In a companion paper (see Self-Similarity: Part I—Splines and Operators), we characterized the class of scale-invariant convolution operators: the generalized fractional derivatives of order. We used these operators to specify regularization functionals for a series of Tikhonov-like least-squares data fitting problems and proved that the general solution is a fractional spline of twice the order. We investigated the deterministic properties of these smoothing splines and proposed a fast Fourier transform (FFT)-based implementation. Here, we present an alternative stochastic formulation to further justify these fractional spline estimators. As suggested by the title, the relevant processes are those that are statistically self-similar; that ...
AbstractIn this paper, a class of Gaussian processes, having locally the same fractal properties as ...
<p>Representation of the continuum of fractal processes, with: the two families of fractional Gaussi...
In studying the scale invariance of an empirical time series a twofold problem arises: it is necessa...
The central theme of this pair of papers (Parts I and II in this issue) is self-similarity, which is...
Self-similarity, fractal behaviour and long-range dependence are observed in various branches of phy...
Our aim is to propose a multi-dimensional operator framework that provides a bridge between approxim...
Abstract—We consider the reconstruction of multi-dimensional signals from noisy samples. The problem...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Self-similar stochastic processes are used for stochastic modeling whenever it is expected that long...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
AbstractFractal Gaussian models have been widely used to represent the singular behavior of phenomen...
Abstract-The fractional Brownian motion (fBm) model has proven to be valuable in modeling many natur...
In this contribution, we study the notion of affine invariance (specifically, invariance to the shif...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
International audienceThis paper is devoted to the introduction of a new class of consistent estimat...
AbstractIn this paper, a class of Gaussian processes, having locally the same fractal properties as ...
<p>Representation of the continuum of fractal processes, with: the two families of fractional Gaussi...
In studying the scale invariance of an empirical time series a twofold problem arises: it is necessa...
The central theme of this pair of papers (Parts I and II in this issue) is self-similarity, which is...
Self-similarity, fractal behaviour and long-range dependence are observed in various branches of phy...
Our aim is to propose a multi-dimensional operator framework that provides a bridge between approxim...
Abstract—We consider the reconstruction of multi-dimensional signals from noisy samples. The problem...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
Self-similar stochastic processes are used for stochastic modeling whenever it is expected that long...
Fractional Brownian motion (fBm) is a nonstationary self-similar continuous stochastic process used ...
AbstractFractal Gaussian models have been widely used to represent the singular behavior of phenomen...
Abstract-The fractional Brownian motion (fBm) model has proven to be valuable in modeling many natur...
In this contribution, we study the notion of affine invariance (specifically, invariance to the shif...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
International audienceThis paper is devoted to the introduction of a new class of consistent estimat...
AbstractIn this paper, a class of Gaussian processes, having locally the same fractal properties as ...
<p>Representation of the continuum of fractal processes, with: the two families of fractional Gaussi...
In studying the scale invariance of an empirical time series a twofold problem arises: it is necessa...