Melas, Viatcheslav B.2004-12-062004-12-062004http://hdl.handle.net/2003/486910.17877/DE290R-7021This paper concerns locally optimal experimental designs for non-linear regression models. It is based on the functional approach introduced in (Melas, 1978). In this approach locally optimal design points and weights are studied as implicitly given functions of the nonlinear parameters included in the model. Representing these functions in a Taylor series enables analytical solution of the optimal design problem for many nonlinear models. A wide class of such models is here introduced. It includes, in particular,three parameters logistic distribution, hyperexponential and rational models. For these models we construct the analytical solution and use it for studying the efficiency of locally optimal designs. As a criterion of optimality the well known D-criterion is considered.enUniversitätsbibliothek Dortmundnonlinear regressionlocally optimal designsfunctional approachthree parameters logistic distributionhyperexponential modelsrational modelsD-criterionimplicit function theorem310reportexperimental designs