Matrix methods, aberrations & optical systems

Matrix methods, aberrations & optical systems Friday September 27, 2002

System matrix

System matrix: Special Cases (a) D = 0  f = Cyo (independent of o) f yo Input plane is the first focal plane

yf o System matrix: Special Cases (b) A = 0  yf = Bo (independent of yo) Output plane is the second focal plane

yf System matrix: Special Cases (c) B = 0  yf = Ayo yo Input and output plane are conjugate – A = magnification

o f System matrix: Special Cases (d) C = 0  f = Do (independent of yo) Telescopic system – parallel rays in : parallel rays out

Examples: Thin lens Recall that for a thick lens For a thin lens, d=0 

Examples: Thin lens Recall that for a thick lens For a thin lens, d=0  In air, n=n’=1

Imaging with thin lens in air ’ o yo y’ Input plane Output plane s s’

Imaging with thin lens in air For thin lens: A=1B=0D=1 C=-1/f y’ = A’yo + B’o

Imaging with thin lens in air For thin lens: A=1B=0D=1 C=-1/f y’ = A’yo + B’o For imaging, y’ must be independent of o  B’ = 0 B’ = As + B + Css’ + Ds’ = 0 s + 0 + (-1/f)ss’ + s’ = 0

Examples: Thick Lens H’ ’ yo y’ f’ n nf n’ x’ h’ h’ = - ( f’ - x’ )

Cardinal points of a thick lens

Cardinal points of a thick lens Recall that for a thick lens As we have found before h can be recovered in a similar manner, along with other cardinal points

Aberrations Monochromatic Chromatic • A mathematical treatment can be developed by expanding the sine and tangent terms used in the paraxial approximation Unclear image Deformation of image n (λ) Spherical Coma astigmatism Distortion Curvature

Aberrations: Chromatic • Because the focal length of a lens depends on the refractive index (n), and this in turn depends on the wavelength, n = n(λ), light of different colors emanating from an object will come to a focus at different points. • A white object will therefore not give rise to a white image. It will be distorted and have rainbow edges

Aberrations: Spherical • This effect is related to rays which make large angles relative to the optical axis of the system • Mathematically, can be shown to arise from the fact that a lens has a spherical surface and not a parabolic one • Rays making significantly large angles with respect to the optic axis are brought to different foci

Aberrations: Coma • An off-axis effect which appears when a bundle of incident rays all make the same angle with respect to the optical axis (source at ∞) • Rays are brought to a focus at different points on the focal plane • Found in lenses with large spherical aberrations • An off-axis object produces a comet-shaped image f

Aberrations: Astigmatism and curvature of field Yields elliptically distorted images

Aberrations: Pincushion and Barrel Distortion • This effect results from the difference in lateral magnification of the lens. • If f differs for different parts of the lens, will differ also M on axis less than off axis (positive lens) M on axis greater than off axis (negative lens) fi>0 fi<0 object Pincushion image Barrel image

Stops in Optical Systems • In any optical system, one is concerned with a number of things including: • The brightness of the image Two lenses of the same focal length (f), but diameter (D) differs Image of S formed at the same place by both lenses S S’ Bundle of rays from S, imaged at S’ is larger for larger lens More light collected from S by larger lens

Stops in Optical Systems • Brightness of the image is determined primarily by the size of the bundle of rays collected by the system (from each object point) • Stops can be used to reduce aberrations

Stops in Optical Systems How much of the object we see is determined by: (b) The field of View Q Q’ (not seen) Rays from Q do not pass through system We can only see object points closer to the axis of the system Field of view is limited by the system

Theory of Stops • We wish to develop an understanding of how and where the bundle of rays are limited by a given optical system Theory of Stops

Aperture Stop • A stop is an opening (despite its name) in a series of lenses, mirrors, diaphragms, etc. • The stop itself is the boundary of the lens or diaphragm • Aperture stop: that element of the optical system that limits the cone of light from any particular object point on the axis of the system

Aperture Stop: Example O AS

Matrix methods, aberrations & optical systems