D-optimal designs for polynomial regression with weight function exp(alpha x)

Wang, Sheng-Shian

25 June 2007

Weighted polynomial regression of degree d with weight function Exp(£\ x) on an interval is considered. The D-optimal designs £i_d^* are completely characterized via three differential equations. Some invariant properties of £i_d^* under affine transformation are derived. The design £i_d^* as d goes to 1, is shown to converge weakly to the arcsin distribution. Comparisons of £i_d^* with the arcsin distribution are also made.

Squeeze Theorem

Legendre polynomial

Laguerre polynomial

D-Equivalence Theorem

asymptotic design

arcsin distribution

D-optimal design

An Arcsin Limit Theorem of Minimally-Supported D-Optimal Designs for Weighted Polynomial Regression

Lin, Yung-chia

23 June 2008

Consider the minimally-supported D-optimal designs for dth degree polynomial regression with bounded and positive weight function on a compact interval. We show that the optimal design converges weakly to the arcsin distribution as d goes to infinity. Comparisons of the optimal design with the arcsin distribution and D-optimal arcsin support design by D-efficiencies are also given. We also show that if the design interval is [−1, 1], then the minimally-supported D-optimal design converges to the D-optimal arcsin support design with the specific weight function 1/¡Ô(£\-x^2), £\>1, as £\¡÷1+.

asymptotic design

arcsin distribution

D-Equivalence Theorem

Chebyshev polynomial of second kind

D-optimal arcsin support design

minimally-supported D-optimal design

Squeeze Theorem

D-efficiency

Legendre polynomial