Journal of the American Geriatrics Society (JAGS), ISSN 1532-5415, 2009, Volume 57, Issue 8, pp. 1411 - 1419

OBJECTIVES: To examine the association between strength, function, lean mass, muscle density, and risk of hospitalization.
DESIGN...

physical function | muscle fat infiltration | lean mass | hospitalization | walking speed | Lean mass | Muscle fat infiltration | Hospitalization | Walking speed | Physical function | FALLS | LIMITATIONS | LOWER-EXTREMITY PERFORMANCE | BODY-COMPOSITION | GERIATRICS & GERONTOLOGY | SKELETAL-MUSCLE | WOMEN | PREDICTORS | MEN | ATTENUATION | GERONTOLOGY | HEALTH | Geriatric Assessment | Torque | Prospective Studies | Medicare | United States | Humans | Thigh | Male | Risk | Tomography, X-Ray Computed | Muscle, Skeletal - physiology | Absorptiometry, Photon | Walking - physiology | Regression Analysis | Knee Joint - physiology | Muscle, Skeletal - physiopathology | Aged, 80 and over | Female | Poisson Distribution | Aged | Hand Strength - physiology | Body Composition - physiology | Muscle Strength - physiology | Medical colleges | Muscular system | Older people | Risk factors

physical function | muscle fat infiltration | lean mass | hospitalization | walking speed | Lean mass | Muscle fat infiltration | Hospitalization | Walking speed | Physical function | FALLS | LIMITATIONS | LOWER-EXTREMITY PERFORMANCE | BODY-COMPOSITION | GERIATRICS & GERONTOLOGY | SKELETAL-MUSCLE | WOMEN | PREDICTORS | MEN | ATTENUATION | GERONTOLOGY | HEALTH | Geriatric Assessment | Torque | Prospective Studies | Medicare | United States | Humans | Thigh | Male | Risk | Tomography, X-Ray Computed | Muscle, Skeletal - physiology | Absorptiometry, Photon | Walking - physiology | Regression Analysis | Knee Joint - physiology | Muscle, Skeletal - physiopathology | Aged, 80 and over | Female | Poisson Distribution | Aged | Hand Strength - physiology | Body Composition - physiology | Muscle Strength - physiology | Medical colleges | Muscular system | Older people | Risk factors

Journal Article

Potential Analysis, ISSN 0926-2601, 1/2018, Volume 48, Issue 1, pp. 35 - 48

In this note, by using Bismut’s approach to Malliavin calculus for jump processes, we obtain a criterion for the existence of density functions of the running maximum of Wiener-Poisson functionals...

Geometry | Wiener-Poisson functionals | Potential Theory | Functional Analysis | Running maximum | Density functions | 60G51 | Probability Theory and Stochastic Processes | Mathematics | Malliavin calculus | Stochastic differential equation | 60E05 | Differential equations

Geometry | Wiener-Poisson functionals | Potential Theory | Functional Analysis | Running maximum | Density functions | 60G51 | Probability Theory and Stochastic Processes | Mathematics | Malliavin calculus | Stochastic differential equation | 60E05 | Differential equations

Journal Article

Experiments in Fluids, ISSN 0723-4864, 11/2015, Volume 56, Issue 11, pp. 1 - 25

...Exp Fluids (2015) 56:202
DOI 10.1007/s00348-015-2074-8
RESEARCH ARTICLE
Statistically advanced, self‑similar , radial probability density
functions...

Engineering | Engineering Fluid Dynamics | Fluid- and Aerodynamics | Engineering Thermodynamics, Heat and Mass Transfer | INTERMITTENCY | MECHANICS | DECAY | SCALARS | CONCENTRATION FIELD | TURBULENCE | MODEL | IGNITION | SCATTERING | FLAME | ENGINEERING, MECHANICAL | Hydrogen

Engineering | Engineering Fluid Dynamics | Fluid- and Aerodynamics | Engineering Thermodynamics, Heat and Mass Transfer | INTERMITTENCY | MECHANICS | DECAY | SCALARS | CONCENTRATION FIELD | TURBULENCE | MODEL | IGNITION | SCATTERING | FLAME | ENGINEERING, MECHANICAL | Hydrogen

Journal Article

Journal of Theoretical Probability, ISSN 0894-9840, 12/2017, Volume 30, Issue 4, pp. 1655 - 1676

... in the Cramér zone for the distribution density function of the standardized compound Poisson process...

Asymptotic expansion | 60F10 | Compound Poisson process | Probability Theory and Stochastic Processes | Mathematics | Theorems of large deviations | Statistics, general | Cumulant method | MODERATE DEVIATIONS | STATISTICS & PROBABILITY | RANDOM-VARIABLES | SUMS

Asymptotic expansion | 60F10 | Compound Poisson process | Probability Theory and Stochastic Processes | Mathematics | Theorems of large deviations | Statistics, general | Cumulant method | MODERATE DEVIATIONS | STATISTICS & PROBABILITY | RANDOM-VARIABLES | SUMS

Journal Article

Monthly Notices of the Royal Astronomical Society, ISSN 0035-8711, 2013, Volume 430, Issue 3, pp. 1880 - 1891

We propose a new, physically motivated fitting function for density probability distribution functions (PDFs...

Cosmology:theory | Galaxies:formation | Hydrodynamics | Turbulence | Instabilities | Galaxies:active | MAGNETIZED CLOUDS | MOLECULAR CLOUDS | STAR-FORMATION | hydrodynamics | MACH NUMBER RELATION | turbulence | LOG-POISSON STATISTICS | instabilities | cosmology: theory | galaxies: formation | FULLY-DEVELOPED TURBULENCE | galaxies: active | ASTRONOMY & ASTROPHYSICS | INITIAL MASS FUNCTION | INTERSTELLAR TURBULENCE | NUMERICAL SIMULATIONS | PROBABILITY-DISTRIBUTION

Cosmology:theory | Galaxies:formation | Hydrodynamics | Turbulence | Instabilities | Galaxies:active | MAGNETIZED CLOUDS | MOLECULAR CLOUDS | STAR-FORMATION | hydrodynamics | MACH NUMBER RELATION | turbulence | LOG-POISSON STATISTICS | instabilities | cosmology: theory | galaxies: formation | FULLY-DEVELOPED TURBULENCE | galaxies: active | ASTRONOMY & ASTROPHYSICS | INITIAL MASS FUNCTION | INTERSTELLAR TURBULENCE | NUMERICAL SIMULATIONS | PROBABILITY-DISTRIBUTION

Journal Article

Journal of applied crystallography, ISSN 0021-8898, 2008, Volume 41, Issue 6, pp. 1024 - 1037

A novel algorithm for ODF (orientation density function) estimation from diffraction pole figures is presented which is especially well suited for sharp...

diffraction | pole figure inversion | radially symmetric functions | pole figures | orientation density function | fast Fourier transform | neutron diffraction goniometry | experimentally deformed hematite | texture analysis | Texture analysis | Diffraction | Pole figure inversion | Experimentally deformed hematite | Fast Fourier transform | Neutron diffraction goniometry | Radially symmetric functions | Orientation density function | Pole figures | DENSITY-FUNCTION | APPROXIMATION | ORIENTATION DISTRIBUTION FUNCTION | OPTIMIZATION | CRYSTALLOGRAPHY | CRYSTALLOGRAPHIC-TEXTURE | CHEMISTRY, MULTIDISCIPLINARY | VECTOR | Algorithms | Temperature inversions | Analysis | Methods | Estimating techniques | Poisson distribution | Crystallography

diffraction | pole figure inversion | radially symmetric functions | pole figures | orientation density function | fast Fourier transform | neutron diffraction goniometry | experimentally deformed hematite | texture analysis | Texture analysis | Diffraction | Pole figure inversion | Experimentally deformed hematite | Fast Fourier transform | Neutron diffraction goniometry | Radially symmetric functions | Orientation density function | Pole figures | DENSITY-FUNCTION | APPROXIMATION | ORIENTATION DISTRIBUTION FUNCTION | OPTIMIZATION | CRYSTALLOGRAPHY | CRYSTALLOGRAPHIC-TEXTURE | CHEMISTRY, MULTIDISCIPLINARY | VECTOR | Algorithms | Temperature inversions | Analysis | Methods | Estimating techniques | Poisson distribution | Crystallography

Journal Article

7.
Full Text
A Revised Density Function for Molecular Surface Calculation in Continuum Solvent Models

Journal of chemical theory and computation, ISSN 1549-9618, 04/2010, Volume 6, Issue 4, pp. 1157 - 1169

A revised density function is developed to define the molecular surface for the numerical Poisson...

Molecular Mechanics | ELECTROSTATIC INTERACTIONS | DYNAMICS SIMULATIONS | GENERALIZED-BORN MODEL | NUMERICAL-SOLUTION | CLASSICAL ELECTROSTATICS | ALGORITHM | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | COMPUTATION | BOUNDARY-ELEMENT METHOD | POISSON-BOLTZMANN EQUATION | SOLVATION MODEL

Molecular Mechanics | ELECTROSTATIC INTERACTIONS | DYNAMICS SIMULATIONS | GENERALIZED-BORN MODEL | NUMERICAL-SOLUTION | CLASSICAL ELECTROSTATICS | ALGORITHM | PHYSICS, ATOMIC, MOLECULAR & CHEMICAL | CHEMISTRY, PHYSICAL | COMPUTATION | BOUNDARY-ELEMENT METHOD | POISSON-BOLTZMANN EQUATION | SOLVATION MODEL

Journal Article

Reviews of modern physics, ISSN 1539-0756, 2011, Volume 83, Issue 3, pp. 885 - 906

... exclusion principle for overlapping electron wave functions that result in tunneling of electrons...

DENSITY | RAY THOMSON SCATTERING | SPIN | PHYSICS, MULTIDISCIPLINARY | GIANT PLANETS | MAGNETIC-FIELD | PHYSICS | ELECTROMAGNETIC-WAVES | HYDRODYNAMIC EQUATIONS | INERTIAL-RANGE | DISPERSION-RELATION | Poisson's equation | Usage | Electric waves | Electromagnetic radiation | Research | Maxwell equations | Technology application | Electromagnetic waves | Electron mobility | Kinetic energy | Plasma (Ionized gases) | Methods | Quantum theory | Boundary value problems | Gaussian distribution | Spin coupling | Analysis | Wave functions | Physics - Plasma Physics | FREE ELECTRON LASERS | PLASMA DENSITY | QUANTUM WELLS | CAVITIES | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | MAGNETIZATION | INERTIAL CONFINEMENT | POISSON EQUATION | SIMULATION | PLASMA WAVES | QUANTUM DOTS | WAVE FUNCTIONS | EINSTEINIUM IONS | ASTROPHYSICS | SOLIDS | WHITE DWARF STARS | ELECTRON DENSITY | QUANTUM PLASMA | SPECTRA

DENSITY | RAY THOMSON SCATTERING | SPIN | PHYSICS, MULTIDISCIPLINARY | GIANT PLANETS | MAGNETIC-FIELD | PHYSICS | ELECTROMAGNETIC-WAVES | HYDRODYNAMIC EQUATIONS | INERTIAL-RANGE | DISPERSION-RELATION | Poisson's equation | Usage | Electric waves | Electromagnetic radiation | Research | Maxwell equations | Technology application | Electromagnetic waves | Electron mobility | Kinetic energy | Plasma (Ionized gases) | Methods | Quantum theory | Boundary value problems | Gaussian distribution | Spin coupling | Analysis | Wave functions | Physics - Plasma Physics | FREE ELECTRON LASERS | PLASMA DENSITY | QUANTUM WELLS | CAVITIES | CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS | MAGNETIZATION | INERTIAL CONFINEMENT | POISSON EQUATION | SIMULATION | PLASMA WAVES | QUANTUM DOTS | WAVE FUNCTIONS | EINSTEINIUM IONS | ASTROPHYSICS | SOLIDS | WHITE DWARF STARS | ELECTRON DENSITY | QUANTUM PLASMA | SPECTRA

Journal Article

PloS one, ISSN 1932-6203, 04/2013, Volume 8, Issue 4, p. e60330

.... Basic reproduction numbers were calculated using a well-known formula for vector-borne diseases considering the population densities of hosts...

SEROTYPE 8 | TRANSMISSION | DIPTERA | SEASONAL ABUNDANCE | MULTIDISCIPLINARY SCIENCES | SURVEILLANCE | USUTU-VIRUS DYNAMICS | CERATOPOGONIDAE | PARAMETERS | EPIDEMIOLOGY | CLIMATE | Bluetongue - epidemiology | Risk Assessment | Humans | Bluetongue - transmission | Population Dynamics - statistics & numerical data | Austria - epidemiology | Basic Reproduction Number | Bluetongue - virology | Bluetongue virus - physiology | Forecasting | Insect Vectors - virology | Likelihood Functions | Animals | Insect Vectors - physiology | Cattle | Ceratopogonidae - virology | Disease Outbreaks - veterinary | Disease Outbreaks - prevention & control | Sheep | Ceratopogonidae - physiology | Seasons | Bluetongue | Analysis | Risk assessment | Research | Epidemiology | Risk factors | Virus-vector relationships | Temporal distribution | Epidemics | Temperature | Disease | Biting | Viruses | Outbreaks | Veterinary medicine | Reproduction | Mathematical models | Poisson density functions | Public health | Vector-borne diseases | Immunization | Statistical analysis | Computer simulation | Incubation | Health risks | Vectors | Studies | Climate change | Population (statistical) | Spatial distribution | Surveillance | Economic impact | Environmental monitoring

SEROTYPE 8 | TRANSMISSION | DIPTERA | SEASONAL ABUNDANCE | MULTIDISCIPLINARY SCIENCES | SURVEILLANCE | USUTU-VIRUS DYNAMICS | CERATOPOGONIDAE | PARAMETERS | EPIDEMIOLOGY | CLIMATE | Bluetongue - epidemiology | Risk Assessment | Humans | Bluetongue - transmission | Population Dynamics - statistics & numerical data | Austria - epidemiology | Basic Reproduction Number | Bluetongue - virology | Bluetongue virus - physiology | Forecasting | Insect Vectors - virology | Likelihood Functions | Animals | Insect Vectors - physiology | Cattle | Ceratopogonidae - virology | Disease Outbreaks - veterinary | Disease Outbreaks - prevention & control | Sheep | Ceratopogonidae - physiology | Seasons | Bluetongue | Analysis | Risk assessment | Research | Epidemiology | Risk factors | Virus-vector relationships | Temporal distribution | Epidemics | Temperature | Disease | Biting | Viruses | Outbreaks | Veterinary medicine | Reproduction | Mathematical models | Poisson density functions | Public health | Vector-borne diseases | Immunization | Statistical analysis | Computer simulation | Incubation | Health risks | Vectors | Studies | Climate change | Population (statistical) | Spatial distribution | Surveillance | Economic impact | Environmental monitoring

Journal Article

Journal of Mathematical Physics, ISSN 0022-2488, 06/2017, Volume 58, Issue 6, p. 61902

The work presents a proof of convergence of the density of energy levels to a Gaussian distribution for a wide class of quadratic forms of Fermi operators...

RANDOM-MATRIX THEORY | STATISTICS | LIMIT-THEOREM | ENTANGLEMENT | ENSEMBLES | NORM | HAMILTONIANS | SPECTRA | PHYSICS, MATHEMATICAL | QUANTUM SPIN CHAINS | Operators | Statistical analysis | Energy levels | Quadratic forms | Normal distribution | Gaussian distribution | Poisson density functions | Clustering | Quantum theory

RANDOM-MATRIX THEORY | STATISTICS | LIMIT-THEOREM | ENTANGLEMENT | ENSEMBLES | NORM | HAMILTONIANS | SPECTRA | PHYSICS, MATHEMATICAL | QUANTUM SPIN CHAINS | Operators | Statistical analysis | Energy levels | Quadratic forms | Normal distribution | Gaussian distribution | Poisson density functions | Clustering | Quantum theory

Journal Article

Potential Analysis, ISSN 0926-2601, 11/2014, Volume 41, Issue 4, pp. 1347 - 1358

This paper features a comparison inequality for the densities of the moment measures of super-Brownian motion...

Probability Theory and Stochastic Processes | Mathematics | Geometry | Harnack inequality | Poisson kernel | Super-Brownian motion | X -harmonic function | 3-G inequality | Potential Theory | Functional Analysis | Green’s kernel | 60J68 | Recursive moment formulae | 60J45 | X-harmonic function | MATHEMATICS | super-Brownian motion | CONDITIONAL GAUGE | BOUNDARY | Green's kernel | Specific gravity | Analysis

Probability Theory and Stochastic Processes | Mathematics | Geometry | Harnack inequality | Poisson kernel | Super-Brownian motion | X -harmonic function | 3-G inequality | Potential Theory | Functional Analysis | Green’s kernel | 60J68 | Recursive moment formulae | 60J45 | X-harmonic function | MATHEMATICS | super-Brownian motion | CONDITIONAL GAUGE | BOUNDARY | Green's kernel | Specific gravity | Analysis

Journal Article

IEEE Transactions on Power Systems, ISSN 0885-8950, 05/2004, Volume 19, Issue 2, pp. 724 - 734

.... The random sums introduced by the randomness of the number of fault occurrences in the time interval of analysis are handled by using a characteristic functions...

Analytical models | Monte Carlo methods | Convolution | Computational modeling | Discrete Fourier transforms | Probability density function | Probability distribution | Random variables | Reliability | Distributed computing | Reliability indices | Energy not supplied | Probability distributions | Continuity of supply | Interruptions | Compound poisson process | Characteristic functions | Service restoration times | continuity of supply | probability distributions | interruptions | service restoration times | characteristic functions | reliability indices | compound Poisson process | energy not supplied | ENGINEERING, ELECTRICAL & ELECTRONIC | Electric power systems | Research | Studies | Probability | Fourier transforms | Faults | Computer simulation | Computation | Mathematical analysis | Inverse | Probability density functions

Analytical models | Monte Carlo methods | Convolution | Computational modeling | Discrete Fourier transforms | Probability density function | Probability distribution | Random variables | Reliability | Distributed computing | Reliability indices | Energy not supplied | Probability distributions | Continuity of supply | Interruptions | Compound poisson process | Characteristic functions | Service restoration times | continuity of supply | probability distributions | interruptions | service restoration times | characteristic functions | reliability indices | compound Poisson process | energy not supplied | ENGINEERING, ELECTRICAL & ELECTRONIC | Electric power systems | Research | Studies | Probability | Fourier transforms | Faults | Computer simulation | Computation | Mathematical analysis | Inverse | Probability density functions

Journal Article

Fluid dynamics research, ISSN 0169-5983, 06/2012, Volume 44, Issue 3, pp. 1 - 15

The probability density functions (PDFs) for energy dissipation rates, created from time-series data of grid turbulence in a wind tunnel, are analyzed at a high precision by the theoretical formulae for PDFs within multifractal PDF theory...

INTERMITTENCY | DISSIPATION | MECHANICS | FULLY-DEVELOPED TURBULENCE | PHYSICS, FLUIDS & PLASMAS | GENERALIZED DIMENSIONS | SYSTEMS | STRANGE ATTRACTORS | NONEXTENSIVITY | LOG-POISSON STATISTICS | TSALLIS STATISTICS | ENTROPY | Turbulence | Turbulent flow | Computational fluid dynamics | Wind tunnels | Coherence | Fluid flow | Adjustable | Probability density functions

INTERMITTENCY | DISSIPATION | MECHANICS | FULLY-DEVELOPED TURBULENCE | PHYSICS, FLUIDS & PLASMAS | GENERALIZED DIMENSIONS | SYSTEMS | STRANGE ATTRACTORS | NONEXTENSIVITY | LOG-POISSON STATISTICS | TSALLIS STATISTICS | ENTROPY | Turbulence | Turbulent flow | Computational fluid dynamics | Wind tunnels | Coherence | Fluid flow | Adjustable | Probability density functions

Journal Article

IEEE Transactions on Aerospace and Electronic Systems, ISSN 0018-9251, 04/2010, Volume 46, Issue 2, pp. 803 - 817

The Poisson-binomial probability density function (pdf) describes the numbers of successes in N independent trials, when the individual probabilities of success vary across trials...

Target tracking | Fault tolerant systems | Probability density function | Closed-form solution | Workstations | Resource management | Distributed computing | Signal detection | Testing | Distribution functions | Symmetric matrices | Discrete Fourier transforms | BINARY INTEGRATION | Polynomials | ENGINEERING, AEROSPACE | TELECOMMUNICATIONS | ENGINEERING, ELECTRICAL & ELECTRONIC | Evaluation | Usage | Reliability (Engineering) | Analysis | Radar systems | Distribution (Probability theory) | Pattern recognition | Design and construction | Poisson distribution | Target acquisition | Object recognition (Computers) | Methods | Permutations | Fault tolerance | Systems management | Computation | Mathematical analysis | Exact solutions | Data fusion | Probability density functions | Binomial coefficients

Target tracking | Fault tolerant systems | Probability density function | Closed-form solution | Workstations | Resource management | Distributed computing | Signal detection | Testing | Distribution functions | Symmetric matrices | Discrete Fourier transforms | BINARY INTEGRATION | Polynomials | ENGINEERING, AEROSPACE | TELECOMMUNICATIONS | ENGINEERING, ELECTRICAL & ELECTRONIC | Evaluation | Usage | Reliability (Engineering) | Analysis | Radar systems | Distribution (Probability theory) | Pattern recognition | Design and construction | Poisson distribution | Target acquisition | Object recognition (Computers) | Methods | Permutations | Fault tolerance | Systems management | Computation | Mathematical analysis | Exact solutions | Data fusion | Probability density functions | Binomial coefficients

Journal Article

Journal of applied mechanics, ISSN 0021-8936, 2010, Volume 77, Issue 3, pp. 1 - 7

The stationary probability density function (PDF) solution of the stochastic responses is derived for nonlinear oscillators subjected to both additive and multiplicative Poisson white noises...

Probability density function | Nonlinear | Generalized FPK equation | Poisson white noise | Oscillator | oscillators | LINEARIZATION | WHITE-NOISE EXCITATION | STOCHASTIC DYNAMICS | DIFFERENTIAL-EQUATIONS | RELIABILITY | RANDOM IMPULSES | DRIVEN SYSTEMS | RESPONSES | Monte Carlo methods | white noise | MECHANICS | DYNAMICAL-SYSTEMS | PATH INTEGRATION | stochastic processes | Speed | Oscillators (Electronics) | Dynamic testing | Geometric probabilities | Mechanical properties | Research | Probabilities | Methods | Combinatorial probabilities | Testing | Poisson processes | Computer simulation | Mathematical analysis | White noise | Nonlinearity | Mathematical models | Excitation | Oscillators | Probability density functions

Probability density function | Nonlinear | Generalized FPK equation | Poisson white noise | Oscillator | oscillators | LINEARIZATION | WHITE-NOISE EXCITATION | STOCHASTIC DYNAMICS | DIFFERENTIAL-EQUATIONS | RELIABILITY | RANDOM IMPULSES | DRIVEN SYSTEMS | RESPONSES | Monte Carlo methods | white noise | MECHANICS | DYNAMICAL-SYSTEMS | PATH INTEGRATION | stochastic processes | Speed | Oscillators (Electronics) | Dynamic testing | Geometric probabilities | Mechanical properties | Research | Probabilities | Methods | Combinatorial probabilities | Testing | Poisson processes | Computer simulation | Mathematical analysis | White noise | Nonlinearity | Mathematical models | Excitation | Oscillators | Probability density functions

Journal Article

Statistics and computing, ISSN 1573-1375, 2005, Volume 15, Issue 4, pp. 267 - 280

.... The normal, Poisson, gamma and inverse Gaussian distributions belong to theTweedie family. Apart from these special cases, Tweedie distributions do not have density functions which can be written in closed form...

Statistics and Computing/Statistics Programs | generalized linear models | stable distributions | compound Poisson distributions | Numeric Computing | Statistics, general | Poisson distribution | Statistics | maximum likelihood estimation | power variance function | gamma distribution | linear exponential family | inverse-Gaussian distribution | Artificial Intelligence (incl. Robotics) | Mathematics, general | Gamma distribution | Power variance function | Maximum likelihood estimation | Inverse-Gaussian distribution | Compound Poisson distributions | Stable distributions | Linear exponential family | Generalized linear models | STATISTICS & PROBABILITY | POWER VARIANCE FUNCTIONS | GENERALIZED LINEAR-MODELS | FAMILIES | ASSAYS | COMPUTER SCIENCE, THEORY & METHODS | QUASI-LIKELIHOOD

Statistics and Computing/Statistics Programs | generalized linear models | stable distributions | compound Poisson distributions | Numeric Computing | Statistics, general | Poisson distribution | Statistics | maximum likelihood estimation | power variance function | gamma distribution | linear exponential family | inverse-Gaussian distribution | Artificial Intelligence (incl. Robotics) | Mathematics, general | Gamma distribution | Power variance function | Maximum likelihood estimation | Inverse-Gaussian distribution | Compound Poisson distributions | Stable distributions | Linear exponential family | Generalized linear models | STATISTICS & PROBABILITY | POWER VARIANCE FUNCTIONS | GENERALIZED LINEAR-MODELS | FAMILIES | ASSAYS | COMPUTER SCIENCE, THEORY & METHODS | QUASI-LIKELIHOOD

Journal Article