# Deyun Wei

Orcid: 0000-0003-0181-9264
According to our database

Collaborative distances:

^{1}, Deyun Wei authored at least 41 papers between 2009 and 2024.Collaborative distances:

## Timeline

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## Bibliography

2024

Circuits Syst. Signal Process., March, 2024

Generalized sampling of graph signals with the prior information based on graph fractional Fourier transform.

Signal Process., January, 2024

2023

Signal Process., June, 2023

Sampling of graph signals with successive aggregations based on graph fractional Fourier transform.

Digit. Signal Process., May, 2023

A secure image encryption algorithm based on hyper-chaotic and bit-level permutation.

Expert Syst. Appl., 2023

2022

IEEE Trans. Signal Process., 2022

IEEE Trans. Signal Process., 2022

Signal Process., 2022

Digit. Signal Process., 2022

New Two-Dimensional Wigner Distribution and Ambiguity Function Associated with the Two-Dimensional Nonseparable Linear Canonical Transform.

Circuits Syst. Signal Process., 2022

2021

Fast Numerical Computation of Two-Dimensional Non-Separable Linear Canonical Transform Based on Matrix Decomposition.

IEEE Trans. Signal Process., 2021

Signal Process., 2021

Double-encrypted watermarking algorithm based on cosine transform and fractional Fourier transform in invariant wavelet domain.

Inf. Sci., 2021

Digit. Signal Process., 2021

Digit. Signal Process., 2021

2020

Image watermarking based on matrix decomposition and gyrator transform in invariant integer wavelet domain.

Signal Process., 2020

Robust and reliable image copyright protection scheme using downsampling and block transform in integer wavelet domain.

Digit. Signal Process., 2020

2019

Convolution and Multichannel Sampling for the Offset Linear Canonical Transform and Their Applications.

IEEE Trans. Signal Process., 2019

Dual DCT-DWT-SVD digital watermarking algorithm based on particle swarm optimization.

Multim. Tools Appl., 2019

Lattices sampling and sampling rate conversion of multidimensional bandlimited signals in the linear canonical transform domain.

J. Frankl. Inst., 2019

2017

Time-frequency analysis method based on affine Fourier transform and Gabor transform.

IET Signal Process., 2017

Filterbank reconstruction of band-limited signals from multichannel samples associated with the LCT.

IET Signal Process., 2017

2016

Generalized Sampling Expansions with Multiple Sampling Rates for Lowpass and Bandpass Signals in the Fractional Fourier Transform Domain.

IEEE Trans. Signal Process., 2016

Image super-resolution reconstruction using the high-order derivative interpolation associated with fractional filter functions.

IET Signal Process., 2016

2015

A generalized smoothing Newton method for the symmetric cone complementarity problem.

Appl. Math. Comput., 2015

2014

Novel Tridiagonal Commuting Matrices for Types I, IV, V, VIII DCT and DST Matrices.

IEEE Signal Process. Lett., 2014

Signal Image Video Process., 2014

Image scaling algorithm using multichannel sampling in the linear canonical transform domain.

Signal Image Video Process., 2014

Similarity automorphism invariance of some P-properties of linear transformations on Euclidean Jordan algebras.

Optim. Lett., 2014

Reconstruction of multidimensional bandlimited signals from multichannel samples in linear canonical transform domain.

IET Signal Process., 2014

Solvability based on E-property for the nonlinear symmetric cone complementarity problem.

Appl. Math. Comput., 2014

2013

Signal Image Video Process., 2013

Signal Image Video Process., 2013

2012

Optim. Lett., 2012

A Convolution and Correlation Theorem for the Linear Canonical Transform and Its Application.

Circuits Syst. Signal Process., 2012

2011

A new class of complementarity functions for symmetric cone complementarity problems.

Optim. Lett., 2011

Appl. Math. Comput., 2011

2010

Reply to "Comments on 'A Convolution and Product Theorem for the Linear Canonical Transform'".

IEEE Signal Process. Lett., 2010

Generalized Sampling Expansion for Bandlimited Signals Associated With the Fractional Fourier Transform.

IEEE Signal Process. Lett., 2010

2009

IEEE Signal Process. Lett., 2009

Novel nearly tridiagonal commuting matrix and fractionalizations of generalized DFT matrix.

Proceedings of the 22nd Canadian Conference on Electrical and Computer Engineering, 2009