Decorrelation of the near-specular scattering in GNSS reflectometry from space

To understand the temporal decorrelation of the near-specular component of land-scattered signals in Global Navigation Satellite System Reflectometry (GNSS-R), and to describe the nature of the scattering considering spaceborne receivers at arbitrary altitudes, we propose here an analytical solution of the covariance of the field under the Kirchhoff approximation. Both the case of infinite and finite illumination on ground are studied. Surfaces with gentle undulations are considered, i.e., those having small slopes and showing slow variations of the profiles over the horizontal scale. This allows for investigating scattered fields that can be neither coherent nor completely incoherent over land surfaces that are nearly flat. In a recent work from the Authors, an extensive numerical evaluation of the decorrelation of the near-specular land scattering was presented. The phenomenology of the problem was studied and discussed numerically, solving for airborne receivers the relevant scattering integral, both as a function of the geometry of the system and of the statistical parameters of the illuminated surface. Such numerical results are used here to validate the proposed closed-form formulation. It is demonstrated how the near-specular scattering collected over land targets by a GNSS-R receiver from space decorrelates as a function of the receiver movement and of the statistical parameters describing the illuminated surface (namely, height standard deviation and correlation length). The proposed analysis provides information of interest for the design of future GNSS-R missions. The interpretation of GNSS-R data from space, which typically shows strong fluctuations, can also be supported by this approximated analytical study.