1 / 34

Fourier Transforms and Images

Fourier Transforms and Images. Our aim is to make a connection between diffraction and imaging - and hence to gain important insights into the process. What happens to the electrons as they go through the sample?. What happens to the electrons.

brock
Télécharger la présentation

Fourier Transforms and Images

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Fourier Transforms and Images

  2. Our aim is to make a connection between diffraction and imaging - and hence to gain important insights into the process

  3. What happens to the electrons as they go through the sample?

  4. What happens to the electrons a) The electrons in the incident beam are scattered into diffracted beams. b) The phase of the electrons is changed as they go through the sample. They have a different kinetic energy in the sample, this changes the wavelength, which in turn changes the phase.

  5. The two descriptions are alternative descriptions of the same thing. Therefore, we must be able to find a way of linking the descriptions. The link is the Fourier Transform.

  6. A function can be thought of as made up by adding sine waves. A well-known example is the Fourier series. To make a periodic function add up sine waves with wavelengths equal to the period divided by an integer.

  7. Reimer: Transmission Electron Microscopy

  8. The Fourier Transform The same idea as the Fourier series but the function is not periodic, so all wavelengths of sine waves are needed to make the function

  9. The Fourier Transform Fourier series Fourier transform

  10. So think of the change made to the electron wave by the sample as a sum of sine waves. But each sine wave term in the sum of waves is equivalent to two plane waves at different angles This can be seen from considering the Young's slits experiment - two waves in different directions make a wave with a sine modulation

  11. Original figure by Thomas Young, courtesy Bradley Carroll

  12. Bradley Carroll

  13. This analysis tells us that a sine modulation - produced by the sample - with a period d, will produce scattered beams at angles q, where d and q are related by 2d sin q = l we have seen this before

  14. Bragg’s Law Bragg’s Law 2d sin θ = λ tells us where there are diffracted beams.

  15. What does a lens do? A lens brings electrons in the same direction at the sample to the same point in the focal plane Direction at the sample corresponds to position in the diffraction pattern - and vice versa

  16. Sample Back focal plane Lens Image

  17. The Fourier Transform Fourier series Fourier transform

  18. Optical Transforms Taylor and Lipson 1964

  19. Convolution theorem

  20. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

  21. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

  22. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

  23. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

  24. Optical Transforms Taylor and Lipson 1964

  25. Optical Transforms Taylor and Lipson 1964

  26. Optical Transforms Taylor and Lipson 1964

  27. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

  28. Atlas of Optical Transforms Harburn, Taylor and Welberry 1975

More Related