Matches in DBpedia 2014 for { <http://dbpedia.org/resource/Holtsmark_distribution> ?p ?o. }
Showing items 1 to 45 of
45
with 100 items per page.
- Holtsmark_distribution abstract "The (one-dimensional) Holtsmark distribution is a continuous probability distribution. The Holtsmark distribution is a special case of a stable distribution with the index of stability or shape parameter equal to 3/2 and skewness parameter of zero. Since equals zero, the distribution is symmetric, and thus an example of a symmetric alpha-stable distribution. The Holtsmark distribution is one of the few examples of a stable distribution for which a closed form expression of the probability density function is known. However, its probability density function is not expressible in terms of elementary functions; rather, the probability density function is expressed in terms of hypergeometric functions.The Holtsmark distribution has applications in plasma physics and astrophysics. In 1919, Norwegian physicist J. Holtsmark proposed the distribution as a model for the fluctuating fields in plasma due to chaotic motion of charged particles. It is also applicable to other types of Coulomb forces, in particular to modeling of gravitating bodies, and thus is important in astrophysics.".
- Holtsmark_distribution thumbnail Levy_distributionPDF.png?width=300.
- Holtsmark_distribution wikiPageID "30783728".
- Holtsmark_distribution wikiPageRevisionID "585383585".
- Holtsmark_distribution cdfImage "325".
- Holtsmark_distribution hasPhotoCollection Holtsmark_distribution.
- Holtsmark_distribution kurtosis "undefined".
- Holtsmark_distribution mean "μ".
- Holtsmark_distribution median "μ".
- Holtsmark_distribution mgf "undefined".
- Holtsmark_distribution mode "μ".
- Holtsmark_distribution name "Holtsmark".
- Holtsmark_distribution parameters "c ∈ — scale parameter".
- Holtsmark_distribution parameters "μ ∈ — location parameter".
- Holtsmark_distribution pdf "expressible in terms of hypergeometric functions; see text".
- Holtsmark_distribution pdfImage "(Symmetric α-stable distributions with unit scale factor; α=1.5 represents the Holtsmark distribution)".
- Holtsmark_distribution pdfImage "325".
- Holtsmark_distribution skewness "undefined".
- Holtsmark_distribution support "x ∈ R".
- Holtsmark_distribution type "continuous".
- Holtsmark_distribution variance "infinite".
- Holtsmark_distribution subject Category:Continuous_distributions.
- Holtsmark_distribution subject Category:Power_laws.
- Holtsmark_distribution subject Category:Probability_distributions.
- Holtsmark_distribution subject Category:Probability_distributions_with_non-finite_variance.
- Holtsmark_distribution subject Category:Stable_distributions.
- Holtsmark_distribution type Abstraction100002137.
- Holtsmark_distribution type Arrangement105726596.
- Holtsmark_distribution type Cognition100023271.
- Holtsmark_distribution type ContinuousDistributions.
- Holtsmark_distribution type Distribution105729036.
- Holtsmark_distribution type ProbabilityDistributionsWithNon-finiteVariance.
- Holtsmark_distribution type PsychologicalFeature100023100.
- Holtsmark_distribution type Structure105726345.
- Holtsmark_distribution comment "The (one-dimensional) Holtsmark distribution is a continuous probability distribution. The Holtsmark distribution is a special case of a stable distribution with the index of stability or shape parameter equal to 3/2 and skewness parameter of zero. Since equals zero, the distribution is symmetric, and thus an example of a symmetric alpha-stable distribution.".
- Holtsmark_distribution label "Holtsmark distribution".
- Holtsmark_distribution label "Loi de Holtsmark".
- Holtsmark_distribution sameAs Loi_de_Holtsmark.
- Holtsmark_distribution sameAs m.0gfg00h.
- Holtsmark_distribution sameAs Q3258326.
- Holtsmark_distribution sameAs Q3258326.
- Holtsmark_distribution sameAs Holtsmark_distribution.
- Holtsmark_distribution wasDerivedFrom Holtsmark_distribution?oldid=585383585.
- Holtsmark_distribution depiction Levy_distributionPDF.png.
- Holtsmark_distribution isPrimaryTopicOf Holtsmark_distribution.