Abstract
The anisotropy of the land surface can be best described by the bidirectional reflectance distribution function (BRDF). As the field of multiangular remote sensing advances, it is increasingly probable that BRDF models can be inverted to estimate the important biological or climatological parameters of the earth surface such as leaf area index and albedo. The state-of-the-art of BRDF is the use of the linear kernel-driven models, mathematically described as the linear combination of the isotropic kernel, volume scattering kernel and geometric optics kernel. The computational stability is characterized by the algebraic operator spectrum of the kernel-matrix and the observation errors. Therefore, the retrieval of the model coefficients is of great importance for computation of the land surface albedos. We first consider the smoothing solution method of the kernel-driven BRDF models for retrieval of land surface albedos. This is known as an ill-posed inverse problem. The ill-posedness arises from that the linear kernel driven BRDF model is usually underdetermined if there are too few looks or poor directional ranges, or the observations are highly dependent. For example, a single angular observation may lead to an under-determined system whose solution is infinite (the null space of the kernel operator contains nonzero vectors) or no solution (the rank of the coefficient matrix is not equal to the augmented matrix). Therefore, some smoothing or regularization technique should be applied to suppress the ill-posedness. So far, least squares error methods with a priori knowledge, QR decomposition method for inversion of the BRDF model and regularization theories for ill-posed inversion were developed. In this paper, we emphasize on imposing a priori information in different spaces. We first propose a general a priori imposed regularization model problem, and then address two forms of regularization scheme. The first one is a regularized singular value decomposition method, and then we propose a retrieval method in I 1 space. We show that the proposed method is suitable for solving land surface parameter retrieval problem if the sampling data are poor. Numerical experiments are also given to show the efficiency of the proposed methods.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Roujean J L, Leroy M, Deschamps P Y. A bidirectional reflectance model of the Earth’s surface for the correction of remote sensing data. J Geophys Res, 1992, 97: 20455–20468
Verstraete M M, Pinty B, Myneny R B. Potential and limitations of information extraction on the terrestrial biosphere from satellite remote sensing. Rem Sens Env, 1996, 58: 201–214
Li X, Wang J, Hu B, et al. On unitilization of a priori knowledge in inversion of remote sensing models. Sci China Ser D-Earth Sci, 1998, 41(5): 580–585
Li X, Gao F, Wang J, et al. A priori knowledge accumulation and its application to linear BRDF model inversion. J Geophys Res, 2001, 106(D11): 11925–11935
Pokrovsky O, Roujean J L. Land surface albedo retrieval via kernel-based BRDF modeling: I. Statistical inversion method and model comparison. Rem Sens Env, 2002, 84: 100–119
Pokrovsky O, Roujean J L. Land surface albedo retrieval via kernel-based BRDF modeling: II. An optimal design scheme for the angular sampling. Rem Sens Env, 2002, 84: 120–142
Wang Y F, Li X W, Nashed Z, et al. Regularized kernel-based BRDF model inversion method for ill-posed land surface parameter retrieval. Rem Sens Env, 2007, 111(1): 36–50
Strahler A H, Li X W, Liang S, et al. MODIS BRDF/Albedo product: Algorithm technical basis document. NASA EOS-MODIS Doc., Vol. 2.1, 1994
Wanner W, Li X, Strahler A H. On the derivation of kernels for kernel-driven models of bidirectional reflectance. J Geophys Res, 1995, 100: 21077–21090
Horn B K P, Schunck B G. Determining optical flow. Artif Intell, 1981, 17: 185–203
Groetsch C W. The Theory of Tikhonov Regularization for Fredholm Equations of the First Kind. Boston: Pitman Advanced Publising Program, 1984
Tarantola A. Inverse Problems Theory: Methods for Data Fitting and Model Parameter Estimation. New York: Elsevier, 1987
Rodgers C D. Retrieval of atmospheric temperature and composition from remote sensing measurement of thermal radiation. Rev Geophys, 1976, 14(4): 609–624
Yuan Y X. A scaled central path for linear programming. J Comput Math, 2001, 19: 35–40
Ye Y Y. Interior Point Algorithms: Theory and Analysis. Chichester: John Wiley and Sons, 1997
Wang Y F, Li X W, Ma S Q, et al. BRDF model inversion of multiangular remote sensing: Ill-posedness and interior point solution method. In: Proceedings of the 9th International Symposium on Physical Measurements and Signature in Remote Sensing (ISPMSRS), Vol. XXXVI(7/W20), 2005. 328–330
Strahler A H, Lucht W, Schaaf C B, et al. MODIS BRDF/albedo product: Algorithm theoretical basis document. NASA EOS-MODIS Doc., Vol. 5.0, 1999
Tikhonov A N, Arsenin V Y. Solutions of Ill-posed Problems. New York: John Wiley and Sons, 1977
Wang Y F. Computational Methods for Inverse Problems and Their Applications. Beijing: Higher Education Press, 2007
Author information
Authors and Affiliations
Corresponding author
Additional information
Supported by National Natural Science Foundation of China (Grant Nos. 10501051, 10871191), and Key Project of Chinese National Programs for Fundamental Research and Development (Grant Nos. 2007CB714400, 2005CB422104)
Rights and permissions
About this article
Cite this article
Wang, Y., Ma, S., Yang, H. et al. On the effective inversion by imposing a priori information for retrieval of land surface parameters. Sci. China Ser. D-Earth Sci. 52, 540–549 (2009). https://doi.org/10.1007/s11430-009-0036-9
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11430-009-0036-9