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Faà di Bruno's formula
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(Definition)
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Faà di Bruno's formula is a generalization of the chain rule to higher order derivatives which expresses the derivative of a composition of functions as a series of products of derivatives:
$${d^n \over dx^n} f(g(x))=\sum_{\sum_{k=0}^n k m_k = n} \frac{n!}{m_1!\,m_2!\,m_3!\,\cdots 1!^{m_1}\,2!^{m_2}\,3!^{m_3}\,\cdots} f^{(m_1 + \cdots + m_n)}(g(x)) \prod_{j\,:\,m_j\neq 0}\left(g^{(j)}(x)\right)^{m_j}$$
This formula was discovered by Francesco Faà di Bruno in the 1850s and can be proved by induction on the order of the derivative.
- 1
- Faà di Bruno, C. F.. ``Sullo sviluppo delle funzione.'' Ann. di Scienze Matem. et Fisiche di Tortoloni 6 (1855): 479-480
- 2
- Faà di Bruno, C. F.. ``Note sur un nouvelle formule de calcul différentiel.'' Quart. J. Math. 1 (1857): 359-360
- 3
- H. Figueroa & J. M. Gracia-Bondía, ``Combinatorial Hopf Algebras in Quantum Field Theory I'' Rev. Math. Phys. 17 (2005): 881 - 975
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"Faà di Bruno's formula" is owned by rspuzio.
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| Other names: |
Faa di Bruno's formula, Faà di Bruno formula, Faa di Bruno formula |
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Cross-references: order, induction, Francesco Faà di Bruno, formula, products, series, functions, composition, derivative, higher order derivatives, chain rule
There are 2 references to this entry.
This is version 2 of Faà di Bruno's formula, born on 2007-02-01, modified 2007-02-01.
Object id is 8853, canonical name is FaaDiBrunosFormula.
Accessed 3049 times total.
Classification:
| AMS MSC: | 16W30 (Associative rings and algebras :: Rings and algebras with additional structure :: Coalgebras, bialgebras, Hopf algebras ; rings, modules, etc. on which these act) |
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Pending Errata and Addenda
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