MathOverflow will be down for maintenance for approximately 3 hours, starting Monday evening (06/24/2013) at approximately 9:00 PM Eastern time (UTC-4).
show/hide this revision's text 4 added 20 characters in body

Hello

Is there any methods available for transforming a 2nd order Boundary value problem such as

$F\left(x,y,\frac{\text{dy}}{\text{dx}},\frac{d^2y}{\text{dx}^2}\right)=0$

$y(a)=y_0$ and $y(b)=y_1$

into an initial value problem? I know this is possible for linear ODEs.

I also know of the shooting method (a numerical technique).

But I've often seen people make transformations or change of variables, which manage to convert the BVP into an IVP. I was wondering does anyone know or have any references to how one would go about finding such a transformation?

This author seems to have made some progress on the matter. http://www.jstor.org/stable/2027813

Is there any others people know of? Or perhaps any examples transformations for that work for particular nonlinear problems people discovered and would like to share?are aware of.

Regards

show/hide this revision's text 3 edited body

Hello

Is there any methods available for transforming a 2nd order Boundary value problem such as

$F\left(x,y,\frac{\text{dy}}{\text{dx}},\frac{d^2y}{\text{dx}^2}\right)=0$

$y(a)=y_0$ and $y(b)=y_1$

into an initial value problem? I know this is possible for linear ODEs.

I also know of the shooting method (a numerical technique).

But I've often seen people make transformations or change of variables, which manage to convert the BVP into an IVP. I was wondering does anyone know or have any references to how one would go about finding such a transformation?

This author seems to have made some progress on the matter. http://www.jstor.org/stable/2027813

Is there any others people know of? Or perhaps any examples people discovered any and would like to share?

Regards

show/hide this revision's text 2 added 67 characters in body

Hello

Is there any methods available for transforming a 2nd order Boundary value problem such as

$F\left(x,y,\frac{\text{dy}}{\text{dx}},\frac{d^2y}{\text{dx}^2}\right)=0$

$y(a)=y_0$ and $y(b)=y_1$

into an initial value problem? I know this is possible for linear ODEs.

I also know of the shooting method (a numerical technique).

But I've often seen people make transformations or change of variables, which manage to convert the BVP into an IVP. I was wondering does anyone know or have any references to how one would go about finding such a transformation?

This author seems to have made some progress on the matter. http://www.jstor.org/stable/2027813

Is there any others people know of? Or perhaps any examples people discovered any would like to share?

Regards

show/hide this revision's text 1