Yeon Ju Lee

Orcid: 0000-0002-5418-1359

According to our database¹, Yeon Ju Lee authored at least 19 papers between 2006 and 2023.

Collaborative distances:

Dijkstra number² of five.
Erdős number³ of four.

Timeline

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PhD thesis

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Bibliography

2023

SVD-Based Graph Fourier Transforms on Directed Product Graphs.

[BibT_eX]

[DOI]

IEEE Trans. Signal Inf. Process. over Networks, 2023

2020

Joint Demosaicing and Denoising Based on Interchannel Nonlocal Mean Weighted Moving Least Squares Method.

[BibT_eX]

[DOI]

Sensors, 2020

2017

A Feasibility Study of Low-Dose Single-Scan Dual-Energy Cone-Beam CT in Many-View Under-Sampling Framework.

[BibT_eX]

[DOI]

IEEE Trans. Medical Imaging, 2017

Auto-focused panoramic dental tomosynthesis imaging with exponential polynomial based sharpness indicators.

[BibT_eX]

[DOI]

Taewon Lee

Yeon Ju Lee

Seungryong Cho

Proceedings of the Medical Imaging 2017: Image Processing, 2017

2016

On multivariate discrete least squares.

[BibT_eX]

[DOI]

Yeon Ju Lee

Charles A. Micchelli

Jungho Yoon

J. Approx. Theory, 2016

2015

Image zooming method using edge-directed moving least squares interpolation based on exponential polynomials.

[BibT_eX]

[DOI]

Yeon Ju Lee

Jungho Yoon

Appl. Math. Comput., 2015

2014

A Framework for Moving Least Squares Method with Total Variation Minimizing Regularization.

[BibT_eX]

[DOI]

Yeon Ju Lee

Sukho Lee

Jungho Yoon

J. Math. Imaging Vis., 2014

2013

Modified Essentially Nonoscillatory Schemes Based on Exponential Polynomial Interpolation for Hyperbolic Conservation Laws.

[BibT_eX]

[DOI]

Youngsoo Ha

Yeon Ju Lee

Jungho Yoon

SIAM J. Numer. Anal., 2013

An improved weighted essentially non-oscillatory scheme with a new smoothness indicator.

[BibT_eX]

[DOI]

J. Comput. Phys., 2013

On collocation matrices for interpolation and approximation.

[BibT_eX]

[DOI]

Yeon Ju Lee

Charles A. Micchelli

J. Approx. Theory, 2013

Exponential polynomial reproducing property of non-stationary symmetric subdivision schemes and normalized exponential B-splines.

[BibT_eX]

[DOI]

Adv. Comput. Math., 2013

2011

Some issues on interpolation matrices of locally scaled radial basis functions.

[BibT_eX]

[DOI]

Appl. Math. Comput., 2011

2010

Nonlinear Image Upsampling Method Based on Radial Basis Function Interpolation.

[BibT_eX]

[DOI]

Yeon Ju Lee

Jungho Yoon

IEEE Trans. Image Process., 2010

Analysis of stationary subdivision schemes for curve design based on radial basis function interpolation.

[BibT_eX]

[DOI]

Yeon Ju Lee

Jungho Yoon

Appl. Math. Comput., 2010

Quasi-interpolatory refinable functions and construction of biorthogonal wavelet systems.

[BibT_eX]

[DOI]

Adv. Comput. Math., 2010

2007

Convergence of Increasingly Flat Radial Basis Interpolants to Polynomial Interpolants.

[BibT_eX]

[DOI]

Yeon Ju Lee

Gang Joon Yoon

Jungho Yoon

SIAM J. Math. Anal., 2007

2006

Stationary subdivision schemes reproducing polynomials.

[BibT_eX]

[DOI]

Comput. Aided Geom. Des., 2006

Stationary binary subdivision schemes using radial basis function interpolation.

[BibT_eX]

[DOI]

Byung-Gook Lee

Yeon Ju Lee

Jungho Yoon

Adv. Comput. Math., 2006

A New Class of Non-stationary Interpolatory Subdivision Schemes Based on Exponential Polynomials.

[BibT_eX]

[DOI]

Proceedings of the Geometric Modeling and Processing, 2006

Yeon Ju Lee

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