# perturbations in mathematica

Write

``````                 y''[x] + ( [Epsilon] * Exp[x/3] * y[x] )==0.
``````

For [Epsilon]=0

Solve for y[x] with initial conditions

``````                            y[0]=y'[0]=1
``````
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Is `[Epsilon]` just a number? And you want the solution as a Taylor series in it? Note that the solution for finite `Epsilon` is Bessel functions. –  Andrew Jaffe May 8 '11 at 9:26
If `[Epsilon] == 0` then `( [Epsilon]*Exp[x/3]*y[x] ) == 0` does it not? –  Mr.Wizard May 8 '11 at 9:30
You should not post your homework here for other to do it –  belisarius May 8 '11 at 14:21

## 1 Answer

``````eq = y''[x] + Epsilon*Exp[x/3]*y[x] == 0
soln = DSolve[eq, y[x], x]
``````

gives an answer, and then you can even do

``````Series[y[x] /. soln[[1]], {Epsilon, 0, 2}]
``````

which is ugly.

To add initial conditions, you just add equations:

``````soln2 = DSolve[{eq, y[0]==1, y'[0]==1}, y[x], x]//Simplify
Series[y[x] /. soln2[[1]], {Epsilon, 0, 2}]//Simplify
``````

(where I've added `//Simplify` to force Mathematica to put it into nice form.

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What about the initial conditions !!! –  Sunday May 8 '11 at 9:43
Thanks Andrew !!! –  Sunday May 8 '11 at 10:00