We consider maximin and Bayesian D-optimal designs for nonlinear regression models. The maximin criterion requires the specification of a region for the nonlinear parameters in the model, while the Bayesian optimality criterion assumes that a prior distribution for these parameters is available. It was observed empirically by many authors that an increase of uncertainty in the prior information (i.e. a larger range for the parameter space in the maximin criterion or a larger variance of the prior distribution in the Bayesian criterion) yields a larger number of support points of the corresponding optimal designs. In this paper we present a rigorous proof of this phenomenon and show that in many nonlinear regression models the number of supp...
Alphabetic optimal design theory assumes that the model for which the optimal design is derived is u...
Bayesian optimal designs for estimation and prediction in linear regression models are considered. F...
For the compartmental model we determine optimal designs, which are robust against misspecifications...
We consider maximin and Bayesian D -optimal designs for nonlinear regression models. The maximin cri...
We consider maximin and Bayesian D-optimal designs for nonlinear regression models. The maximin crit...
Finding optimal designs for experiments for non-linear models and dependent data is a challenging ta...
This paper concerns locally optimal experimental designs for non-linear regression models. It is bas...
For the binary response model, we determine optimal designs based on the D-optimal criterion which a...
We propose a new approach for identifying the support points of a locally optimal design when the mo...
For many problems of statistical inference in regression modelling, the Fisher informa-tion matrix d...
The problem of constructing standardized maximin D-optimal designs for weighted polynomial regressio...
DOI: 10.1214/07-AOS560We propose a new approach for identifying the support points of a locally opti...
Most of the design work has focused on the linear regression model due to its simplicity. However, a...
For Bayesian D-optimal design, we define a singular prior distribution to be a prior distribution su...
The celebrated de la Garza phenomenon states that for a polynomial regression model of degree p-1 a...
Alphabetic optimal design theory assumes that the model for which the optimal design is derived is u...
Bayesian optimal designs for estimation and prediction in linear regression models are considered. F...
For the compartmental model we determine optimal designs, which are robust against misspecifications...
We consider maximin and Bayesian D -optimal designs for nonlinear regression models. The maximin cri...
We consider maximin and Bayesian D-optimal designs for nonlinear regression models. The maximin crit...
Finding optimal designs for experiments for non-linear models and dependent data is a challenging ta...
This paper concerns locally optimal experimental designs for non-linear regression models. It is bas...
For the binary response model, we determine optimal designs based on the D-optimal criterion which a...
We propose a new approach for identifying the support points of a locally optimal design when the mo...
For many problems of statistical inference in regression modelling, the Fisher informa-tion matrix d...
The problem of constructing standardized maximin D-optimal designs for weighted polynomial regressio...
DOI: 10.1214/07-AOS560We propose a new approach for identifying the support points of a locally opti...
Most of the design work has focused on the linear regression model due to its simplicity. However, a...
For Bayesian D-optimal design, we define a singular prior distribution to be a prior distribution su...
The celebrated de la Garza phenomenon states that for a polynomial regression model of degree p-1 a...
Alphabetic optimal design theory assumes that the model for which the optimal design is derived is u...
Bayesian optimal designs for estimation and prediction in linear regression models are considered. F...
For the compartmental model we determine optimal designs, which are robust against misspecifications...
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