Asymptotic behavior of projection estimates on a circle

We study the asymptotic behavior of the sequence of polynomials orthogonal with respect to the discrete Sobolev inner product on the unit circle is a M\_M positive definite matrix or a positive semidefinite diagonal block matrix, M=l 1 + } } } +l m +m, d+ belongs to a certain class of measures, and

We study asymptotic properties of location estimators based on the projection depth. A rigorous proof of the limiting distribution of projection median is provided using the result of Bai and He (Ann. Statist. 27 (1999) 1616) under a general setting. The √ n rates of convergence of the trimmed mean

Let 0 [ a < b [ 2p and let D= def {e ih : h ¥ [a, b]}. We show that for generalized (non-negative) polynomials P of degree r and p > 0, we have where a 1 , a 2 , ..., a m ¥ D, c is an absolute constant (and, thus, it is independent of a, b, p, m, r, P, {a j }) and y is an explicitly determined cons

The asymptotic distribution of one-step Newton-Raphson estimates is established for a regression model with random carriers and heteroscedastic errors under mild conditions. We also include a class of robust estimates deÿned as the solution of an implicit equation, such as the MM-estimates.