Fractional brownian motion versus the continuous-time random walk: a simple test for subdiffusive dynamics.
about
Optical tracking of nanoscale particles in microscale environments.Intracellular transport of insulin granules is a subordinated random walk.Fractional process as a unified model for subdiffusive dynamics in experimental data.Estimating the anomalous diffusion exponent for single particle tracking data with measurement errors - An alternative approachIs protein folding sub-diffusive?Two-dimensional continuum percolation threshold for diffusing particles of nonzero radius.Anomalous diffusion: testing ergodicity breaking in experimental data.Anomalous diffusion of oligomerized transmembrane proteins.Identifying transport behavior of single-molecule trajectories.Ergodic and nonergodic processes coexist in the plasma membrane as observed by single-molecule tracking.Fractional entropy decay and the third law of thermodynamics.Guidelines for the fitting of anomalous diffusion mean square displacement graphs from single particle tracking experimentsChromosomal locus tracking with proper accounting of static and dynamic errors.Analytical tools to distinguish the effects of localization error, confinement, and medium elasticity on the velocity autocorrelation functionA fractional motion diffusion model for grading pediatric brain tumors.Distribution of directional change as a signature of complex dynamics.Plasma Membrane is Compartmentalized by a Self-Similar Cortical Actin MeshworkQuantifying non-ergodicity of anomalous diffusion with higher order moments.Fluorescence molecule counting for single-molecule studies in crowded environment of living cells without and with broken ergodicity.Anomalous diffusion in cerebral glioma assessed using a fractional motion model.Mean-squared-displacement statistical test for fractional Brownian motion.Visual information and expert's idea in Hurst index estimation of the fractional Brownian motion using a diffusion type approximation.Rad4 recognition-at-a-distance: Physical basis of conformation-specific anomalous diffusion of DNA repair proteins.Identifying ergodicity breaking for fractional anomalous diffusion: Criteria for minimal trajectory length.Universal algorithm for identification of fractional Brownian motion. A case of telomere subdiffusion.Fractional-time random walk subdiffusion and anomalous transport with finite mean residence times: faster, not slower.Functional significance of complex fluctuations in brain activity: from resting state to cognitive neuroscience.Molecular motors pulling cargos in the viscoelastic cytosol: how power strokes beat subdiffusion.Single-molecule imaging reveals receptor-G protein interactions at cell surface hot spots.Improved estimation of anomalous diffusion exponents in single-particle tracking experiments.Ergodicity convergence test suggests telomere motion obeys fractional dynamics.Probing the type of anomalous diffusion with single-particle tracking.Microscopic approach to nonlinear reaction-diffusion: the case of morphogen gradient formation.Fractional Lévy stable motion can model subdiffusive dynamics.Population splitting, trapping, and non-ergodicity in heterogeneous diffusion processes.Anomalous and normal diffusion of proteins and lipids in crowded lipid membranes.Regularized fractional Ornstein-Uhlenbeck processes and their relevance to the modeling of fluid turbulence.Statistical properties of the anomalous scaling exponent estimator based on time-averaged mean-square displacement.Weakly anomalous diffusion with non-Gaussian propagators.Distributions of diffusion measures from a local mean-square displacement analysis.
P2860
Q30383382-D439F86A-6EC7-4C18-B6C2-F39317AA39ADQ30538192-3E0C3F10-91CB-4E10-8F54-5AE3D7724885Q30580253-070A3D9B-1265-47BC-AAB2-30EC15DD4ADCQ30969957-FA719EA8-02F3-46CD-AD27-8206B8A0F380Q33700691-9CBD0A2F-7F30-4F13-A7B0-DCAA35957549Q34099066-D4F536BA-9A88-4780-A1D9-CC6984DEEE53Q34105417-26ECE7ED-02B6-47B4-839B-C456DAAC445CQ34181085-079D8CD7-7B10-4A33-8866-7C78F01CE467Q34561376-758BEFFC-C682-430E-B305-3CDC7D617C50Q34835818-CCB05539-4411-48E5-A82A-FE026052AB69Q35250008-6B519E44-7FB9-463D-BE2D-545981FB297EQ35560943-F4C51F56-3625-44A6-B977-2C98437E31D8Q35945253-81E9A8AB-711B-4D57-A665-9ABB4D748DD8Q36010893-A958E2B1-5BB7-46E7-80A0-F9D9962D1121Q37341031-BDA5703D-2421-43D0-B932-681AD33DB8ADQ37377518-16599711-5197-4A6B-8F2B-39E5CF6CF96CQ38687225-AE7FE18F-EB3C-42A2-89E2-4ADE54118DCAQ38716446-C8083BFB-ABF6-4678-B180-B5FBF2F3A636Q38739760-545A97F3-988E-4D05-9CB1-0C295C368CC4Q38774683-B4013598-2021-4078-A2B2-78D4FC71C1B5Q38834187-9AFDE6A5-49CC-40C6-BA42-C0D9FB588AD7Q38962654-41C5A1E1-BE8A-4718-A24E-6F1292569F64Q39035113-221AABE3-C3E1-4895-A2AB-88CBB4568FD5Q39102157-2CB9D502-9B34-4FB0-8F23-5C0A91AE2827Q39235139-A28FA954-817C-45E3-8C0E-A67AAC008FC9Q39272945-9D6A54FA-0A2A-4F47-B9B0-5D34B1349AC2Q40553004-C307C5F3-D14F-4BFA-B338-E0BC3FEBCCE5Q42208806-80014394-4D82-484D-819A-E398D31B42FEQ42517028-B93F5964-A265-44F2-8F05-83F47484126BQ42817973-9C01A523-D3E9-40AB-BB64-F1112F96EF76Q44226039-5A1FC642-EB01-458A-A6C2-6D78AD17364FQ44768860-60A0787F-C685-47E9-8108-FA6B9D790C9BQ44805078-0215DD1E-8228-4842-AC89-4ED73B4B71E5Q46103630-29EF0939-4A57-4FE3-867F-0AE7884DBFE5Q46377147-E1A6D8AC-A30A-4CB0-86DF-C8341AA95744Q46915083-3E4C050A-8D96-4F22-A035-FED9F232F30EQ47560761-DBBAC298-F7A3-4963-BEE6-133DA6B639DBQ47671494-F92AB460-7D38-44BC-AB18-99567501D01CQ47955780-845635DF-4EE9-40F0-BE11-5C2F221FCC7FQ47955788-94BD4F00-3D1E-4090-A2D6-E8447949AD79
P2860
Fractional brownian motion versus the continuous-time random walk: a simple test for subdiffusive dynamics.
description
2009 nî lūn-bûn
@nan
2009年の論文
@ja
2009年学术文章
@wuu
2009年学术文章
@zh
2009年学术文章
@zh-cn
2009年学术文章
@zh-hans
2009年学术文章
@zh-my
2009年学术文章
@zh-sg
2009年學術文章
@yue
2009年學術文章
@zh-hant
name
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@en
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@nl
type
label
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@en
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@nl
prefLabel
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@en
Fractional brownian motion ver ...... est for subdiffusive dynamics.
@nl
P2860
P50
P1476
Fractional brownian motion ver ...... test for subdiffusive dynamics
@en
P2093
Joseph Klafter
P2860
P304
P356
10.1103/PHYSREVLETT.103.180602
P407
P577
2009-10-30T00:00:00Z