On Weak Convergence of Hypermeasures

## Abstract Let {__X~n~__, __n__ ⩾ 1) be a sequence of independent random variables such that __EX~n~__ = __a~n~__, __E__(__X~n~__ − __a~n~__)^2^ = σ, __n__ ⩾ 1. Let {__N~n~, n__ ⩾ 1} be a sequence of positive integer‐valued random variables. Let us put In this paper we present necessary and suffi

The aim of this paper is to establish the semilocal convergence analysis of Stirling's method used to find fixed points of nonlinear operator equations in Banach spaces. This is done by using recurrence relations under weak Hölder continuity condition on the first Fréchet derivative of the involved

Let [X n , n 1] be a sequence of stationary negatively associated random variables, Under some suitable conditions, the central limit theorem and the weak convergence for sums are investigated. Applications to limiting distributions of estimators of Var S n are also discussed.

In order to describe L 2 -convergence rates slower than exponential, the weak Poincare inequality is introduced. It is shown that the convergence rate of a Markov semigroup and the corresponding weak Poincare inequality can be determined by each other. Conditions for the weak Poincare inequality to