Solving the Bessel Function Equation with Series Solution Method

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dats13
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I am trying to solve this equation in terms of Bessel functions.

xy"-y'+(4x^3)y=0

I am sure how to do this. The first thing that comes to mind is to solve for a series solution. This solution can then be compared to the bessel function and from that I can determine the first solution and thus get the second linearly independent solution.

Would this be the correct approach or is there any other way to solve for the general solution in terms of Bessel functions?

Any advice is greatly appreciated.
 
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I figured out how to solve this. By comparing the given ODE to the following:

[tex]x^{2}\frac{d^{2}y}{d^{2}x}+x(z+2bx^{r})\frac{dy}{dx}+[c+dx^{2s}-b(1-a-r)x^{r}+b^{2}x^{2r}]y=0[/tex]

I can then determine a, b, c, d, r and s. From this, the solution is given by:

[tex]y(x)=x^{\frac{1-a}{2}}e^{-\frac{b}{r}x^{r}}Z_{p}(\frac{\sqrt{d}}{s}x^{s})[/tex]

where

[tex]p=\frac{1}{s}\sqrt{(\frac{1-a}{2})^{2}-c}[/tex]
 
Hmm...

I find it a bit odd that the question asks you to solve this in terms of Bessel functions, because it has a simple solution in terms of trigonometric functions. Try transforming the independent variable to [itex]u = x^2[/itex].
 
Ben, I agree with what you're saying.

Determining a, b, c, d, r and s, gives me the solution

[tex]y(x)=xZ_{\frac{1}{2}}(x^{2})[/tex]

Now since p=1/2

[tex]Z_{\frac{1}{2}}(x^{2})=c_{1}J_{\frac{1}{2}}(x^{2})+c_{2}J_{-\frac{1}{2}}(x^{2})[/tex]

Thus the solution is

[tex]y(x)=x[c_{1}J_{\frac{1}{2}}(x^{2})+c_{2}J_{-\frac{1}{2}}(x^{2})]=C_{1}cos(x^{2})+C_{2}sin(x^{2})[/tex]
 
dats13 said:
I figured out how to solve this. By comparing the given ODE to the following:

[tex]x^{2}\frac{d^{2}y}{d^{2}x}+x(z+2bx^{r})\frac{dy}{dx}+[c+dx^{2s}-b(1-a-r)x^{r}+b^{2}x^{2r}]y=0[/tex]

I can then determine a, b, c, d, r and s.
What is the z in the coefficient of y'? Is that a typo?
 
It is a typo. It is suppose to be "a" not "z". Thanks for pointing that out.