2 resultados para Extremal polynomial ultraspherical polynomials
em Duke University
Resumo:
We present a theory of hypoellipticity and unique ergodicity for semilinear parabolic stochastic PDEs with "polynomial" nonlinearities and additive noise, considered as abstract evolution equations in some Hilbert space. It is shown that if Hörmander's bracket condition holds at every point of this Hilbert space, then a lower bound on the Malliavin covariance operatorμt can be obtained. Informally, this bound can be read as "Fix any finite-dimensional projection on a subspace of sufficiently regular functions. Then the eigenfunctions of μt with small eigenvalues have only a very small component in the image of Π." We also show how to use a priori bounds on the solutions to the equation to obtain good control on the dependency of the bounds on the Malliavin matrix on the initial condition. These bounds are sufficient in many cases to obtain the asymptotic strong Feller property introduced in [HM06]. One of the main novel technical tools is an almost sure bound from below on the size of "Wiener polynomials," where the coefficients are possibly non-adapted stochastic processes satisfying a Lips chitz condition. By exploiting the polynomial structure of the equations, this result can be used to replace Norris' lemma, which is unavailable in the present context. We conclude by showing that the two-dimensional stochastic Navier-Stokes equations and a large class of reaction-diffusion equations fit the framework of our theory.
Resumo:
Extremal quantile index is a concept that the quantile index will drift to zero (or one)
as the sample size increases. The three chapters of my dissertation consists of three
applications of this concept in three distinct econometric problems. In Chapter 2, I
use the concept of extremal quantile index to derive new asymptotic properties and
inference method for quantile treatment effect estimators when the quantile index
of interest is close to zero. In Chapter 3, I rely on the concept of extremal quantile
index to achieve identification at infinity of the sample selection models and propose
a new inference method. Last, in Chapter 4, I use the concept of extremal quantile
index to define an asymptotic trimming scheme which can be used to control the
convergence rate of the estimator of the intercept of binary response models.
