865811.
- Q658574 wikiPageWikiLink Q8789964.
- Q658574 wikiPageWikiLink Q9492.
- Q658574 wikiPageWikiLink Q98831.
- Q658574 comment "In mathematics, the Hermite polynomials are a classical orthogonal polynomial sequence.The polynomials arise in: probability, such as the Edgeworth series; in combinatorics, as an example of an Appell sequence, obeying the umbral calculus; in numerical analysis as Gaussian quadrature; in finite element methods as shape functions for beams; in physics, where they give rise to the eigenstates of the quantum harmonic oscillator; in systems theory in connection with nonlinear operations on Gaussian noise. ".
- Q658574 label "Hermite polynomials".
- Q658574 depiction Hermite_poly.svg.