11.2 Fourier transforms 11.2.1 One-dimensional transforms

1. Chapter 11 Fourier optics April 24 Fourier transform 11.2 Fourier transforms 11.2.1 One-dimensional transforms Real representation: Complex exponential representation: In time domain: Fourier transform Inverse Fourier transform Other alternative forms exist.

2. Proof:

3. Example:Fourier transform of the Gaussian function 1) The Fourier transform of a Gaussian function is again a Gaussian function. 2) Standard deviations (f (x) drops to e-1/2):

4. 11.2.2 Two-dimensional transforms Example:Fourier transform of the cylinder function x a y

5. J0(u) J1(u) u

6. Read: Ch11: 1-2 Homework: Ch11: 2,3 Due: May 3

7. d (x) 1 x 0 d (x- x0) 1 x x0 0 April 26 Dirac delta function 11. 2.3 The Dirac delta function Dirac delta function: A sharp distribution function that satisfies: A way to show delta function Sifting property of the Dirac delta function: If we shift the origin, then

8. Delta sequence: A sequence that approaches the delta function when the distribution is narrow. The 2D delta function: The Fourier representation of delta function:

9. Displacement and phase shift: The Fourier transform of a function displaced in space is the transform of the undisplaced function multiplied by a linear phase factor. Proof:

10. Fourier transform of some functions: (constants, delta functions, combs, sines and cosines): f(x) F(k) f(x) F(k) 1 2p … x k x k 0 0 0 0 f(x) F(k) f(x) F(k) 1 1 … x k x 0 0 k 0 0

11. A(k) f(x) k x 0 f(x) B(k) k x 0 f(x) A(k) x k 0 f(x) B(k) k x 0

12. Read: Ch11: 2 Homework: Ch11: 4,7,8,9,14 Due: May 3

13. Z z Ii(Y,Z) I0(y,z) Y y April 29, May 1 Convolution theorem 11.3 Optical applications 11.3.1 Linear systems Linear system: Suppose object f (y, z) passing through an optical system results in image g(Y, Z), the system is linear if 1) af (y, z) ag(Y, Z), 2) af1(y, z) + bf2(y, z)  ag1(Y, Z) + bg2(Y, Z). Considering the case 1) incoherent light, and 2) MT = +1. The flux density arriving at the image point (Y, Z) from dydz is Point-spread function

14. z Z Ii(Y,Z) I0(y,z) y Y z Z I0(y,z) Ii(Y,Z) y Y Example: • The point-spread functionis the irradiance produced by the system with an input point source. In the diffraction-limited case with no aberration, the point-spread function is the Airy distribution function. • The image is the superposition of the point-spread function, weighted by the source radiant fluxes.

15. Space invariance: Shifting the object will only cause the shift of the image:

16. f(x) x h(x) x h(X-x) x X f(x)h(x) X 11.3.2 The convolution integral Convolution integral: The convolution integral of two functionsf (x) and h(x) is Symbol: g(X) = f(x)h(x) Example 1: The convolution of a triangular function and a narrow Gaussian function.

17. f(x) x h(x) x h(X-x) x X f(x)h(x) X Example 2: The convolution of two square functions. The convolution theorem: Proof: Example:f (x) and h(x) are square functions.

18. Frequency convolution theorem: Please prove it. Example: Transform of a Gaussian wave packet. Transfer functions: Optical transfer functionT (OTF) Modulation transfer functionM (MTF) Phase transfer functionF (PTF)

19. Read: Ch11: 3 Homework: Ch11: 15,19,20,21,22,26,27 Due: May 8

20. Y y Z P(Y,Z) r dydz R Y x X z Z May 3 Fourier methods in diffraction theory 11.3.3 Fourier methods in diffraction theory Fraunhofer diffraction: Aperture function: The field distribution over the aperture: A(y, z) = A0(y, z) exp[if (y, z)] • Each image point corresponds to a spatial frequency. • The field distribution of the Fraunhofer diffraction pattern is the Fourier transform of the aperture function:

21. A(z) E(kZ) z kZ b/2 -b/2 2p/b The single slit: Rectangular aperture: Fraunhofer: The light interferes destructively here. Fourier: The source has no spatial frequency here. The double slit (with finite width): f(z) h(z) g(z)  = z z z b/2 -b/2 a/2 -a/2 a/2 -a/2 F(kZ) H(kZ) G(kZ) × = kZ kZ kZ

22. F(kZ) kZ Three slits: |F(kZ)|2 F(kZ) f(z) kZ kZ z 0 a -a • Apodization: Removing the secondary maximum of a diffraction pattern. • Rectangular aperture  sinc function  secondary maxima. • Circular aperture  Bessel function (Airy pattern)  secondary maxima. • Gaussian aperture  Gaussian function  no secondary maxima. f(z) z

23. Array theorem: The Fraunhofer diffraction pattern from an array of identical apertures = The Fourier transform of an individual aperture × The Fourier transform of a set of point sources arrayed in the same manner. Convolution theorem z z  = y y y Example: The double slit (with finite width).

24. Read: Ch11: 3 Homework: Ch11: 29,30,32 Due: May 8

25. “You can’t judge a book by its cover.”