Add to ORKGWe give a new characterization of Elfving’s (1952) method for computing c-optimal de-signs in k dimensions which gives explicit formulae for the k unknown optimal weights and k unknown signs in Elfving’s characterization. This eliminates the need to search over these parameters to compute c-optimal designs, and thus reduces the computational burden from solving a family of optimization problems to solving a single optimization problem for the optimal finite support set. We give two illustrative examples: a high dimensional polynomial regression model and a logistic regression model, the latter showing that the method can be used for locally optimal designs in nonlinear models as well.
Exact and approximate d-optimal designs in polynomial regression. - In: Metrika. 42. 1995. S. 19-2
Not AvailableIn the present study, the class of nonlinear models, with intrinsically linearly relate...
Approximate and exact designs, Legendre polynomials, Lagrange interpolation polynomials, Hermite int...
The theorem of Elfving is one of the most important and earliest results which have led to the theor...
We study locally D-optimal designs for some exponential models that are frequently used in the biolo...
Abstract We study the D-optimal design problem for the common weighted univariate polynomial regress...
In this paper we discuss a class of multiplicative algorithms for computing D-optimal designs for re...
By utilizing the equivalence theorem and Descartes's rule of signs, we construct D-optimal designs f...
This book considers various extensions of the topics treated in the first volume of this series, in ...
c-optimal design problems for weighted polynomial models are discussed. Vectors c, where c-optimal d...
The paper is devoted to the study of homothety’s influence on the number of optimal design support p...
AbstractThe existence theorem of D-optimal designs and an explicit formula to lind D-optimal designs...
The behaviour of D-optimal exact designs, constructed using a combinatorial algorithm, is examined u...
We consider, in the modern setting of high-dimensional statistics, the classic problem of optimizing...
This paper considers exponential and rational regression models that are nonlinear in some parameter...
Exact and approximate d-optimal designs in polynomial regression. - In: Metrika. 42. 1995. S. 19-2
Not AvailableIn the present study, the class of nonlinear models, with intrinsically linearly relate...
Approximate and exact designs, Legendre polynomials, Lagrange interpolation polynomials, Hermite int...
The theorem of Elfving is one of the most important and earliest results which have led to the theor...
We study locally D-optimal designs for some exponential models that are frequently used in the biolo...
Abstract We study the D-optimal design problem for the common weighted univariate polynomial regress...
In this paper we discuss a class of multiplicative algorithms for computing D-optimal designs for re...
By utilizing the equivalence theorem and Descartes's rule of signs, we construct D-optimal designs f...
This book considers various extensions of the topics treated in the first volume of this series, in ...
c-optimal design problems for weighted polynomial models are discussed. Vectors c, where c-optimal d...
The paper is devoted to the study of homothety’s influence on the number of optimal design support p...
AbstractThe existence theorem of D-optimal designs and an explicit formula to lind D-optimal designs...
The behaviour of D-optimal exact designs, constructed using a combinatorial algorithm, is examined u...
We consider, in the modern setting of high-dimensional statistics, the classic problem of optimizing...
This paper considers exponential and rational regression models that are nonlinear in some parameter...
Exact and approximate d-optimal designs in polynomial regression. - In: Metrika. 42. 1995. S. 19-2
Not AvailableIn the present study, the class of nonlinear models, with intrinsically linearly relate...
Approximate and exact designs, Legendre polynomials, Lagrange interpolation polynomials, Hermite int...