On the normalizing multiplier of the generalized Jackson kernel

This paper presents and studies Fredholm integral equations associated with the linear Riemann-Hilbert problems on multiply connected regions with smooth boundary curves. The kernel of these integral equations is the generalized Neumann kernel. The approach is similar to that for simply connected re

Let k be the reproducing kernel for a Hilbert space HðkÞ of analytic functions on B d , the open unit ball in C d , d51. k is called a complete NP kernel if k 0 1 and if 1 À 1=k l ðzÞ is positive definite on B d  B d . Let D be a separable Hilbert space, and consider HðkÞ D ffi Hðk; DÞ, and think o

The estimation of integrated density derivatives is a crucial problem which arises in data-based methods for choosing the bandwidth of kernel and histogram estimators. In this paper, we establish the asymptotic normality of a multistage kernel estimator of such quantities, by showing that under some

Let \(p\) be an odd prime number and let \(F\) be a number field not containing a primitive \(p\) th root of unity \(\zeta_{p}\). In this paper we show that if \(\left.p\right\}[F: \mathbb{Q}] \cdot \operatorname{disc}(F)\) then the \(p\)-primary part of \(K_{2}\left(C_{F}[1 / p]\right)\) is generat