Darboux's formula - Alchetron, The Free Social Encyclopedia

In mathematical analysis, Darboux's formula is a formula introduced by Gaston Darboux (1876) for summing infinite series by using integrals or evaluating integrals using infinite series. It is a generalization to the complex plane of the Euler–Maclaurin summation formula, which is used for similar purposes and derived in a similar manner (by repeated integration by parts of a particular choice of integrand). Darboux's formula can also be used to derive the Taylor series of the calculus.

Statement

If φ(t) is a polynomial of degree n and f an analytic function then

∑ m = 0 n ( − 1 ) m ( z − a ) m [ ϕ ( n − m ) ( 1 ) f ( m ) ( z ) − ϕ ( n − m ) ( 0 ) f ( m ) ( a ) ] = ( − 1 ) n ( z − a ) n + 1 ∫ 0 1 ϕ ( t ) f ( n + 1 ) [ a + t ( z − a ) ] d t .

The formula can be proved by repeated integration by parts.

Special cases

Taking φ to be a Bernoulli polynomial in Darboux's formula gives the Euler–Maclaurin summation formula. Taking φ to be (t − 1)ⁿ gives the formula for a Taylor series.

References

Darboux's formula Wikipedia

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Contents

Statement

Special cases

References