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D. Kundur and D. Hatzinakos, “Blind image deconvolution,” IEEE Trans. Image Process. 2, 223–235 (1993).

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[Crossref]

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[Crossref]

R. C. Gonzalez, R. E. Woods, and S. L. Eddins, Digital image processing using MATLAB, (Prentice Hall, New York, 2002).

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E. K. P. Chong and S. H. Żak, An introduction to optimization, 3rd ed. (Wiley-Interscience, New Jersey, 2008).

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[Crossref]

M. D. Sacchi, D. R. Velis, and A. H. Comingues, “Minimum entropy deconvolution with frequency-domain constraints,” Geophysics 59, 938–945 (1994).

[Crossref]

E. Y. Lam, “Blind bi-level image restoration with iterated quadratic programming,” IEEE Trans. Circ. Syst. Part 2 52, 52–56 (2007).

[Crossref]

T. Li and K. Lii, “A joint estimation approach for two-tone image deblurring by blind deconvolution,” IEEE Trans. Image Process. 11, 847–858 (2002).

[Crossref]

D. Kundur and D. Hatzinakos, “Blind image deconvolution,” IEEE Trans. Image Process. 2, 223–235 (1993).

T. Chan and C. K. Wong, “Total variation blind deconvolution,” IEEE Trans. Image Process. 7, 370–375 (1998).

[Crossref]

D. Kundur and D. Hatzinakos, “A novel blind deconvolution scheme for image restoration using recursive filtering,” IEEE Trans. Signal Process. 45, 375–390 (1998).

[Crossref]

S. Esedoglu, “Blind deconvolution of bar code signals,” Inverse Probl. 20, 121–135 (2004).

[Crossref]

N. Miura, N. Baba, S. Isobe, M. Noguchi, and Y. Norimoto, “Binary star reconstruction with use of the blind deconvolution method,” J. Mod. Opt. 39, 1137–1146 (1992).

[Crossref]

N. F. Law and R. G. Lane, “Blind deconvolution using least squares minimisation,” Opt. Commun. 128, 341–352 (1996).

[Crossref]

J. Kim, “Restoration of bi-level images via iterative semi-blind Wiener filtering,” Trans. KIEE 57, 1290–1294 (2008).

H. L. Van Trees, Detection, estimation, and modulation theory, Part 1 (Wiley, 1968).

R. C. Gonzalez, R. E. Woods, and S. L. Eddins, Digital image processing using MATLAB, (Prentice Hall, New York, 2002).

T. Mathworks, Optimization toolbox user’s guide (Mathworks Inc., 2003).

D. Donoho, “On minimum entropy deconvolution,” Applied Time Series Analysis II, D. F. Findley ed., (Academic, New York, 1991).

J. A. Cadzow, “Blind deconvolution via cumulant extrema,” IEEE Signal Processing Magazine., 24–41 (1996).

[Crossref]

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E. K. P. Chong and S. H. Żak, An introduction to optimization, 3rd ed. (Wiley-Interscience, New Jersey, 2008).

W. H. Press, S. A. Teukolsky, W. T. Vetterling, and B. P. Flannery, Numerical recipes in C++, 2nd ed. (Cambridge, 2005).