3. 1d Born approximation. For 1 dimensional scattering with potential V(x), it is also possible to write the solution in the form of 2m 6* (x) = Aeikz | dz'G(x, 2')V(x')e* (2²'), + %3D where G(x, x') is a Green's function satisfying an2 G(x, x') + k²G(x, x') = 6(x – x').

3. 1d Born approximation. For 1 dimensional scattering with potential V(x), it is also possible to write the solution in the form of 2m 6* (x) = Aeikz | dz'G(x, 2')V(x')e* (2²'), + %3D where G(x, x') is a Green's function satisfying an2 G(x, x') + k²G(x, x') = 6(x – x').

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

Setup is from image 1.

Use the Green's function (see image 2) to derive the expression for 1d Born's approximation.

-eik(x-a')
2ik
x > x'
e-ik(a-a') x < x'
G(2, a') =
1
2ik

3. 1d Born approximation.
For 1 dimensional scattering with potential V (x), it is also possible to write the solution in
the form of
6*(x) = Ae"
ikr
+
2m / da'G(x,2')V(x')st(2'),
where G(x, x') is a Green's function satisfying
ar2 G(x, x') + k²G(x, x') = 8(x – x').

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ISBN:

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