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- Mehler–Heine_formula abstract "In mathematics, the Mehler–Heine formula introduced by Mehler (1868) and Heine (1861) describes the asymptotic behavior of the Legendre polynomials as the index tends to infinity, near the edges of the support of the weight. There are generalizations to other classical orthogonal polynomials, which are also called the Mehler–Heine formula. The formula complements the Darboux formulae which describe the asymptotics in the interior and outside the support.".
- Mehler–Heine_formula wikiPageID "32798823".
- Mehler–Heine_formula wikiPageRevisionID "573294271".
- Mehler–Heine_formula b "n".
- Mehler–Heine_formula p "α,β".
- Mehler–Heine_formula subject Category:Orthogonal_polynomials.
- Mehler–Heine_formula comment "In mathematics, the Mehler–Heine formula introduced by Mehler (1868) and Heine (1861) describes the asymptotic behavior of the Legendre polynomials as the index tends to infinity, near the edges of the support of the weight. There are generalizations to other classical orthogonal polynomials, which are also called the Mehler–Heine formula. The formula complements the Darboux formulae which describe the asymptotics in the interior and outside the support.".
- Mehler–Heine_formula label "Mehler–Heine formula".
- Mehler–Heine_formula sameAs Mehler%E2%80%93Heine_formula.
- Mehler–Heine_formula sameAs Q17098827.
- Mehler–Heine_formula sameAs Q17098827.
- Mehler–Heine_formula wasDerivedFrom Mehler–Heine_formula?oldid=573294271.