1. Blind inverse problems with isolated spikes.
- Author
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Debarnot, Valentin and Weiss, Pierre
- Subjects
- *
INVERSE problems , *ADDITIVE white Gaussian noise , *DECONVOLUTION (Mathematics) , *INTEGRAL operators , *IMPULSE response , *OPTICAL images - Abstract
Assume that an unknown integral operator living in some known subspace is observed indirectly, by evaluating its action on a discrete measure containing a few isolated Dirac masses at an unknown location. Is this information enough to recover the impulse response location and the operator with a sub-pixel accuracy? We study this question and bring to light key geometrical quantities for exact and stable recovery. We also propose an in-depth study of the presence of additive white Gaussian noise. We illustrate the well-foundedness of this theory on the challenging optical imaging problem of blind deconvolution and blind deblurring with non-stationary operators. [ABSTRACT FROM AUTHOR]
- Published
- 2023
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