[Search for users]
[Overall Top Noters]
[List of all Conferences]
[Download this site]
| Title: | Mathematics at DEC |
|
| Moderator: | RUSURE::EDP |
|
| Created: | Mon Feb 03 1986 |
| Last Modified: | Fri Jun 06 1997 |
| Last Successful Update: | Fri Jun 06 1997 |
| Number of topics: | 2083 |
| Total number of notes: | 14613 |
690.0. "Recurrence relation inquiry from USENET" by SQM::HALLYB (Are all the good ones taken?) Thu Apr 09 1987 14:29
Path: decwrl!decvax!tektronix!uw-beaver!teknowledge-vaxc!sri-unix!husc6!seismo!mcvax!inria!imag!phs
Subject: Solution of a Recurrence Relation
Organization: IMAG, University of Grenoble, France
In the solution of a puzzle, I ended up with the recurrence relation :
1 1 2
X = --- X = X - --- X
1 2 n+1 n 2 n
Obviously X is decreasing, positive and has 0 as a limit. Even more it
is roughly equal to 2/n, but in order to get a more precise idea of what
could be the value of X for "large" n's, I tried to express it as a sum :
a1 a2 a3
X = a0 + ---- + ---- + ---- + ...
n n n^2 n^3
but found no solution.
Is there someone who could give me an equivalent of X for large n ?
With explanations ? I am surprised that this function has no development
because it is such a "simple and smooth function"; is there a general
theory of which functions can be developed, and under which forms ?
Thanks in advance.
--
Philippe SCHNOEBELEN,
LIFIA - IMAG, BP 68 UUCP : ...mcvax!imag!lifia!phs
38402 Saint Martin d'Heres, FRANCE
"Algebraic symbols are used when you do not know what you are talking about."
| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 690.1 | | CLT::GILBERT | eager like a child | Fri Apr 10 1987 22:27 | 2 |
| The latest approximation gives something like 2/(n+log(n)+O(1)).
(that's a natural logarithm, naturally).
|