Chapman function
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A Chapman function describes the integration of atmospheric absorption along a slant path on a spherical earth, relative to the vertical case. It applies for any quantity with a concentration decreasing exponentially with increasing altitude. To a first approximation, valid at small zenith angles, the Chapman function for optical absorption is equal to secant(z), where z is the zenith angle. The Chapman function is named after Sydney Chapman.
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[edit] References
- Chapman, S., Absorption and dissociative or ionising effects of monochromatic radiation in an atmosphere on a rotating earth, Proc. Phys. Soc., London, 43, 1047-1055, 1931
- Smith III, F. L. and C. Smith, Numerical evaluation of Chapman's grazing incidence integral ch(X,χ), J. Geophys. Res., 77, 3592-3597, 1972