Linear mixed models (LMMs) are suitable for clustered data and are common in biometrics, medicine, survey statistics and many other fields. In those applications it is essential to carry out a valid inference after selecting a subset of the available variables. We construct confidence sets for the fixed effects in Gaussian LMMs that are based on Lasso-type estimators. Aside from providing confidence regions, this also allows to quantify the joint uncertainty of both variable selection and parameter estimation in the procedure. To show that the resulting confidence sets for the fixed effects are uniformly valid over the parameter spaces of both the regression coefficients and the covariance parameters, we also prove the novel result on unifo...
This articles investigates the distribution of the solutions of the generalized linear lasso (GLL) s...
With the advancement of technology in data collection, repeated measurements with high dimensional c...
In many applications of generalized linear mixed models(GLMMs), there is a hierarchical structure i...
Diese Arbeit behandelt zwei Aspekte von Inferenz in Gemischten Modellen. Sie basiert auf Manuskripte...
The analyses of correlated, repeated measures, or multilevel data with a Gaussian response are often...
Linear mixed models describe the relationship between a response variable and some predictors for da...
The linear mixed effects model (LMM) is widely used in the analysis of clustered or longitudinal dat...
This thesis primarily focuses on the development of statistically valid tools for simultaneous and p...
Maximum likelihood estimation in logistic regression with mixed effects is known to often result in ...
The application of generalized linear mixed models presents some major challenges for both estimatio...
A linear mixed model is a useful technique to explain observations by regarding them as realizations...
Linear regression model is the classical approach to explain the relationship between the response v...
Generalized linear mixed models are a widely used tool for modeling longitudinal data. However, thei...
© 2014 Dr. David LazaridisMaximum likelihood (ML) or restricted maximum likelihood (REML) are typica...
Linear mixed models (LMM) are commonly used when observations are no longer independent of each othe...
This articles investigates the distribution of the solutions of the generalized linear lasso (GLL) s...
With the advancement of technology in data collection, repeated measurements with high dimensional c...
In many applications of generalized linear mixed models(GLMMs), there is a hierarchical structure i...
Diese Arbeit behandelt zwei Aspekte von Inferenz in Gemischten Modellen. Sie basiert auf Manuskripte...
The analyses of correlated, repeated measures, or multilevel data with a Gaussian response are often...
Linear mixed models describe the relationship between a response variable and some predictors for da...
The linear mixed effects model (LMM) is widely used in the analysis of clustered or longitudinal dat...
This thesis primarily focuses on the development of statistically valid tools for simultaneous and p...
Maximum likelihood estimation in logistic regression with mixed effects is known to often result in ...
The application of generalized linear mixed models presents some major challenges for both estimatio...
A linear mixed model is a useful technique to explain observations by regarding them as realizations...
Linear regression model is the classical approach to explain the relationship between the response v...
Generalized linear mixed models are a widely used tool for modeling longitudinal data. However, thei...
© 2014 Dr. David LazaridisMaximum likelihood (ML) or restricted maximum likelihood (REML) are typica...
Linear mixed models (LMM) are commonly used when observations are no longer independent of each othe...
This articles investigates the distribution of the solutions of the generalized linear lasso (GLL) s...
With the advancement of technology in data collection, repeated measurements with high dimensional c...
In many applications of generalized linear mixed models(GLMMs), there is a hierarchical structure i...