64 research outputs found
Sparse nonlinear optimization for signal processing and communications
This dissertation proposes three classes of new sparse nonlinear optimization algorithms for network echo cancellation (NEC), 3-D synthetic aperture radar (SAR) image reconstruction, and adaptive turbo equalization in multiple-input multiple-output (MIMO) underwater acoustic (UWA) communications, respectively.
For NEC, the proposed two proportionate affine projection sign algorithms (APSAs) utilize the sparse nature of the network impulse response (NIR). Benefiting from the characteristics of l₁-norm optimization, affine projection, and proportionate matrix, the new algorithms are more robust to impulsive interferences and colored input than the conventional adaptive algorithms.
For 3-D SAR image reconstruction, the proposed two compressed sensing (CS) approaches exploit the sparse nature of the SAR holographic image. Combining CS with the range migration algorithms (RMAs), these approaches can decrease the load of data acquisition while recovering satisfactory 3-D SAR image through l₁-norm optimization.
For MIMO UWA communications, a robust iterative channel estimation based minimum mean-square-error (MMSE) turbo equalizer is proposed for large MIMO detection. The MIMO channel estimation is performed jointly with the MMSE equalizer and the maximum a posteriori probability (MAP) decoder. The proposed MIMO detection scheme has been tested by experimental data and proved to be robust against tough MIMO channels. --Abstract, page iv
Sub-aperture SAR Imaging with Uncertainty Quantification
In the problem of spotlight mode airborne synthetic aperture radar (SAR)
image formation, it is well-known that data collected over a wide azimuthal
angle violate the isotropic scattering property typically assumed. Many
techniques have been proposed to account for this issue, including both
full-aperture and sub-aperture methods based on filtering, regularized least
squares, and Bayesian methods. A full-aperture method that uses a hierarchical
Bayesian prior to incorporate appropriate speckle modeling and reduction was
recently introduced to produce samples of the posterior density rather than a
single image estimate. This uncertainty quantification information is more
robust as it can generate a variety of statistics for the scene. As proposed,
the method was not well-suited for large problems, however, as the sampling was
inefficient. Moreover, the method was not explicitly designed to mitigate the
effects of the faulty isotropic scattering assumption. In this work we
therefore propose a new sub-aperture SAR imaging method that uses a sparse
Bayesian learning-type algorithm to more efficiently produce approximate
posterior densities for each sub-aperture window. These estimates may be useful
in and of themselves, or when of interest, the statistics from these
distributions can be combined to form a composite image. Furthermore, unlike
the often-employed lp-regularized least squares methods, no user-defined
parameters are required. Application-specific adjustments are made to reduce
the typically burdensome runtime and storage requirements so that appropriately
large images can be generated. Finally, this paper focuses on incorporating
these techniques into SAR image formation process. That is, for the problem
starting with SAR phase history data, so that no additional processing errors
are incurred
Deep learning for inverse problems in remote sensing: super-resolution and SAR despeckling
L'abstract è presente nell'allegato / the abstract is in the attachmen
Recent Techniques for Regularization in Partial Differential Equations and Imaging
abstract: Inverse problems model real world phenomena from data, where the data are often noisy and models contain errors. This leads to instabilities, multiple solution vectors and thus ill-posedness. To solve ill-posed inverse problems, regularization is typically used as a penalty function to induce stability and allow for the incorporation of a priori information about the desired solution. In this thesis, high order regularization techniques are developed for image and function reconstruction from noisy or misleading data. Specifically the incorporation of the Polynomial Annihilation operator allows for the accurate exploitation of the sparse representation of each function in the edge domain.
This dissertation tackles three main problems through the development of novel reconstruction techniques: (i) reconstructing one and two dimensional functions from multiple measurement vectors using variance based joint sparsity when a subset of the measurements contain false and/or misleading information, (ii) approximating discontinuous solutions to hyperbolic partial differential equations by enhancing typical solvers with l1 regularization, and (iii) reducing model assumptions in synthetic aperture radar image formation, specifically for the purpose of speckle reduction and phase error correction. While the common thread tying these problems together is the use of high order regularization, the defining characteristics of each of these problems create unique challenges.
Fast and robust numerical algorithms are also developed so that these problems can be solved efficiently without requiring fine tuning of parameters. Indeed, the numerical experiments presented in this dissertation strongly suggest that the new methodology provides more accurate and robust solutions to a variety of ill-posed inverse problems.Dissertation/ThesisDoctoral Dissertation Mathematics 201
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