326 research outputs found
Wavelet linear estimation for derivatives of a density from observations of mixtures with varying mixing proportions
A wavelet based linear estimator is proposed for the derivatives of a probability density function based on a sample from a finite mixture of components with varying mixing proportions. It extends the linear estimator of a probability density function proposed by Pokhyl'ko (Theor. Probability and Math. Statist, 70 (2005) 135–145). Upper bounds on L2 and L∞ losses are obtained for such estimators
Nonparametric inference for a class of stochastic partial differential equations based on discrete observations
Consider the stochastic partial differential equations of the type du,(t,x) = (Δu,(t,x)+u,(t,x))dt + ∊ Θ(t) dWQ(t,x), Θ ≤ t ≤ T and du∊,(t,x)= Δu∊ (t,x)dt+ ∊ Θ(t) (I - Δ)-1/2 dW(t,x), 0 ≤ t ≤ T where Δ = ∂2/∂x2,θ ∈ Θ and Θ is a class of positive valued functions such that Θ2(t)∈ L2(R). We obtain an estimator for the function θ(t) based on the Fourier coefficients ui∊(t), 1 ≤ i ≤ N of the random field u∊(t,x) observed at discrete times and study its asymptotic properties
Infinitely divisible characteristic functionals on locally convex topological vector spaces
This article does not have an abstract
On a characteristic property of point processes
This note is concerned with a certain property of point processes. We prove that if N1, N2 and N3 are three independent point processes, then the bivariate point process (N1 + N3, N2 + N3) uniquely determines the point processes N1, N2 and N3
Nonparametric estimation of the derivatives of a density by the method of wavelets
A method of estimation of the derivatives of a probability density using wavelet systems is proposed. Precise order for the integrated mean square of the proposed estimator is obtained
Discrete Gronwall inequalities for demimartingales
The aim of this work is to obtain discrete versions of stochastic Gronwall
inequalities involving demimartingale sequences. The results generalize the
respective theorems for martingales provided by Kruse and Scheutzow (2018) and
Hendy et al. (2022). Moreover, we present an application which provides an
upper bound for the a priori estimate of the backward Euler-Maruyama numerical
scheme
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