HW6Solution

HW6Solution - ECE 201A Homework 6 solution 1. This problem...

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ECE 201A Homework 6 solution 1. This problem is the continuation of the Gaussian beam diffraction problem you studied earlier. Once you calculate the plane wave amplitudes by FFT you need to advance the phase of each component by the appropriate factor. Then the reflection coefficient for each plane wave component needs to be calculated. Remember that for a TE polarized plane wave incident on a planar interface 1 2 z ε 1 μ 0 x 2 0 θ i k x k z k 1 1 1 2 2 00 0 12 01 2 1 cos cos 1 z z t r z z nn η ηη = = = == 21 11 cos cos cos cos r y zz ti i yzz E R Ezz = + + 2 22 1 1 1 1 1 2 2 2 1 cos cos cos 1 cos cos cos 1 x it z x i x zx t kk k k R k k k k θθ ⎛⎞ = = ⎜⎟ + ⎝⎠ = Remember k x is the same in both media due to phase matching. Furthermore [] 2 ( 1) for 1 2 2 ( for 1 2 xn xn N kn n L N N n N L π =− + + where N is the number of grid points and L is the width of the computational window.
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Therefore for 1 2 N n ≤≤ 22 12 11 2( 1 ) ) ) ) n nn Ln L n R L n πλ π λ ππ ⎡⎤ −− ⎜⎟ ⎢⎥ ⎣⎦ = −+ a similar expression can be written for . 2 N nN The transmission coefficient is simply found using 1. R T + = Reflected and transmitted plane wave amplitudes are found by multiplying incident amplitude with the reflection and transmission coefficients. Incident power is * 1 .
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This note was uploaded on 12/02/2009 for the course ECE 000 taught by Professor O during the Spring '09 term at UCSB.

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HW6Solution - ECE 201A Homework 6 solution 1. This problem...

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