Asymptotics of Karhunen-Loève eigenvalues and tight constants for probability distributions of passive scalar transport
From MaRDI portal
Publication:1403383
DOI10.1007/s00220-003-0835-3zbMath1028.60038OpenAlexW2092827627WikidataQ107199757 ScholiaQ107199757MaRDI QIDQ1403383
Publication date: 1 September 2003
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s00220-003-0835-3
fractional Brownian motionrate of decaydecaying passive scalar transportgeneralization of the Majda model
Gaussian processes (60G15) Stochastic analysis applied to problems in fluid mechanics (76M35) Turbulent transport, mixing (76F25)
Related Items (11)
Dynamics of probability density functions for decaying passive scalars in periodic velocity fields ⋮ On the eigenproblem for Gaussian bridges ⋮ Ergodicity and invariant measures for a diffusing passive scalar advected by a random channel shear flow and the connection between the Kraichnan-Majda model and Taylor-Aris dispersion ⋮ Harmonic analysis meets stationarity: a general framework for series expansions of special Gaussian processes ⋮ On the symmetry properties of a random passive scalar with and without boundaries, and their connection between hot and cold states ⋮ Evolution of the probability measure for the Majda model: new invariant measures and breathing PDFs ⋮ MULTIFRACTIONAL STOCHASTIC VOLATILITY MODELS ⋮ Estimation of the Hurst parameter in some fractional processes ⋮ Mixed fractional Brownian motion: a spectral take ⋮ Sharp asymptotics in a fractional Sturm-Liouville problem ⋮ Asymptotic analysis of the learning curve for Gaussian process regression
This page was built for publication: Asymptotics of Karhunen-Loève eigenvalues and tight constants for probability distributions of passive scalar transport
