Kapteyn series is a series expansion of analytic functions on a domain in terms of the Bessel function of the first kind. Kapteyn series are named after Willem Kapteyn, who first studied such series in 1893.[1][2] Let be a function analytic on the domain
with . Then can be expanded in the form
where
The path of the integration is the boundary of . Here , and for , is defined by
Kapteyn's series are important in physical problems. Among other applications, the solution of Kepler's equation can be expressed via a Kapteyn series:[2][3]
Relation between the Taylor coefficients and the αn coefficients of a function
editLet us suppose that the Taylor series of reads as
Then the coefficients in the Kapteyn expansion of can be determined as follows.[4]: 571
Examples
editThe Kapteyn series of the powers of are found by Kapteyn himself:[1]: 103, [4]: 565
For it follows (see also [4]: 567 )
and for [4]: 566
Furthermore, inside the region ,[4]: 559
See also
editReferences
edit- ^ a b Kapteyn, W. (1893). Recherches sur les functions de Fourier-Bessel. Ann. Sci. de l’École Norm. Sup., 3, 91-120.
- ^ a b Baricz, Árpád; Jankov Maširević, Dragana; Pogány, Tibor K. (2017). "Series of Bessel and Kummer-Type Functions". Lecture Notes in Mathematics. Cham: Springer International Publishing. doi:10.1007/978-3-319-74350-9. ISBN 978-3-319-74349-3. ISSN 0075-8434.
- ^ Borghi, Riccardo (2021). "Solving Kepler's equation via nonlinear sequence transformations". arXiv:2112.15154 [math.CA].
- ^ a b c d e Watson, G. N. (2011-06-06). A treatise on the theory of Bessel functions (1944 ed.). Cambridge University Press. OL 22965724M.