Laurent Series
a series of the form
(*)
that is, a series of positive and negative powers of the difference z — a (where z, a, and the coefficients of the series are complex numbers). Here, the nonnegative powers form an ordinary power series that converges, in general, within a circle with center a and radius R ≤ ∞. The remaining terms form a series that converges, in general, outside a circle with the same center but with radius r ≥ 0. If r < R, then the series (*) converges in the annulus r < ǀz — a < R to an analytic function of the complex variable z.
Although series of the form (*) were already known to L. Euler (1748), they were named after P. Laurent, who in 1843 proved that every function of a complex variable, single-valued and analytic in the annulus r < |z — | < R, can be expanded in this annulus in this type of series (Laurent theorem). The theorem, however, was obtained somewhat earlier by K. Weierstrass in a work that remained unpublished until 1894.
Want to thank TFD for its existence? Tell a friend about us, add a link to this page, add the site to iGoogle, or visit the webmaster's page for free fun content.
| ?Page tools | ||
|---|---|---|
|