Application of regularizing operators in estimation theory

On nested fractals a "Laplacian" can be constructed as a scaled limit of difference operators. The appropriate scaling and starting configuration are given by a nonlinear, finite dimensional eigenvalue problem. We study it as a fixed point problem using Hilbert's projective metric on cones, a nonlin

Techniques of dimensional regularization are discussed in the context of scalar field theory. After reviewing the method and its connection with the renormalization group, we present explicit forms for the relationship between bare and renormalized composite operators of low dimensionality. These re

## Abstract Given graphs __G__ and __H__, an edge coloring of __G__ is called an (__H__,__q__)‐coloring if the edges of every copy of __H__ ⊂ __G__ together receive at least __q__ colors. Let __r__(__G__,__H__,__q__) denote the minimum number of colors in a (__H__,__q__)‐coloring of __G__. In 9 Erd

In this paper, we study the consistency of the regularized least-square regression in a general reproducing kernel Hilbert space. We characterize the compactness of the inclusion map from a reproducing kernel Hilbert space to the space of continuous functions and show that the capacity-based analysi