DBpedia 2014 |

DBpedia 2014

Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Hyperbolic_distribution> ?p ?o. }

Showing items 1 to 27 of 27 with 100 items per page.

Hyperbolic_distribution abstract "The hyperbolic distribution is a continuous probability distribution characterized by the logarithm of the probability density function being a hyperbola. Thus the distribution decreases exponentially, which is more slowly than the normal distribution. It is therefore suitable to model phenomena where numerically large values are more probable than is the case for the normal distribution. Examples are returns from financial assets and turbulent wind speeds. The hyperbolic distributions form a subclass of the generalised hyperbolic distributions.The origin of the distribution is the observation by Ralph Alger Bagnold, published in his book The Physics of Blown Sand and Desert Dunes (1941), that the logarithm of the histogram of the empirical size distribution of sand deposits tends to form a hyperbola. This observation was formalised mathematically by Ole Barndorff-Nielsen in a paper in 1977, where he also introduced the generalised hyperbolic distribution, using the fact the a hyperbolic distribution is a random mixture of normal distributions.Differential equation".
Hyperbolic_distribution wikiPageID "6331574".
Hyperbolic_distribution wikiPageRevisionID "605093085".
Hyperbolic_distribution hasPhotoCollection Hyperbolic_distribution.
Hyperbolic_distribution name "hyperbolic".
Hyperbolic_distribution parameters Location_parameter.
Hyperbolic_distribution parameters "asymmetry parameter".
Hyperbolic_distribution parameters "scale parameter".
Hyperbolic_distribution pdf "denotes a modified Bessel function of the second kind".
Hyperbolic_distribution type "density".
Hyperbolic_distribution subject Category:Continuous_distributions.
Hyperbolic_distribution subject Category:Probability_distributions.
Hyperbolic_distribution type Abstraction100002137.
Hyperbolic_distribution type Arrangement105726596.
Hyperbolic_distribution type Cognition100023271.
Hyperbolic_distribution type ContinuousDistributions.
Hyperbolic_distribution type Distribution105729036.
Hyperbolic_distribution type PsychologicalFeature100023100.
Hyperbolic_distribution type Structure105726345.
Hyperbolic_distribution comment "The hyperbolic distribution is a continuous probability distribution characterized by the logarithm of the probability density function being a hyperbola. Thus the distribution decreases exponentially, which is more slowly than the normal distribution. It is therefore suitable to model phenomena where numerically large values are more probable than is the case for the normal distribution. Examples are returns from financial assets and turbulent wind speeds.".
Hyperbolic_distribution label "Hyperbolic distribution".
Hyperbolic_distribution sameAs m.0g1dgl.
Hyperbolic_distribution sameAs Q5957786.
Hyperbolic_distribution sameAs Q5957786.
Hyperbolic_distribution sameAs Hyperbolic_distribution.
Hyperbolic_distribution wasDerivedFrom Hyperbolic_distribution?oldid=605093085.
Hyperbolic_distribution isPrimaryTopicOf Hyperbolic_distribution.