Power Series solution

lindah · 2011-09-22 19:38:23

Hi guys,

Apologies for the bombardment of DE's

I just wanted to see if my setup is correct before continuing, so I hope you can give me feedback :

1) This ODE has a regular singular point at x=0, and so Frobenius Method can be applied with

?

2) If the above is correct I have the ODE in series form simplified as:

3) Rewriting them with the common power

I obtain

4) I ask because I am concerned about the next step, as this would mean I would need to take out the first 6 terms of the first 2 series, meaning I would get many indicial roots for (s)

Thank you in advance for any feedback
Linda

bobbym · 2011-09-22 20:12:01

Hi Linda;

First, take a look here:

http://math.fullerton.edu/mathews/n2003 … esMod.html

lindah · 2011-09-22 20:53:07

Hi bobbym,

Thank you for the link! It has some nice Mathematica code

Most of the Frobenius examples (in the link, my text and course notes) usually only deal with indicial equations
where its for e.g.

and so its just quadratic roots

I've been running into incidents where the indicial would be something along the lines:

Implying:

I am thinking, find the roots of the first equation, meaning ?

bobbym · 2011-09-22 20:56:13

Hi Linda;

Maybe, you might get some like that but this indicial equation is only a quadratic.

lindah · 2011-09-23 12:18:10

Hi bobbym;

Sorry, I meant that we would deal with more than one quadratic

Extracting the terms for this was:

So

and all equal 0.

Thanks for walking me through this!
Done and dusted,

Linda

bobbym · 2011-09-23 14:21:52

Hi;

Thanks, but you did all the work.

zetafunc. · 2011-09-23 23:20:21

If you are interested, another problem that can be solved using infinite series is the solution to Airy's equation (y'' = xy). Can't remember what the initial conditions are (can probably be found from a google search), but there is a nice solution using Taylor series.

zetafunc. · 2011-09-23 23:22:17

(this equation has many applications such as modelling the refraction of light)

lindah · 2011-09-24 00:29:40

Hi zetafunc.

Thank you for the suggestion!!! I am currently working with Airy and Biry functions, as well as Bessel functions.
In setting the assignment, my lecturer has decided to throw curve balls to put us in our place!!!

bobbym · 2011-09-24 00:45:06

Well good for him/her. That will teach those snotty students a good lesson. My hat would go off to him/her if I had a hat. What is wrong with a little berating of your students? It is better than a poke in the eye from a sharp stick isn't it?

Math Is Fun Forum

#1 2011-09-22 19:38:23

Power Series solution

#2 2011-09-22 20:12:01

Re: Power Series solution

#3 2011-09-22 20:53:07

Re: Power Series solution

#4 2011-09-22 20:56:13

Re: Power Series solution

#5 2011-09-23 12:18:10

Re: Power Series solution

#6 2011-09-23 14:21:52

Re: Power Series solution

#7 2011-09-23 23:20:21

Re: Power Series solution

#8 2011-09-23 23:22:17

Re: Power Series solution

#9 2011-09-24 00:29:40

Re: Power Series solution

#10 2011-09-24 00:45:06

Re: Power Series solution

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