Matches in DBpedia 2016-04 for { <http://dbpedia.org/resource/Hellinger_distance> ?p ?o }
Showing triples 1 to 56 of
56
with 100 triples per page.
- Hellinger_distance abstract "In probability and statistics, the Hellinger distance (also called Bhattacharyya distance as this was originally introduced by Anil Kumar Bhattacharya) is used to quantify the similarity between two probability distributions. It is a type of f-divergence. The Hellinger distance is defined in terms of the Hellinger integral, which was introduced by Ernst Hellinger in 1909.".
- Hellinger_distance wikiPageID "13035709".
- Hellinger_distance wikiPageLength "7825".
- Hellinger_distance wikiPageOutDegree "37".
- Hellinger_distance wikiPageRevisionID "686715876".
- Hellinger_distance wikiPageWikiLink Absolute_continuity.
- Hellinger_distance wikiPageWikiLink Anil_Kumar_Bhattacharya.
- Hellinger_distance wikiPageWikiLink Asymptotic_theory_(statistics).
- Hellinger_distance wikiPageWikiLink Beta_distribution.
- Hellinger_distance wikiPageWikiLink Beta_function.
- Hellinger_distance wikiPageWikiLink Bhattacharyya_distance.
- Hellinger_distance wikiPageWikiLink Bounded_function.
- Hellinger_distance wikiPageWikiLink Category:F-divergences.
- Hellinger_distance wikiPageWikiLink Category:Probability_theory.
- Hellinger_distance wikiPageWikiLink Category:Statistical_distance_measures.
- Hellinger_distance wikiPageWikiLink Cauchy–Schwarz_inequality.
- Hellinger_distance wikiPageWikiLink Ernst_Hellinger.
- Hellinger_distance wikiPageWikiLink Euclidean_distance.
- Hellinger_distance wikiPageWikiLink Exponential_distribution.
- Hellinger_distance wikiPageWikiLink F-divergence.
- Hellinger_distance wikiPageWikiLink Fisher_information_metric.
- Hellinger_distance wikiPageWikiLink Function_space.
- Hellinger_distance wikiPageWikiLink Hellinger_integral.
- Hellinger_distance wikiPageWikiLink Kullback–Leibler_divergence.
- Hellinger_distance wikiPageWikiLink Lebesgue_measure.
- Hellinger_distance wikiPageWikiLink Lp_space.
- Hellinger_distance wikiPageWikiLink Mathematical_statistics.
- Hellinger_distance wikiPageWikiLink Measure_(mathematics).
- Hellinger_distance wikiPageWikiLink Metric_(mathematics).
- Hellinger_distance wikiPageWikiLink Normal_distribution.
- Hellinger_distance wikiPageWikiLink Poisson_distribution.
- Hellinger_distance wikiPageWikiLink Probability_density_function.
- Hellinger_distance wikiPageWikiLink Probability_distribution.
- Hellinger_distance wikiPageWikiLink Probability_measure.
- Hellinger_distance wikiPageWikiLink Probability_space.
- Hellinger_distance wikiPageWikiLink Probability_theory.
- Hellinger_distance wikiPageWikiLink Radon–Nikodym_theorem.
- Hellinger_distance wikiPageWikiLink Sequential_analysis.
- Hellinger_distance wikiPageWikiLink Total_variation_distance_of_probability_measures.
- Hellinger_distance wikiPageWikiLink Weibull_distribution.
- Hellinger_distance wikiPageWikiLinkText "Hellinger distance".
- Hellinger_distance wikiPageUsesTemplate Template:Cite_book.
- Hellinger_distance wikiPageUsesTemplate Template:Reflist.
- Hellinger_distance subject Category:F-divergences.
- Hellinger_distance subject Category:Probability_theory.
- Hellinger_distance subject Category:Statistical_distance_measures.
- Hellinger_distance comment "In probability and statistics, the Hellinger distance (also called Bhattacharyya distance as this was originally introduced by Anil Kumar Bhattacharya) is used to quantify the similarity between two probability distributions. It is a type of f-divergence. The Hellinger distance is defined in terms of the Hellinger integral, which was introduced by Ernst Hellinger in 1909.".
- Hellinger_distance label "Hellinger distance".
- Hellinger_distance sameAs Q3030678.
- Hellinger_distance sameAs Hellingerabstand.
- Hellinger_distance sameAs Distance_de_Hellinger.
- Hellinger_distance sameAs m.02z456h.
- Hellinger_distance sameAs Khoảng_cách_Hellinger.
- Hellinger_distance sameAs Q3030678.
- Hellinger_distance wasDerivedFrom Hellinger_distance?oldid=686715876.
- Hellinger_distance isPrimaryTopicOf Hellinger_distance.