1 / 41

Feb 14, 2011

Feb 14, 2011. Midterm: Mon., Feb. 21 Presentations on Friday: Carleton (HST) Chromey (Chandra) Robertson (Spitzer). Stokes Parameters. where. Define STOKES PARAMETERS. I: always positive proportional to flux or intensity of wave V: measures circular polarization

nuru
Download Presentation

Feb 14, 2011

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. Feb 14, 2011 Midterm: Mon., Feb. 21 Presentations on Friday: Carleton (HST) Chromey (Chandra) Robertson (Spitzer)

  2. Stokes Parameters where

  3. Define STOKES PARAMETERS

  4. I: always positive proportional to flux or intensity of wave V: measures circular polarization V=0 linear polarization V>0 right hand ellipticity V<0 left hand ellipticity Q,U: measure orientation of ellipse relative to x-axis Q=U=0 for circular polarization

  5. For a monochromatic wave, you only need 3 parameters to describe it: For pure elliptical polarization The Stokes parameters are not independent: you need only specify 3, then can compute the 4th

  6. A more general situation will involve the superposition of many waves, each with their own wavelength and polarization. Then one defines the Stokes parameters as time averages of the ε1, ε2,χ (note – in one nanosecond, a visible wave has ~106 oscillations) time average

  7. Sometimes waves are completely unpolarized: phase difference between Ex and Ey are random No prefered direction in x-y plane, so Ex and Ey don’t trace an ellipse, circle, line etc. In this case: So... The intensity will consist of a polarized part (for which I2 = U2 + V2 + Q2) and an unpolarized part. Thus,

  8. Degree of Polarization Special case: V=0 no circular polarization, but can have “partial linear polarization” i.e. Some of I is unpolarized  Some of I is polarized 

  9. Angle of Polarization

  10. Sources of Polarization of Light in Celestial Objects (1) Refelection off solid surfaces e.g. moon; plane mirrors

  11. (2) Scattering of light by molecules: Rayleigh Scattering e.g. the blue sky

  12. (3) Zeeman Effect e.g. Sunspots In the presence of a magnetic field of strength B, a line will split into several components, each with different polarization e.g. classical “Normal” Zeeman effect: An oscillating charge of mass m radiates with frequency ω0 in the absence of a B field. Apply B-field of strength B  splits into 3 lines circularly polarized linearly polarized

  13. (4) Scattering of light by free electrons (Thomson scattering) e.g. solar corona (5) Synchrotron emission (e.g. radio galaxies) Radiation from relativistic electrons in B-field

  14. (6) Scattering by dust grains e.g. polarization of starlight by dust grains aligned in the Milky Way’s B-field --- The Davis-Greeenstein Effect The interstellar magnetic field in the Milky Way will align paramagnetic dust grains – they tend to orient their long axes perpendicular to the B-field. E-field parallel to the long axis is blocked more than E-field perpendicular to the dust grains

  15. Light from stars is unpolarized, but becomes polarized as it traverses the interstellar medium (ISM). Light becomes polarized parallel to the magnetic field  map of B-field The direction of polarization is shown below as short lines superimposed on a map of the hydrogen gas distribution in Galactic latitude and longitude. Note that the hydrogen gas filaments lie mostly parallel to the polarization directions of starlight, indicating that the gas concentrations are elongated parallel to the local magnetic field. This indicates that the gas filaments cannot be strongly self-gravitating. Cleary, Heiles & Haslam 1979

  16. Polarimeters Most polarimeters rely on linear polarizers, i.e. “analyzers” which sub-divide the incident light into 2 beams: one beam linearly polarized parallel to the “principal plane” of the analyzer other beam perpendicular to it. TYPES OF ANALYZERS (1) Polarizer, polarizer film invented by Land in 1928, at age 19 Absorbs the component of the electric vector which oscillates in a particular direction  usually not used in astronomy, since you hate to throw out light

  17. (2) Birefringent crystal e.g. calcite Has different index of refraction for waves oscillating in x-direction vs. the y-direction

  18. (3) Wollaston Prism; Nicol Prism * To get equal intensities for the parallel and perpendicular beams when the incident beam is unpolarized, you can cement 2 pieces of birefringent crystal together, with the principle planes crossed. * This configuration also results in the widest separation of the 2 beams * Nicol prism: one beam reflected at the interface.

  19. (4) Pockels Cell Single crystal emersed in a controllable E field. The external E field induces bi-refringence; can be varied.

  20. (5) Wire grid analyzers and Dipole Antennas * Grid of parallel wires * Dipole antenna -- radio receivers Most sensitive to radiation which is linearly polarized with E parallel to the dipole  for optimum efficiency, need to build “dual-polarization” receivers

  21. (6) Retarders e.g. sheet of mica A material produces a phase difference between the beams polarized parallel and perpendicular to the principle plane of the crystal – called retardance, τ Transforms a beam with Stokes Parameters I,Q,U,V to one with different Stokes Parameters I’, Q’, U’, V’ Quarter Wave Plate If incident beam is circularly polarized: I=V, then the output beam is linearly polarized I=sqrt(Q2 + U2) Half Wave Plate Changes right-handed circular polarization to left-handed, or Changes linear polarization at angle θ to linear pol. at angle -θ

  22. Single channel polarimeters combine these elements to measure either circular or linear polarization:

  23. Some Practical Considerations for Polarimeters (1) Birefringent materials are scarce, and difficult to obtain in large sizes  limits sizes of instruments, resolution of spectrographs (2) Refractive indices of material are a function of λ  waveplates have retardance τ which is a function of λ  need to achromatize

  24. (3) The night sky is polarized. Moonlight is VERY polarized.  sky polarization must be monitored. (4) Spectropolarimetry * The wavelength dependence of the % polarization  origin of polarization (e.g. dust vs. electron scattering vs. synchrotron) * Diffraction gratings, however, polarize light very strongly, like mirrors.  design spectropolarimetry so that the polarizer is before diffraction grating in light path, not after

  25. (5) Telescope induced polarization * light is polarized by reflection * turns out, the induced linear polarization by each reflection is exactly canceled on axis for Cassegrain focus reflectors Prime focus reflectors refractors * TERRIBLE at Newtonian, Coude, Naysmyth foci because of the plane mirror reflection

  26. Other Applications of Polarization Rainbows are polarized David Lien, PSI EPOD 03/02/06 These two images of a late afternoon rainbow in Tucson, Arizona were taken within 20 seconds of each other (taken in July of 2005). The difference? Each picture was taken through a polarizing filter which was rotated 90 degrees between the two photographs. The light waves that are ultimately redirected to create the rainbow are reflected at the back of the raindrop, and the angle of redirection is very close to Brewster's angle for a water-air interface. Light reflecting off of a surface at Brewster's angle is 100% polarized. Since the sunlight resulting in a rainbow reflects off the back of a drop over a small range of angles, rainbows are not 100% polarized (~95% polarization is typical). Note that these images also show faint anti-crepuscular rays created by storm clouds along the western horizon.

  27. Anti-glare windows

  28. LCD Displays

  29. Bees can see polarized light  polarization of blue sky enables them to navigate Humans: Haidinger’s Brush Vikings: Iceland Spar?

  30. Many invertebrates can see polarization, e.g. the Octopus Not to navigate (they don’t go far) Perhaps they can see transparent jellyfish better? unpolarized polarized

  31. Polarization and Stress Tests In a transparent object, each wavelength of light is polarized by a different angle. Passing unpolarized light through a polarizer, then the object, then another polarizer results in a colorful pattern which changes as one of the polarizers is turned.

  32. CD cover seen in polarized light from monitor

  33. 3D movies Polarization is also used in the entertainment industry to produce and show 3-D movies. Three-dimensional movies are actually two movies being shown at the same time through two projectors. The two movies are filmed from two slightly different camera locations. Each individual movie is then projected from different sides of the audience onto a metal screen. The movies are projected through a polarizing filter. The polarizing filter used for the projector on the left may have its polarization axis aligned horizontally while the polarizing filter used for the projector on the right would have its polarization axis aligned vertically. Consequently, there are two slightly different movies being projected onto a screen. Each movie is cast by light which is polarized with an orientation perpendicular to the other movie. The audience then wears glasses which have two Polaroid filters. Each filter has a different polarization axis - one is horizontal and the other is vertical. The result of this arrangement of projectors and filters is that the left eye sees the movie which is projected from the right projector while the right eye sees the movie which is projected from the left projector. This gives the viewer a perception of depth.

More Related