Riedel, Kurt S.- Magneto-Fluid Dynamics Division, Courant Institute of Mathematical Sciences, New York University

• Optimal Data-based Kernel Estimation of Evolutionary Spectra
• Hessenberg Input Normal Representations Kurt S. Riedel
• Minimum bias multiple taper spectral estimation
• SPECTRAL ESTIMATION OF PLASMA FLUCTUATIONS II: NONSTATIONARY ANALYSIS OF ELM SPECTRA
• LOW GRADE MATRICES AND MATRIX FRACTION REPRESENTATIONS
• PSEUDO-SPECTRUM OF THE RESISTIVE MAGNETO-HYDRODYNAMICS OPERATOR: RESOLVING THE RESISTIVE ALFVEN PARADOX
• Piecewise Convex Function Estimation: Pilot Estimators
• RANDOM COEFFICIENT H MODE CONFINEMENT SCALINGS
• A SHERMAN MORRISON WOODBURY IDENTITY FOR RANK AUGMENTING MATRICES WITH APPLICATION TO CENTERING
• Minimum bias multiple taper spectral estimation
• Kernel Estimation of the Instantaneous Frequency Kurt S. Riedel
• RANDOM COEFFICIENT H MODE CONFINEMENT SCALINGS
• ON DIMENSIONALLY CORRECT POWER LAW SCALING EXPRESSIONS FOR L MODE CONFINEMENT
• Fast Adaptive Identification of Stable Innovation Filters A. P. Mullhaupt and K. S. Riedel
• SMOOTHING SPLINE GROWTH CURVES WITH COVARIATES
• Kernel Estimation of the Instantaneous Frequency Kurt S. Riedel
• ON DIMENSIONALLY CORRECT POWER LAW SCALING EXPRESSIONS FOR L MODE CONFINEMENT
• EXPONENTIAL CONDITION NUMBER OF SOLUTIONS OF THE DISCRETE
• Banded Matrix Fraction Representation of Triangular Input Normal Pairs
• REFEREED PUBLICATIONS of K. S. RIEDEL 1. ``The spectrum of resistive viscous magnetohydrodynamics.'' Physics of Fluids 29, pp. 1093
• Adaptive Smoothing of the Log-Spectrum with Multiple Tapering
• REDUCTION OF RESTRICTED MAXIMUM LIKELIHOOD FOR
• PROFILE SHAPE PARAMETERIZATION OF JET ELECTRON TEMPERATURE AND DENSITY PROFILES
• A SHERMAN MORRISON WOODBURY IDENTITY FOR RANK AUGMENTING MATRICES WITH APPLICATION TO CENTERING
• FUNCTION ESTIMATION USING DATA ADAPTIVE KERNEL SMOOTHERS -HOW MUCH SMOOTHING?
• LOW GRADE MATRICES AND MATRIX FRACTION REPRESENTATIONS
• Piecewise Convex Function Estimation: Representations, Duality and Model Selection
• PIECEWISE CONVEX ESTIMATION FOR SIGNAL PROCESSING Kurt S. Riedel
• Hessenberg Input Normal Representations Kurt S. Riedel
• A HIERARCHY OF EMPIRICAL MODELS OF PLASMA PROFILES AND TRANSPORT
• Spectral Estimation of Plasma Fluctuations I: Comparison of Methods
• Fast Adaptive Identification of Stable Innovation Filters A. P. Mullhaupt and K. S. Riedel
• FUNCTION ESTIMATION USING DATA ADAPTIVE KERNEL SMOOTHERS -HOW MUCH SMOOTHING?
• Statistical Tests for Evaluating Earthquake Prediction Methods Kurt S. Riedel
• PROFILE SHAPE PARAMETERIZATION OF JET ELECTRON TEMPERATURE AND DENSITY PROFILES
• Optimal Data-based Kernel Estimation of Evolutionary Spectra
• PSEUDO-SPECTRUM OF THE RESISTIVE MAGNETO-HYDRODYNAMICS OPERATOR: RESOLVING THE RESISTIVE ALFV
• Piecewise Convex Function Estimation: Representations, Duality and Model Selection
• Spectral Estimation of Plasma Fluctuations I: Comparison of Methods
• Piecewise Convex Function Estimation: Pilot Estimators
• ORTHONORMAL REPRESENTATIONS FOR OUTPUT SYSTEM PAIRS
• Adaptive Smoothing of the Log-Spectrum with Multiple Tapering
• Optimal Estimation of Dynamically Evolving Diffusivities Kurt S. Riedel
• BLOCK DIAGONALLY DOMINANT POSITIVE DEFINITE APPROXIMATE FILTERS AND SMOOTHERS
• SMOOTHING SPLINE GROWTH CURVES WITH COVARIATES
• REDUCTION OF RESTRICTED MAXIMUM LIKELIHOOD FOR
• Statistical Tests for Evaluating Earthquake Prediction Kurt S. Riedel
• PIECEWISE CONVEX ESTIMATION FOR SIGNAL PROCESSING Kurt S. Riedel
• BLOCK DIAGONALLY DOMINANT POSITIVE DEFINITE APPROXIMATE FILTERS AND SMOOTHERS
• A HIERARCHY OF EMPIRICAL MODELS OF PLASMA PROFILES AND TRANSPORT
• SPECTRAL ESTIMATION OF PLASMA FLUCTUATIONS II: NONSTATIONARY ANALYSIS OF ELM SPECTRA
• EXPONENTIAL CONDITION NUMBER OF SOLUTIONS OF THE DISCRETE
• Optimal Estimation of Dynamically Evolving Di usivities Kurt S. Riedel