A New Limit Theorem for Stochastic Processes with Gaussian Increments
From MaRDI portal
Publication:3293731
DOI10.1137/1106004zbMath0107.12601OpenAlexW2007779124MaRDI QIDQ3293731
Publication date: 1962
Published in: Theory of Probability & Its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/1106004
Related Items (26)
Quadratic variation for Gaussian processes and application to time deformation ⋮ Consistent estimates of deformed isotropic Gaussian random fields on the plane ⋮ Empirical Testing Of The Infinite Source Poisson Data Traffic Model ⋮ On the consistent separation of scale and variance for Gaussian random fields ⋮ Exact confidence intervals of the extended Orey index for Gaussian processes ⋮ The quadratic variation of random processes ⋮ A functional central limit theorem for the quadratic variation of a class of gaussian random fields ⋮ Quadratic variations of spherical fractional Brownian motions ⋮ Oscillatory fractional Brownian motion ⋮ A complement to Gladyshev's theorem ⋮ Necessary and sufficient conditions for limit theorems for quadratic variations of Gaussian sequences ⋮ A central limit theorem for a weighted power variation of a Gaussian process ⋮ CLT for quadratic variation of Gaussian processes and its application to the estimation of the Orey index ⋮ Estimating the order of mean-square derivatives with quadratic variations ⋮ The rate of convergence of Hurst index estimate for the stochastic differential equation ⋮ Rough functions: \(p\)-variation, calculus, and index estimation ⋮ Identification of space deformation using linear and superficial quadratic variations ⋮ Functional limit theorems for generalized quadratic variations of Gaussian processes ⋮ Assessing the number of mean square derivatives of a Gaussian process ⋮ Identification of an isometric transformation of the standard Brownian sheet ⋮ On estimation of the extended Orey index for Gaussian processes ⋮ First order \(p\)-variations and Besov spaces ⋮ Estimation of parameters of SDE driven by fractional Brownian motion with polynomial drift ⋮ A Gladyshev theorem for trifractional Brownian motion and \(n\)-th order fractional Brownian motion ⋮ Uniform quadratic variation for Gaussian processes ⋮ The oscillation of stochastic integrals
This page was built for publication: A New Limit Theorem for Stochastic Processes with Gaussian Increments
