A NOVEL SYNERGISTIC MODEL FUSING ELECTROENCEPHALOGRAPHY AND FUNCTIONAL MAGNETIC RESONANCE IMAGING FOR MODELING BRAIN ACTIVITIES.

Michalopoulos, Konstantinos

26 August 2014

No description available.

Biomedical Research

Computer Engineering

EEG

fMRI

fusion

multimodal

Hidden Markov Models

c Partial Least Squares

Spatial Analysis of Alcohol-related Injury and Fatal Traffic Crashes in Ohio

Razzaghi, Hesham M.

24 May 2017

No description available.

Civil Engineering

Tensors: An Adaptive Approximation Algorithm, Convergence in Direction, and Connectedness Properties

McClatchey, Nathaniel J.

03 July 2018

No description available.

Mathematics

tensor

CP decomposition

alternating least squares

successive over-relaxation

global convergence

Lojasiewicz inequality

connectedness

Error Estimates for a Meshfree Method with Diffuse Derivatives and Penalty Stabilization

Osorio, Mauricio Andres

05 August 2010

No description available.

Mathematics

Meshfree methods

Meshless methods

Error Estimates

Diffuse Derivative

Diffuse Element Method

Moving Least Squares

On the Number of Integers Expressible as the Sum of Two Squares

Richardson, Robert

January 2009

No description available.

Mathematics

sum of two squares

prime number theorem

generalized Wiener-Ikehara theorem

Landau

A Novel Approach to Remove Undesired Field Perturbation Effects on Measurements Made in an Antenna Measurement Range

Goodman, Scott Alan

15 October 2015

No description available.

Electromagnetics

Electrical Engineering

Antenna Measurements

Least Squares

Antenna Simulations

Stray Signals

Least mean square algorithm implementation using the texas instrument digital signal processing board

Wang, Dongmei

January 1999

No description available.

Least Mean Square(LMS)

recursive least squares(RLS)

Reliability in constrained Gauss-Markov models: an analytical and differential approach with applications in photogrammetry

Cothren, Jackson D.

17 June 2004

No description available.

Engineering, Civil

Geodesy

photogrammetry

geodesy

least squares

network design

Gauss-Markov model

Gauss-Helmert model

Semi-parametric Bayesian Models Extending Weighted Least Squares

Wang, Zhen

31 August 2009

No description available.

Statistics

Aggregation

Convolution

Dirichlet process

Semi-parametric Bayesian model

Weighted least squares

Sufficient Dimension Reduction with Missing Data

XIA, QI

January 2017

Existing sufficient dimension reduction (SDR) methods typically consider cases with no missing data. The dissertation aims to propose methods to facilitate the SDR methods when the response can be missing. The first part of the dissertation focuses on the seminal sliced inverse regression (SIR) approach proposed by Li (1991). We show that missing responses generally affect the validity of the inverse regressions under the mechanism of missing at random. We then propose a simple and effective adjustment with inverse probability weighting that guarantees the validity of SIR. Furthermore, a marginal coordinate test is introduced for this adjusted estimator. The proposed method share the simplicity of SIR and requires the linear conditional mean assumption. The second part of the dissertation proposes two new estimating equation procedures: the complete case estimating equation approach and the inverse probability weighted estimating equation approach. The two approaches are applied to a family of dimension reduction methods, which includes ordinary least squares, principal Hessian directions, and SIR. By solving the estimating equations, the two approaches are able to avoid the common assumptions in the SDR literature, the linear conditional mean assumption, and the constant conditional variance assumption. For all the aforementioned methods, the asymptotic properties are established, and their superb finite sample performances are demonstrated through extensive numerical studies as well as a real data analysis. In addition, existing estimators of the central mean space have uneven performances across different types of link functions. To address this limitation, a new hybrid SDR estimator is proposed that successfully recovers the central mean space for a wide range of link functions. Based on the new hybrid estimator, we further study the order determination procedure and the marginal coordinate test. The superior performance of the hybrid estimator over existing methods is demonstrated in simulation studies. Note that the proposed procedures dealing with the missing response at random can be simply adapted to this hybrid method. / Statistics

Statistics

Missing at Random

Ordinary Least Squares

Principal Hessian Directions

Sliced Inverse Regression

Sufficient Dimension Reduction