The Strehl ratio S is frequently defined as the ratio of the peak aberrated image
intensity from a
point source compared to the maximum attainable intensity using an ideal optical system limited only by
diffraction over the system's
aperture. It is also often expressed in terms not of the peak intensity but the intensity at the image center (intersection of the optical axis with the focal plane) due to an on-axis source; in most important cases these definitions result in a very similar figure (or identical figure, when the point of peak intensity must be exactly at the center due to symmetry). Using the latter definition, the Strehl ratio S can be computed in terms of the wavefront-error \delta(x,y): the offset of the
wavefront due to an on-axis point source, compared to that produced by an ideal focusing system over the
aperture A(x,y). Using
Fraunhofer diffraction theory, one computes the wave amplitude using the
Fourier transform of the aberrated pupil function evaluated at 0,0 (center of the image plane) where the phase factors of the
Fourier transform formula are reduced to unity. Since the Strehl ratio refers to intensity, it is found from the squared
magnitude of that amplitude: :S = |\langle e^{i\phi} \rangle|^2 = |\langle e^{i2\pi\delta/\lambda} \rangle|^2 where
i is the
imaginary unit, \phi =2\pi\delta/\lambda is the
phase error over the aperture at wavelength λ, and the average of the complex quantity inside the brackets is taken over the aperture A(x,y). The Strehl ratio can be estimated using only the
statistics of the phase deviation \phi, according to a formula rediscovered by Mahajan but known long before in antenna theory as the
Ruze formula :S \approx {e^{-\sigma^2}} where sigma (σ) is the
root mean square deviation over the aperture of the wavefront phase: \sigma^2 = \langle (\phi - \bar\phi)^2 \rangle. ==The Airy disk==