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Version 10 (modified by Adam Frank, 10 years ago) ( diff )

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Planetary Wind Problem

Problem Set Up

We have 3 conditions to initialize: initial ambient medium (not important); the conditions in the base of the Hot Jupter (HJ) atmosphere; the conditions in the stellar wind at the orbital radius (a) of the HJ.

Initial Ambient Medium

HJ Ex0base

Stellar Wind at orbital radius a

Fourier Transforms

Fourier Transforms

The basic equation for the fourier transform.

with the inverse

And of course all the transform really means is this sum of intergrals.

Here we want to solve the signup function which is runs from -1 to 1 with a step at x=a

http://www.pas.rochester.edu/~afrank/Fig1.jpg

Use the derivative property of

Since derivative of f is the direct delta function

and

Thus we have

The next step is to define the Energy Spectral Density (ESD)

We use Parcivals Thm which tell us "energy" under the curve f(x)

Thus the ESD which we write as E(k) is

which for the sgn function is

So for a step function

http://www.pas.rochester.edu/~afrank/Fig2.jpg

which is exactly what you get in compressible turbulence because every shock is a sgn function.

http://www.pas.rochester.edu/~afrank/Fig3.png

Description of Problem

Results

Results

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