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4.22.

Geometrical illustration of longitudinal chromatic aberration. Geometrical illustration of transverse chromatic aberration.

      The effect illustrated is known as transverse chromatic aberration or lateral colour. Whilst no distinct blurring is produced by this effect, the fact that different wavelengths have different focal lengths inevitably means that system magnification varies with wavelength. As a result, the final image size or height of a common object depends upon the wavelength. This produces distinct coloured fringing around an object and the size of the effect is proportional to the field angle, but independent of aperture size.

      Hitherto, we have cast the effects of chromatic aberration in terms of transverse aberration. However, to understand the effect on the same basis as the Gauss-Seidel aberrations, it is useful to express chromatic aberration in terms of the OPD. When applied to a single lens, longitudinal chromatic aberration simply produces defocus that is equal to the focal length divided by the Abbe number. Therefore, the longitudinal chromatic aberration is given by:

      f is the focal length of the lens and r the pupil position.

Geometrical illustration of eyepiece using two plano-convex lenses separated by a distance equivalent to half the sum of their focal lengths—Huygens Eyepiece.

      Worked Example 4.5 Lateral Chromatic Aberration and the Huygens Eyepiece

equation

      Since we are determining the impact of lateral chromatic aberration, we are only interested in the effective focal length of the system comprising the two lenses. Using simple matrix analysis as described in Chapter 1, the system focal length is given by:

equation

      If we assume that both lenses are made of the same material, then their focal power will change as a function of wavelength by a common proportion, α. In that case, the system focal power at the new wavelength would be given by:

equation

      For small values of α, we can ignore terms of second order in α, so the change in system power may be approximated by:

equation

      The change in system power should be zero and this condition unambiguously sets the lens separation, d, for no lateral chromatic aberration:

      (4.50)equation

      If this condition is fulfilled, then the Huygens eyepiece will have no transverse chromatic aberration. However, it must be emphasised that this condition does not provide immunity from longitudinal chromatic aberration.

Graphical illustration of Abbe diagram.

      4.7.3 The Abbe Diagram for Glass Materials

      The different zones highlighted in the Abbe diagram replicated in Figure 4.24 refer to the elemental composition of the glass. For example, ‘Ba’ refers to the presence of barium and ‘La’ to the presence of lanthanum. Originally, many of the dense, high index glasses used to contain lead, but these are being phased out due to environmental concerns. The Abbe diagram reveals a distinct geometrical profile with a tendency for high dispersion to correlate strongly with refractive index. In fact, it is the presence of absorption features within the glass (at very much shorter wavelengths) that give rise to the phenomenon of refraction and these features also contribute to dispersion.

      4.7.4 The Achromatic Doublet

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