Yeon Ju Lee

Orcid: 0000-0002-5418-1359

According to our database1, Yeon Ju Lee authored at least 21 papers between 2006 and 2026.

Collaborative distances:
  • Dijkstra number2 of five.
  • Erdős number3 of four.

Timeline

Legend:

Book  In proceedings  Article  PhD thesis  Dataset  Other 

Links

Online presence:

On csauthors.net:

Bibliography

2026
RBF-Solver: A Multistep Sampler for Diffusion Probabilistic Models via Radial Basis Functions.
CoRR, March, 2026

Dual-Solver: A Generalized ODE Solver for Diffusion Models with Dual Prediction.
CoRR, March, 2026

2023
SVD-Based Graph Fourier Transforms on Directed Product Graphs.
IEEE Trans. Signal Inf. Process. over Networks, 2023

2020
Joint Demosaicing and Denoising Based on Interchannel Nonlocal Mean Weighted Moving Least Squares Method.
Sensors, 2020

2017
A Feasibility Study of Low-Dose Single-Scan Dual-Energy Cone-Beam CT in Many-View Under-Sampling Framework.
IEEE Trans. Medical Imaging, 2017

Auto-focused panoramic dental tomosynthesis imaging with exponential polynomial based sharpness indicators.
Proceedings of the Medical Imaging 2017: Image Processing, 2017

2016
On multivariate discrete least squares.
J. Approx. Theory, 2016

2015
Image zooming method using edge-directed moving least squares interpolation based on exponential polynomials.
Appl. Math. Comput., 2015

2014
A Framework for Moving Least Squares Method with Total Variation Minimizing Regularization.
J. Math. Imaging Vis., 2014

2013
Modified Essentially Nonoscillatory Schemes Based on Exponential Polynomial Interpolation for Hyperbolic Conservation Laws.
SIAM J. Numer. Anal., 2013

An improved weighted essentially non-oscillatory scheme with a new smoothness indicator.
J. Comput. Phys., 2013

On collocation matrices for interpolation and approximation.
J. Approx. Theory, 2013

Exponential polynomial reproducing property of non-stationary symmetric subdivision schemes and normalized exponential B-splines.
Adv. Comput. Math., 2013

2011
Some issues on interpolation matrices of locally scaled radial basis functions.
Appl. Math. Comput., 2011

2010
Nonlinear Image Upsampling Method Based on Radial Basis Function Interpolation.
IEEE Trans. Image Process., 2010

Analysis of stationary subdivision schemes for curve design based on radial basis function interpolation.
Appl. Math. Comput., 2010

Quasi-interpolatory refinable functions and construction of biorthogonal wavelet systems.
Adv. Comput. Math., 2010

2007
Convergence of Increasingly Flat Radial Basis Interpolants to Polynomial Interpolants.
SIAM J. Math. Anal., 2007

2006
Stationary subdivision schemes reproducing polynomials.
Comput. Aided Geom. Des., 2006

Stationary binary subdivision schemes using radial basis function interpolation.
Adv. Comput. Math., 2006

A New Class of Non-stationary Interpolatory Subdivision Schemes Based on Exponential Polynomials.
Proceedings of the Geometric Modeling and Processing, 2006


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