Grating製作與原理
sensitive to energy(exposure)= intensity * time = |Uo(x,y)|^2 * t = |a(x,y)|^2
z0 = film
object wave Uo(x,y) = |a(x,y)|*e^j fi(x,y)
reference wave Ur(x,y) = |A(x,y)|*e^j fi(x,y)
Exposure E(x,y) = I(x,y)*t = |Uo(x,y) + Ur(x,y)|^2 * t
tA(x) = BetaE^(x)
= Beta * t * I(x)
= Beta * t * |A|^2 + Beta*t{|a(x)|^2 + A_star(x)a(x) + A(x)a_star(x)}
=t_beta + Beta’*{|a(x)|^2 + a|A||a(x) [fi_r-fi_o]|}
當重建時的調變元素
Reconstruct of object wave Illumination wave Up(x)照Hologram film重建,穿過去的光
Transmitted wave Ut(x)
= Up(x)*tA(x)
= Up(x)*t{|a(x)|^2 + A_star(x)a(x) + A(x)a_star(x)}
= A(x)*{t_beta + beta’*[|a(x)|^2 + A_star(x)a(x) + A(x)a_star(x)]}
= U1(x)+U2(x)+U3(x)+U4(x)
{
U1(x) = A(x)*t_beta = directing transmitted A(x)
U2(x) = beta’*|a(x)|^2*A(x) = Modulated A(x)
U3(x) = beta’*|A|^2*a(x) = original object wave(primary image,virtual image)
U4(x) = beta’*|A|^2*e^j fi_r(x,y)*a(x)^x = conjugate image,real image
}
由不同角度的共軛光去重建
U4(x) = beta’*|A|^2*a(x)^x,conjugate image a(x)^2 real image會出現在virtual image方向,real image看起來會跟virtual image相反,例如凹凸前後相反看起來不合日常邏輯。
Fourier Transform 待補
Fresnel Equation 待補
由三角原理求距離
Fourier Transform 待補
Fresnel Equation 待補
由三角原理求距離
其中在此範例 theta i = 0,grating light pair = 1/125*1/2mm,波長 = 532nm,CCD Pixel size = 1.75um,theta A = 4.5mm = 雷射通過光圈,O0~O1|O-1 = 中間強度干涉分佈最強與旁邊兩點的距離任取一。
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