Search results for "MULTIFRACTAL"

showing 10 items of 36 documents

Analysis of normal human retinal vascular network architecture using multifractal geometry

2017

AIM To apply the multifractal analysis method as a quantitative approach to a comprehensive description of the microvascular network architecture of the normal human retina. METHODS Fifty volunteers were enrolled in this study in the Ophthalmological Clinic of Cluj-Napoca, Romania, between January 2012 and January 2014. A set of 100 segmented and skeletonised human retinal images, corresponding to normal states of the retina were studied. An automatic unsupervised method for retinal vessel segmentation was applied before multifractal analysis. The multifractal analysis of digital retinal images was made with computer algorithms, applying the standard box-counting method. Statistical analyse…

0301 basic medicineEarly detectionGeometryFundus (eye)03 medical and health scienceschemistry.chemical_compoundretinal vessel segmentationlcsh:OphthalmologyClinical ResearchMedicineSegmentationRetinal microvasculaturebusiness.industryRetinalMultifractal systemGeneralized dimensionsMultifractalRetinal vesselOphthalmology030104 developmental biologyMicrovascular NetworkRetinal image analysisStandard box-counting methodchemistryVascular networklcsh:RE1-994business
researchProduct

Concurrent Changes of Brain Functional Connectivity and Motor Variability When Adapting to Task Constraints

2018

In behavioral neuroscience, the adaptability of humans facing different constraints has been addressed on one side at the brain level, where a variety of functional networks dynamically support the same performance, and on the other side at the behavioral level, where fractal properties in sensorimotor variables have been considered as a hallmark of adaptability. To bridge the gap between the two levels of observation, we have jointly investigated the changes of network connectivity in the sensorimotor cortex assessed by modularity analysis and the properties of motor variability assessed by multifractal analysis during a prolonged tapping task. Four groups of participants had to produce th…

Computer sciencePhysiologymedia_common.quotation_subject[SDV]Life Sciences [q-bio]fNIRSBehavioral neuroscience050105 experimental psychologyAdaptabilitylcsh:PhysiologyTask (project management)03 medical and health sciences0302 clinical medicinefractal propertiesPhysiology (medical)0501 psychology and cognitive sciencesDegeneracy (biology)Adaptation (computer science)ComputingMilieux_MISCELLANEOUSmodularitymedia_commonOriginal ResearchModularity (networks)lcsh:QP1-981tapping05 social sciencesadaptabilityMultifractal systemTappingNeuroscience030217 neurology & neurosurgery
researchProduct

SPATIAL MULTIFRACTALITY OF ELECTRONIC STATES AND THE METAL-INSULATOR TRANSITION IN DISORDERED SYSTEMS

1993

For the investigation of the spatial behavior of electronic wave functions in disordered systems, we employ the Anderson model of localization. The eigenstates of the corresponding Hamiltonian are calculated numerically by means of the Lanczos algorithm and are analyzed with respect to their spatial multifractal properties. We find that the wave functions show spatial multifractality for all parameter cases not too far away from the metal-insulator transition (MIT) which separates localized from extended states in this model. Exactly at the MIT, multifractality is expected to exist on all length scales larger than the lattice spacing. It is found that the corresponding singularity spectrum…

Condensed matter physicsApplied MathematicsLanczos algorithmMultifractal systemCondensed Matter::Disordered Systems and Neural Networkssymbols.namesakeModeling and SimulationsymbolsProbability distributionCondensed Matter::Strongly Correlated ElectronsGeometry and TopologyStatistical physicsMetal–insulator transitionSingularity spectrumWave functionHamiltonian (quantum mechanics)Anderson impurity modelMathematicsFractals
researchProduct

Comparative efficiency of green and conventional bonds pre- and during COVID-19: An asymmetric multifractal detrended fluctuation analysis

2021

Abstract Motivated by the lack of research on price efficiency dynamics of green bonds and the impact of the COVID-19 on the pricing of fixed-income securities, this study investigates the comparative efficiency of green and conventional bond markets pre- and during the COVID-19 pandemic applying asymmetric multifractal analysis. Specifically, the multifractal scaling behaviour is examined separately during upward and downward trends in bond markets using the asymmetric multifractal detrended fluctuation analysis (A-MF-DFA) approach. The empirical findings confirm the presence of asymmetric multifractality in the green and traditional bond markets. Not surprisingly, inefficiency in both bon…

Coronavirus disease 2019 (COVID-19)020209 energyBond02 engineering and technologyMultifractal system010501 environmental sciencesManagement Monitoring Policy and LawMultifractal detrended fluctuation analysis01 natural sciencesBlack swan theoryGeneral Energy0202 electrical engineering electronic engineering information engineeringEconometricsEconomicsBond marketPrice efficiencyInefficiency0105 earth and related environmental sciencesEnergy Policy
researchProduct

Monte Carlo Studies of Relations between Fractal Dimensions in Monofractal Data Sets

1998

Within the fractal approach to studying the distribution of seismic event locations, different fractal dimension definitions and estimation algorithms are in use. Although one expects that for the same data set, values of different dimensions will be different, it is usually anticipated that the direction of fractal dimension changes among different data sets will be the same for every fractal dimension. Mutual relations between the three most popular fractal dimensions, namely: the capacity, cluster and correlation dimensions, have been investigated in the present work. The studies were performed on the Monte Carlo generated data sets. The analysis has shown that dependence of the fractal …

Correlation dimensionGeophysicsFractalFractal dimension on networksGeochemistry and PetrologyMinkowski–Bouligand dimensionGeometryMultifractal systemStatistical physicsEffective dimensionFractal analysisFractal dimensionMathematicsPure and Applied Geophysics
researchProduct

Multifractal zone plates

2010

We present multifractal zone plates (MFZPs) as what is to our knowledge a new family of diffractive lenses whose structure is based on the combination of fractal zone plates (FZPs) of different orders. The typical result is a composite of two FZPs with the central one having a first-order focal length f surrounded by outer zones with a third-order focal length f. The focusing properties of different members of this family are examined and compared with conventional composite Fresnel zone plates. It is shown that MFZPs improve the axial resolution and also give better performance under polychromatic illumination.

DiffractionPhysicsFresnel zonebusiness.industryComposite numberMultifractal systemZone plateDiffraction efficiencyAtomic and Molecular Physics and OpticsElectronic Optical and Magnetic Materialslaw.inventionOpticsFractallawFocal lengthComputer Vision and Pattern Recognitionbusiness
researchProduct

Random cutout sets with spatially inhomogeneous intensities

2015

We study the Hausdorff dimension of Poissonian cutout sets defined via inhomogeneous intensity measures on Ahlfors-regular metric spaces. We obtain formulas for the Hausdorff dimension of such cutouts in self-similar and self-conformal spaces using the multifractal decomposition of the average densities for the natural measures.

General MathematicsStructure (category theory)Hausdorff dimensionDynamical Systems (math.DS)01 natural sciencesMeasure (mathematics)010104 statistics & probabilityCorollaryDimension (vector space)Classical Analysis and ODEs (math.CA)FOS: MathematicsMathematics::Metric Geometry0101 mathematicsMathematics - Dynamical SystemsMathematicsmatematiikkaHausdorffin dimensioProbability (math.PR)010102 general mathematicsMathematical analysisMultifractal systemPoissonian CutoutMetric spaceMathematics - Classical Analysis and ODEsHausdorff dimensionPrimary 60D05 Secondary 28A80 37D35 37C45Intensity (heat transfer)Mathematics - Probability
researchProduct

On the multifractal analysis of measures

1992

Multifractal formalismStatistical and Nonlinear PhysicsMultifractal systemTopologyMathematical PhysicsMathematicsJournal of Statistical Physics
researchProduct

Spatial multifractal properties of wave packets in the Anderson model of localization.

1993

The multifractal properties of electronic wave functions in disordered samples are investigated. In a given energy range all eigenstates are determined for the same disorder configuration in the Anderson model of localization. It is shown that the singularity spectrum and the generalized dimensions change only slowly with energy, aside from statistical fluctuations. More important, the wave packet constructed by linear combination of the eigenstates shows quantitatively the same multifractal properties. Consequences for the transport properties of electronic states in disordered systems are discussed.

PhysicsAnderson localizationQuantum mechanicsWave packetMultifractal systemElectronic structureStatistical physicsStatistical fluctuationsSingularity spectrumWave functionCondensed Matter::Disordered Systems and Neural NetworksAnderson impurity modelPhysical review. B, Condensed matter
researchProduct

Multifractal electronic wave functions in disordered systems

1992

Abstract To investigate the electronic states in disordered samples we diagonalize very large secular matrices corresponding to the Anderson Hamiltonian. The resulting probability density of single electronic eigenstates in 1-, 2-, and 3-dimensional samples is analysed by means of a box-counting procedure. By linear regression we obtain the Lipschitz-Holder exponents and the corresponding singularity spectrum, typical for a multifractal set in each case. By means of a Legendre transformation the mass exponents and the generalized dimensions are derived. Consequences for spectroscopic intensities and transport properties are discussed.

PhysicsCondensed matter physicsBiophysicsProbability density functionGeneral ChemistryMultifractal systemCondensed Matter PhysicsBiochemistryAtomic and Molecular Physics and OpticsLegendre transformationsymbols.namesakeLinear regressionsymbolsSingularity spectrumWave functionHamiltonian (quantum mechanics)Eigenvalues and eigenvectorsMathematical physicsJournal of Luminescence
researchProduct