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ORCIDBing-Zhao Li 0001
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- affiliation: Beijing Institute of Technology, School of Mathematics and Statistics, China
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2020 – today
- 2025
[j57]Yu Zhang, Bing-Zhao Li:
Discrete linear canonical transform on graphs: Uncertainty principle and sampling. Signal Process. 226: 109668 (2025)- 2024
- [j56]Jian-Yi Chen, Bing-Zhao Li
:
Wigner distribution associated with linear canonical transform of generalized 2-D analytic signals. Digit. Signal Process. 149: 104481 (2024) - [j55]Yu Zhang, Bing-Zhao Li:
Joint time-vertex linear canonical transform. Digit. Signal Process. 155: 104728 (2024) - [j54]Saima Siddiqui, Bing-Zhao Li, Muhammad Adnan Samad:
Generalized sampling expansion for the quaternion linear canonical transform. Signal Image Video Process. 18(S1): S345-S354 (2024) - [c7]Jian-Yi Chen, Bing-Zhao Li:
Riesz Transform Associated with Linear Canonical Transform: Definition and Its Application in Envelope Detection. IVSP 2024: 135-141 - 2023
- [j53]Hui Zhao, Bing-Zhao Li:
Two-dimensional OLCT of angularly periodic functions in polar coordinates. Digit. Signal Process. 134: 103905 (2023) - [j52]Yu Zhang, Bing-Zhao Li:
Discrete linear canonical transform on graphs. Digit. Signal Process. 135: 103934 (2023) - [j51]Hui Zhao, Bing-Zhao Li:
Convolution theorems for the free metaplectic transformation and its application. J. Frankl. Inst. 360(16): 12378-12393 (2023) - [j50]Fang-Jia Yan, Bing-Zhao Li:
Spectral graph fractional Fourier transform for directed graphs and its application. Signal Process. 210: 109099 (2023) - 2022
- [j49]Wen-Biao Gao, Bing-Zhao Li:
Uncertainty Principle for the Two-Sided Quaternion Windowed Linear Canonical Transform. Circuits Syst. Signal Process. 41(3): 1324-1348 (2022) - [j48]Fang-Jia Yan, Bing-Zhao Li:
Multi-dimensional graph fractional Fourier transform and its application to data compression. Digit. Signal Process. 129: 103683 (2022) - [j47]Wen-Biao Gao, Bing-Zhao Li:
Uncertainty principles for the windowed offset linear canonical transform. Int. J. Wavelets Multiresolution Inf. Process. 20(1): 2150042:1-2150042:16 (2022) - [j46]Meng-Meng Li, Bing-Zhao Li:
A novel weighted anisotropic total variational model for image applications. Signal Image Video Process. 16(1): 211-218 (2022) - [j45]Zhen-Wei Li, Bing-Zhao Li, Min Qi:
Two-dimensional quaternion linear canonical series for color images. Signal Process. Image Commun. 101: 116574 (2022) - [j44]Qiang Feng, Liguo Han, Baozhi Pan, Bing-Zhao Li:
Microseismic Source Location Using Deep Reinforcement Learning. IEEE Trans. Geosci. Remote. Sens. 60: 1-9 (2022) - 2021
- [j43]Wen-Biao Gao, Bing-Zhao Li:
Convolution theorem involving n-dimensional windowed fractional Fourier transform. Sci. China Inf. Sci. 64(6) (2021) - [j42]Hong-Cai Xin, Bing-Zhao Li, Xia Bai:
A Novel Sub-Nyquist FRI Sampling and Reconstruction Method in Linear Canonical Transform Domain. Circuits Syst. Signal Process. 40(12): 6173-6192 (2021) - [j41]Yong Guo, Bing-Zhao Li, Lidong Yang:
Novel fractional wavelet transform: Principles, MRA and application. Digit. Signal Process. 110: 102937 (2021) - [j40]Wen-Biao Gao, Bing-Zhao Li:
Uncertainty principles for the short-time linear canonical transform of complex signals. Digit. Signal Process. 111: 102953 (2021) - [j39]Fang-Jia Yan, Bing-Zhao Li:
Windowed fractional Fourier transform on graphs: Properties and fast algorithm. Digit. Signal Process. 118: 103210 (2021) - [j38]Hong-Cai Xin, Bing-Zhao Li:
On a new Wigner-Ville distribution associated with linear canonical transform. EURASIP J. Adv. Signal Process. 2021(1): 56 (2021) - [j37]Meng-Meng Li, Bing-Zhao Li:
A novel weighted total variation model for image denoising. IET Image Process. 15(12): 2749-2760 (2021) - [j36]Wen-Biao Gao, Bing-Zhao Li:
The octonion linear canonical transform: Definition and properties. Signal Process. 188: 108233 (2021) - [j35]Zhen-Wei Li, Wen-Biao Gao, Bing-Zhao Li:
A new kind of convolution, correlation and product theorems related to quaternion linear canonical transform. Signal Image Video Process. 15(1): 103-110 (2021) - [j34]Wen-Biao Gao, Bing-Zhao Li:
Octonion Short-Time Fourier Transform for Time-Frequency Representation and Its Applications. IEEE Trans. Signal Process. 69: 6386-6398 (2021) - 2020
- [j33]Meng-Meng Li, Bing-Zhao Li:
A Novel Active Contour Model for Noisy Image Segmentation Based on Adaptive Fractional Order Differentiation. IEEE Trans. Image Process. 29: 9520-9531 (2020) - [c6]Fang-Jia Yan, Wen-Biao Gao, Bing-Zhao Li:
Windowed Fractional Fourier Transform on Graphs: Fractional Translation Operator and Hausdorff-Young Inequality. APSIPA 2020: 255-259 - [c5]Hong-Cai Xin, Bing-Zhao Li:
A novel ISAR imaging algorithm for maneuvering target based on parameter estimation method. APSIPA 2020: 260-265
2010 – 2019
- 2019
- [j32]Yan-Na Zhang, Bing-Zhao Li, Navdeep Goel, Salvador Gabarda:
Quantitative SNR analysis of QFM signals in the LPFT domain with Gaussian windows. Sci. China Inf. Sci. 62(2): 22302:1-22302:15 (2019) - [j31]Yan-Nan Sun, Bing-Zhao Li:
Digital computation of linear canonical transform for local spectra with flexible resolution ability. Sci. China Inf. Sci. 62(4): 49301:1-49301:3 (2019) - [j30]Rui-Meng Jing, Qiang Feng, Bing-Zhao Li:
Higher-Order Derivative Sampling Associated with Fractional Fourier Transform. Circuits Syst. Signal Process. 38(4): 1751-1774 (2019) - [j29]Xian Wang, Bing-Zhao Li:
A novel median filtering forensics based on principal component analysis network. Int. J. Electron. Secur. Digit. Forensics 11(2): 145-159 (2019) - [j28]Qiang Feng, Bing-Zhao Li, John Michael Rassias:
Weighted Heisenberg-Pauli-Weyl uncertainty principles for the linear canonical transform. Signal Process. 165: 209-221 (2019) - 2018
- [j27]Hong-Cai Xin, Xia Bai, Yu-E. Song, Bing-Zhao Li, Ran Tao:
ISAR imaging of target with complex motion associated with the fractional Fourier transform. Digit. Signal Process. 83: 332-345 (2018) - [j26]Yi-Ping Bao, Bing-Zhao Li:
Modelling the noise influence associated with the discrete linear canonical transform. IET Signal Process. 12(6): 756-760 (2018) - [j25]Yong Guo, Bing-Zhao Li:
The linear canonical wavelet transform on some function spaces. Int. J. Wavelets Multiresolution Inf. Process. 16(1): 1850010:1-1850010:16 (2018) - [j24]Yan-Shan Zhang, Feng Zhang, Bing-Zhao Li:
Image restoration method based on fractional variable order differential. Multidimens. Syst. Signal Process. 29(3): 999-1024 (2018) - [j23]Yan-Na Zhang, Bing-Zhao Li:
ϕ-linear canonical analytic signals. Signal Process. 143: 181-190 (2018) - [j22]Yong Guo, Bing-Zhao Li:
Novel method for parameter estimation of Newton's rings based on CFRFT and ER-WCA. Signal Process. 144: 118-126 (2018) - [j21]Yan-Nan Sun, Bing-Zhao Li:
Sliding Discrete Linear Canonical Transform. IEEE Trans. Signal Process. 66(17): 4553-4563 (2018) - [c4]Yan-Na Zhang, Bing-Zhao Li:
Generalized Uncertainty Principles for the Two-Sided Quaternion Linear Canonical Transform. ICASSP 2018: 4594-4598 - 2017
- [j20]Yong Guo, Bing-Zhao Li, Navdeep Goel:
Optimised blind image watermarking method based on firefly algorithm in DWT-QR transform domain. IET Image Process. 11(6): 406-415 (2017) - [c3]Yi-Ping Bao, Yan-Na Zhang, Yu-E. Song, Bing-Zhao Li, Pei Dang:
Nonuniform sampling theorems for random signals in the offset linear canonical transform domain. APSIPA 2017: 94-99 - [c2]Yi-Qian Wang, Bing-Zhao Li, Qi-Yuan Cheng:
The fractional Fourier transform on graphs. APSIPA 2017: 105-110 - 2016
- [j19]Bing-Zhao Li, Yan-Li Zhang, Xian Wang, Qi-Yuan Cheng:
A New Method for Chebyshev Polynomial Interpolation Based on Cosine Transforms. Circuits Syst. Signal Process. 35(2): 719-729 (2016) - [j18]Yu-Jing Cao, Bing-Zhao Li, Yong-Gang Li, Yi-Hong Chen:
Logarithmic Uncertainty Relations for Odd or Even Signals Associate with Wigner-Ville Distribution. Circuits Syst. Signal Process. 35(7): 2471-2486 (2016) - [j17]Yong Guo, Bing-Zhao Li:
Blind image watermarking method based on linear canonical wavelet transform and QR decomposition. IET Image Process. 10(10): 773-786 (2016) - [j16]Qiang Feng, Bing-Zhao Li:
Convolution and correlation theorems for the two-dimensional linear canonical transform and its applications. IET Signal Process. 10(2): 125-132 (2016) - [j15]Min Qi, Bing-Zhao Li, Huafei Sun:
Image representation by harmonic transforms with parameters in SL(2, R). J. Vis. Commun. Image Represent. 35: 184-192 (2016) - 2015
- [j14]Min Qi, Bing-Zhao Li, Huafei Sun:
Image watermarking via fractional polar harmonic transforms. J. Electronic Imaging 24(1): 013004 (2015) - [j13]Min Qi, Bing-Zhao Li, Huafei Sun:
Image watermarking using polar harmonic transform with parameters in SL(2, r). Signal Process. Image Commun. 31: 161-173 (2015) - 2013
- [j12]Wei Qiu, Bing-Zhao Li, Xue-Wen Li:
Speech recovery based on the linear canonical transform. Speech Commun. 55(1): 40-50 (2013) - 2012
- [j11]Tian-Wen Che, Bing-Zhao Li, Tian-Zhou Xu:
The Ambiguity Function Associated with the Linear Canonical Transform. EURASIP J. Adv. Signal Process. 2012: 138 (2012) - [j10]M. Zhu, Bing-Zhao Li, G.-F. Yan:
Aliased polyphase sampling associated with the linear canonical transform. IET Signal Process. 6(6): 594-599 (2012) - [j9]Bing-Zhao Li, Tian-Zhou Xu:
Parseval Relationship of Samples in the Fractional Fourier Transform Domain. J. Appl. Math. 2012: 428142:1-428142:11 (2012) - [j8]Rui-Feng Bai, Bing-Zhao Li, Qi-Yuan Cheng:
Wigner-Ville Distribution Associated with the Linear Canonical Transform. J. Appl. Math. 2012: 740161:1-740161:14 (2012) - [j7]Xiaona Xu, Bing-Zhao Li, Xiuling Ma:
Instantaneous frequency estimation based on the linear canonical transform. J. Frankl. Inst. 349(10): 3185-3193 (2012) - [j6]Cui-Ping Li, Bing-Zhao Li, Tian-Zhou Xu:
Approximating bandlimited signals associated with the LCT domain from nonuniform samples at unknown locations. Signal Process. 92(7): 1658-1664 (2012)
2000 – 2009
- 2009
- [j5]Yue Wang, Ran Tao, Bing-Zhao Li:
Using the multi-living agent concept to investigate complex information systems. Sci. China Ser. F Inf. Sci. 52(1): 1-17 (2009) - [j4]Bing-Zhao Li, Ran Tao, Tian-Zhou Xu, Yue Wang:
The Poisson sum formulae associated with the fractional Fourier transform. Signal Process. 89(5): 851-856 (2009) - 2008
- [j3]Ran Tao, Bing-Zhao Li, Yue Wang, George Kwamina Aggrey:
On Sampling of Band-Limited Signals Associated With the Linear Canonical Transform. IEEE Trans. Signal Process. 56(11): 5454-5464 (2008) - 2007
- [j2]Bing-Zhao Li, Ran Tao, Yue Wang:
New sampling formulae related to linear canonical transform. Signal Process. 87(5): 983-990 (2007) - [j1]Ran Tao, Bing-Zhao Li, Yue Wang:
Spectral Analysis and Reconstruction for Periodic Nonuniformly Sampled Signals in Fractional Fourier Domain. IEEE Trans. Signal Process. 55(7-1): 3541-3547 (2007) - 2006
- [c1]Bing-Zhao Li, Ran Tao, Yue Wang:
Interpolation of Discrete Chirp-periodic Signals Based on Fractional Fourier Transform. ICICIC (3) 2006: 2-5
Coauthor Index
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