Zelaron Gaming Forum  
Stats Arcade Portal Forum FAQ Community Calendar Today's Posts Search
Go Back   Zelaron Gaming Forum > The Zelaron Nexus > Science and Art

 
 
Thread Tools Display Modes

 
Number of zeros of a certain type of rational function
Reply
Posted 2017-08-17, 07:31 AM
Perhaps you can assist me with some intuition. I'm looking for the number of zeros of , where and are nonconstant polynomials with no common zeros, and are nonnegative integers. As an example, the case yields , which has thirty zeros (the zeros of the polynomial in the numerator).

For some convenient notation, let and , where is a complex number. I tried to decompose the rational function in terms of its poles as follows:



Here, the are complex numbers, and is a polynomial of degree . Specifically, if and (which is precisely when does not vanish), we can write the terms in the right-hand side of equation as a fraction with a common denominator, such that the polynomial dominates the degree in its numerator. Hence, has zeros in this case.

There seem to be two more distinct cases, but I'm not sure how to prove what the number of zeros is in them. The answer in those (remaining) cases should (probably, based on my numerical experiments) be

if

and

if and

Any ideas?
"Stephen Wolfram is the creator of Mathematica and is widely regarded as the most important innovator in scientific and technical computing today." - Stephen Wolfram

Last edited by Chruser; 2017-10-07 at 06:30 AM.
Old
Profile PM WWW Search
Chruser shouldn't have fed itChruser shouldn't have fed itChruser shouldn't have fed itChruser shouldn't have fed itChruser shouldn't have fed it
 
 
Chruser
 
 

Bookmarks

Tags
derivative, math, rational function, zeros

« Previous Thread | Next Thread »

Currently Active Users Viewing This Thread: 2 (0 members and 2 guests)
 

Posting Rules [Forum Rules]
You may not post new threads
You may not post replies
You may not post attachments
You may not edit your posts
BB code is On
Smilies are On
[IMG] code is On
HTML code is Off
Forum Jump

Similar Threads
Thread Thread Starter Forum Replies Last Post
Pi is now a rational number! -Spector- Principia Mathematica 3 2009-07-21 08:15 AM
23 D3V General Discussion 10 2007-07-30 02:06 PM
C tutorial Demosthenes Tech Help 4 2004-12-24 06:46 PM
ANARCHY COOKBOOK VERSION 2000 - 2006, part 1 blckshdwdragon General Discussion 0 2003-01-15 07:30 PM


All times are GMT -6. The time now is 02:52 PM.
'Synthesis 2' vBulletin 3.x styles and 'x79' derivative
by WetWired the Unbound and Chruser
Copyright ©2002-2008 zelaron.com
Powered by vBulletin® Version 3.8.2
Copyright ©2000 - 2024, Jelsoft Enterprises Ltd.
This site is best seen with your eyes open.