Sparse photoacoustic microscopy based on low-rank matrix approximation

Ting Liu; Mingjian Sun; Naizhang Feng; Minghua Wang; Deying Chen; Yi Shen

doi:10.3788/COL201614.091701

Journals >Chinese Optics Letters >Volume 14 >Issue 9 >Page 091701 > Article

Chinese Optics Letters
Vol. 14, Issue 9, 091701 (2016)

Sparse photoacoustic microscopy based on low-rank matrix approximation

Ting Liu, Mingjian Sun^*, Naizhang Feng, Minghua Wang..., Deying Chen and Yi Shen|Show fewer author(s)

Author Affiliations

Department of Control Science and Engineering, Harbin Institute of Technology, Harbin 150001, China

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DOI: 10.3788/COL201614.091701 Cite this Article Set citation alerts

Ting Liu, Mingjian Sun, Naizhang Feng, Minghua Wang, Deying Chen, Yi Shen, "Sparse photoacoustic microscopy based on low-rank matrix approximation," Chin. Opt. Lett. 14, 091701 (2016) Copy Citation Text

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Abstract

As a high-resulotion biological imaging technology, photoacoustic microscopy (PAM) is difficult to use in real-time imaging due to the long data acquisition time. Herein, a fast data acquisition and image recovery method named sparse PAM based on a low-rank matrix approximation is proposed. Specifically, the process to recover the final image from incomplete data is formulated into a low-rank matrix completion framework, and the “Go Decomposition” algorithm is utilized to solve the problem. Finally, both simulated and real PAM experiments are conducted to verify the performance of the proposed method and demonstrate clinical potential for many biological diseases.

Y_{M} = {\begin{matrix} X_{i, j} & if M_{i, j} = 1 \\ 0 & otherwise \end{matrix} .

(1)

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{Sum}^{i} = \sum_{j = 1}^{i} σ_{j} .

(2)

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\min rank (X) s.t. X_{i, j} = Y_{M_{i, j}}, if M_{i, j} = 1 .

(3)

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\min {‖ Y_{M} - X - Z ‖}_{F}^{2} s.t. rank (X) \leq r supp (Z) = \bar{Ω},

(4)

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X_{t} = \underset{rank (L) \leq r}{\arg \min} {‖ Y - X - Z_{t - 1} ‖}_{F}^{2};

(5)

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Z_{t} = \underset{card (S) \leq k}{\arg \min} {‖ Y - X_{t} - Z ‖}_{F}^{2},

(6)

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\tilde{X} = Y_{1} {(A_{2}^{T} Y_{1})}^{- 1} Y_{2}^{T} .

(7)

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Z_{t} = - P_{\bar{Ω}} (X_{t}) .

(8)

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SSIM (X, Y) = \frac{(2 μ_{X} μ_{Y} + C_{1}) (2 σ_{X Y} + C_{2})}{(μ_{X}^{2} + μ_{Y}^{2} + C_{1}) (σ_{X}^{2} + σ_{Y}^{2} + C_{2})},

(9)

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PSNR = 10 * \log_{10} \frac{M N}{\sum_{x = 1}^{M} \sum_{y = 1}^{N} {[X - Y]}^{2}},

(10)

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r = c_{1} {(n^{2})}^{c_{2}},

(11)

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k = c_{3} {(r \log (n))}^{c_{4}},

(12)

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Ting Liu, Mingjian Sun, Naizhang Feng, Minghua Wang, Deying Chen, Yi Shen, "Sparse photoacoustic microscopy based on low-rank matrix approximation," Chin. Opt. Lett. 14, 091701 (2016)

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