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Kaneko, Hideaki - Department of Mathematics and Statistics, Old Dominion University
Superconvergence of the Iterated Degenerate Kernel Hideaki Kaneko
Acceleration Techniques by Post-Processing of Numerical Solutions of Hammerstein Equation
Journal of Computational and Applied Mathematics 234 (2010) 14661472 Contents lists available at ScienceDirect
International Journal of Numerical Methods and Applications Volume 1, Number 2, 2009, Pages 139-153
Numerical experiments using hierarchical finite element method for nonlinear heat conduction in plates
This article was originally published in a journal published by Elsevier, and the attached copy is provided by Elsevier for the
Singularity Preserving Galerkin Method For Hammerstein Equations With Logarithmic Kernel
Superconvergence of the Iterated Galerkin Methods for Hammerstein Equations
Characterizations of Fixed Points of MultiValued Maps by Metric Projections
ON A VARIATIONAL PRINCIPLE OF EKELAND Peter Z. Daffer
ON A CONJECTURE OF S. REICH Peter Z. Daffer
Wavelets Application to the Petrov-Galerkin Method for Hammerstein Equations
ON A CONJECTURE OF S. REICH Peter Z. Da#er
This article was originally published in a journal published by Elsevier, and the attached copy is provided by Elsevier for the
VARIATIONAL PRINCIPLE AND FIXED POINTS Peter Z. Daffer
Superconvergence of the Iterated Degenerate Kernel Hideaki Kaneko #
A Note on the Use of Residual as an Error Estimator for Hammerstein Equations
A Note on the Finite Element Method with Singular Basis Functions
Superconvergence of the Iterated Collocation Methods for Hammerstein Equations
Superconvergence of the Iterated Galerkin Methods for Hammerstein Equations
Scientiae Mathematicae Japonicae 1 Taylor-series Expansion Method for Volterra Integral Equations of the Second Kind
Numerical solutions of Hammerstein H. Kaneko & R. D. Noren
Wavelets Application to the PetrovGalerkin Method for Hammerstein Equations
Superconvergence of the Iterated Collocation Methods for Hammerstein Equations
ON A VARIATIONAL PRINCIPLE OF EKELAND Peter Z. Da#er
VARIATIONAL PRINCIPLE AND FIXED POINTS Peter Z. Daffer
ON A CONJECTURE OF S. REICH Peter Z. Daffer
VARIATIONAL PRINCIPLE AND FIXED POINTS Peter Z. Da#er
Singularity Preserving Galerkin Method For Hammerstein Equations With Logarithmic Kernel
Characterizations of Fixed Points of Multi-Valued Maps by Metric Projections
A Construction of Wavelets Peter Z. Da#er
Numerical solutions of Hammerstein H. Kaneko & R. D. Noren
COMMUNICATIONS ON Website: http://AIMsciences.org PURE AND APPLIED ANALYSIS
A Construction of Wavelets Peter Z. Daffer
ON A VARIATIONAL PRINCIPLE OF EKELAND Peter Z. Daffer
Superconvergence of the Iterated Degenerate Kernel Method
Superconvergence of the Iterated Collocation Methods for Hammerstein Equations
A Note on the Use of Residual as an Error Estimator for Hammerstein Equations
A Note on the Finite Element Method with Singular Basis Functions
Superconvergence of the Iterated Galerkin Methods for Hammerstein Equations
A Note on the Use of Residual as an Error Estimator for Hammerstein Equations
Singularity Preserving Galerkin Method For Hammerstein Equations With Logarithmic Kernel
Wavelets Application to the Petrov-Galerkin Method for Hammerstein Equations
A Note on the Finite Element Method with Singular Basis Functions
Characterizations of Fixed Points of Multi-Valued Maps by Metric Projections
Numerical solutions of Hammerstein H. Kaneko & R. D. Noren
WAVELET COLLOCATION METHOD AND MULTILEVEL AUGMENTATION METHOD FOR HAMMERSTEIN EQUATIONS
Taylor-series expansion methods for nonlinear Hammerstein equations