Your search keyword '"Guilherme Ludwig"' showing total 3 results

1. On spline-based approaches to spatial linear regression for geostatistical data

Author

Perla E. Reyes, Jun Zhu, Chun Shu Chen, Shawn P. Conley, and Guilherme Ludwig

Subjects

Statistics and Probability, Statistics::Theory, Estimator, 010501 environmental sciences, Covariance, 01 natural sciences, 010104 statistics & probability, Spline (mathematics), Linear regression, Statistics, Statistics::Methodology, Spatial variability, 0101 mathematics, Statistics, Probability and Uncertainty, Spatial dependence, Spatial analysis, 0105 earth and related environmental sciences, General Environmental Science, Mathematics, Parametric statistics

Abstract

For spatial linear regression, the traditional approach to capture spatial dependence is to use a parametric linear mixed-effects model. Spline surfaces can be used as an alternative to capture spatial variability, giving rise to a semiparametric method that does not require the specification of a parametric covariance structure. The spline component in such a semiparametric method, however, impacts the estimation of the regression coefficients. In this paper, we investigate such an impact in spatial linear regression with spline-based spatial effects. Statistical properties of the regression coefficient estimators are established under the model assumptions of the traditional spatial linear regression. Further, we examine the empirical properties of the regression coefficient estimators under spatial confounding via a simulation study. A data example in precision agriculture research regarding soybean yield in relation to field conditions is presented for illustration.

Published

2020

2. On fixed effects estimation in spline-based semiparametric regression for spatial data

Author

Chun Shu Chen, Guilherme Ludwig, and Jun Zhu

Subjects

Spline (mathematics), Spatial interaction, Statistics, Econometrics, General Medicine, Semiparametric regression, Spatial analysis, Mathematics, Semiparametric model

Published

2015

3. Aggregated functional data model for Near-Infrared Spectroscopy calibration and prediction

Author

Marley A. Saraiva, Ronaldo Dias, Nancy L. Garcia, and Guilherme Ludwig

Subjects

Statistics and Probability, FOS: Computer and information sciences, Primary: 62G08, Secondary: 92E99, Basis (linear algebra), Calibration (statistics), Gaussian, Near-infrared spectroscopy, Methodology (stat.ME), symbols.namesake, Smoothing spline, Statistics, symbols, Statistics, Probability and Uncertainty, Linear combination, Biological system, Jackknife resampling, Statistics - Methodology, Smoothing, Mathematics

Abstract

Calibration and prediction for NIR spectroscopy data are performed based on a functional interpretation of the Beer-Lambert formula. Considering that, for each chemical sample, the resulting spectrum is a continuous curve obtained as the summation of overlapped absorption spectra from each analyte plus a Gaussian error, we assume that each individual spectrum can be expanded as a linear combination of B-splines basis. Calibration is then performed using two procedures for estimating the individual analytes curves: basis smoothing and smoothing splines. Prediction is done by minimizing the square error of prediction. To assess the variance of the predicted values, we use a leave-one-out jackknife technique. Departures from the standard error models are discussed through a simulation study, in particular, how correlated errors impact on the calibration step and consequently on the analytes' concentration prediction. Finally, the performance of our methodology is demonstrated through the analysis of two publicly available datasets., Comment: 27 pages, 7 figures, 7 tables

Published

2013