Insights Blog
-- Browse All Articles --
Physics Articles
Physics Tutorials
Physics Guides
Physics FAQ
Math Articles
Math Tutorials
Math Guides
Math FAQ
Education Articles
Education Guides
Bio/Chem Articles
Technology Guides
Computer Science Tutorials
Forums
General Math
Calculus
Differential Equations
Topology and Analysis
Linear and Abstract Algebra
Differential Geometry
Set Theory, Logic, Probability, Statistics
MATLAB, Maple, Mathematica, LaTeX
Trending
Featured Threads
Log in
Register
What's new
Search
Search
Search titles only
By:
General Math
Calculus
Differential Equations
Topology and Analysis
Linear and Abstract Algebra
Differential Geometry
Set Theory, Logic, Probability, Statistics
MATLAB, Maple, Mathematica, LaTeX
Menu
Log in
Register
Navigation
More options
Contact us
Close Menu
JavaScript is disabled. For a better experience, please enable JavaScript in your browser before proceeding.
You are using an out of date browser. It may not display this or other websites correctly.
You should upgrade or use an
alternative browser
.
Forums
Mathematics
Calculus
An identity with Bessel functions
Reply to thread
Message
[QUOTE="Juan Comas, post: 6832096, member: 730776"] Thank you for your answer. We have already used DMLF, Wolfram and many other resources without success. This is not an easy job. It is a summation of a second order Kapteyn series. Its difficulty has been acknowledged by many authors, for example by R.C. Tautz and I. Lerche. I attach a pair of articles of them. we have made large unsuccessful efforts trying to obtain a summation of this Kapteyn series. The result is very simple ##J_{2}(e)##. As a new trial we come to this forum to see if somebody knows already the solution. So my question remains. Does anybody know a proof of the formula? [/QUOTE]
Insert quotes…
Post reply
Forums
Mathematics
Calculus
An identity with Bessel functions
Back
Top