Adaptive Gaussian radial basis function methods for initial value problems: Construction and comparison with adaptive multiquadric radial basis function methods. | 0 | 0.34 | 2021 |
Topological Data Analysis of Vascular Disease: A Theoretical Framework. | 0 | 0.34 | 2020 |
Adaptive Radial Basis Function Methods for Initial Value Problems. | 0 | 0.34 | 2020 |
The exact formula of the optimal penalty parameter value of the spectral penalty method for differential equations. | 0 | 0.34 | 2020 |
Finite Fourier Frame Approximation Using the Inverse Polynomial Reconstruction Method. | 1 | 0.36 | 2018 |
A Domain Decomposition Fourier Continuation Method for Enhanced L1 Regularization Using Sparsity of Edges in Reconstructing Fourier Data. | 0 | 0.34 | 2018 |
A Note on High-Precision Approximation of Asymptotically Decaying Solution and Orthogonal Decomposition. | 0 | 0.34 | 2018 |
A rapid interpolation method of finding vascular CFD solutions with spectral collocation methods. | 2 | 0.41 | 2013 |
A quantitative study of the nonlinear Schrödinger equation with singular potential of any derivative orders. | 0 | 0.34 | 2013 |
Efficient determination of the critical parameters and the statistical quantities for Klein-Gordon and sine-Gordon equations with a singular potential using generalized polynomial chaos methods. | 1 | 0.43 | 2013 |
Matrix Stability of Multiquadric Radial Basis Function Methods for Hyperbolic Equations with Uniform Centers | 3 | 0.43 | 2012 |
A Simple Regularization of the Polynomial Interpolation for the Resolution of the Runge Phenomenon | 4 | 0.52 | 2011 |
Recovery of High Order Accuracy in Radial Basis Function Approximations of Discontinuous Problems | 4 | 0.46 | 2010 |
A 1.3-GHz 350-mW Hybrid Direct Digital Frequency Synthesizer in 90-nm CMOS | 12 | 0.96 | 2010 |
Microfluidic system for the synthesis of functional materials | 0 | 0.34 | 2010 |
A Note on the Spectral Collocation Approximation of Some Differential Equations with Singular Source Terms | 4 | 0.57 | 2009 |
On the numerical convergence with the inverse polynomial reconstruction method for the resolution of the Gibbs phenomenon | 12 | 0.98 | 2007 |
Inverse Polynomial Reconstruction of Two Dimensional Fourier Images | 10 | 1.17 | 2005 |