Optical Engineering Science. Stephen Rolt
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Название: Optical Engineering Science

Автор: Stephen Rolt

Издательство: John Wiley & Sons Limited

Жанр: Отраслевые издания

Серия:

isbn: 9781119302810

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СКАЧАТЬ a constant quantifying distortion

      If we denote the x and y components of the object and image location by xob, yob and xim, yim respectively, then we obtain:

      (3.36)equation

      Worked Example 3.1 The distortion of an optical system is given as a WFE by the expression, 4Φ0c3pcosφθ3, where Φ0 is equal to 50 μm and c = 1. The radius of the pupil, r0, is 10 mm. What is the distortion, expressed as a deviation in percent from the paraxial angle, at a field angle of 15°? From Eq. (3.12) and when expressed as an angle, the transverse aberration generated is given by:

equation

      The cosφ term expresses the fact that the direction of the transverse aberration is in the same plane as that of the object/axis. The proportional distortion is therefore given by:

equation

      (dimensions in mm; angles in radians)

      The proportional distortion is therefore 0.13%.

      3.6.1 OPD Dependence

      The list below sets out the WFE dependence of the five Gauss-Seidel aberrations on pupil function, p, and field angle, θ.

       Spherical Aberration: ΦSA ∝ p4

       Coma: ΦCO ∝ p3θ

       Field Curvature: ΦFC ∝ p2θ2

       Astigmatism: ΦAS ∝ p2θ2

       Distortion: ΦDI ∝ pθ3

      To quantify each aberration, we can define a coefficient, K, which describes the magnitude (in units of length) of the aberration. In addition, as well as normalising the pupil function, we can also normalise the field angle by introducing the quantity, h, which represents the ratio, θ/θ0, the ratio of the field angle to the maximum field angle.

      (3.37)equation

      (3.38)equation

      (3.39)equation

      (3.41)equation

      (3.42)equation

      (3.43)equation

      3.6.2 Transverse Aberration Dependence

      The ray fan or transverse aberration dependence upon pupil function and field angle is such that the order of the two variables sum to three, as opposed to four for OPD. The dependence of transverse aberration is listed below:

       Spherical Aberration: tSA ∝ p3

       Coma: tCO ∝ p2θ

       Field Curvature: tFC ∝ pθ2

       Astigmatism: tAS ∝ pθ2

       Distortion: ΦAS ∝ θ3

      3.6.3 General Representation of Aberration and Seidel Coefficients