DBpedia 2014 |

DBpedia 2014

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

Showing items 1 to 34 of 34 with 100 items per page.

Doob_decomposition_theorem abstract "In the theory of stochastic processes in discrete time, a part of the mathematical theory of probability, the Doob decomposition theorem gives a unique decomposition of every adapted and integrable stochastic process as the sum of a martingale and a predictable process (or "drift") starting at zero. The theorem was proved by and is named for Joseph L. Doob.The analogous theorem in the continuous-time case is the Doob–Meyer decomposition theorem.".
Doob_decomposition_theorem wikiPageID "23360896".
Doob_decomposition_theorem wikiPageRevisionID "602982136".
Doob_decomposition_theorem hasPhotoCollection Doob_decomposition_theorem.
Doob_decomposition_theorem subject Category:Articles_containing_proofs.
Doob_decomposition_theorem subject Category:Martingale_theory.
Doob_decomposition_theorem subject Category:Probability_theorems.
Doob_decomposition_theorem subject Category:Stochastic_processes.
Doob_decomposition_theorem type Abstraction100002137.
Doob_decomposition_theorem type Cognition100023271.
Doob_decomposition_theorem type Communication100033020.
Doob_decomposition_theorem type Concept105835747.
Doob_decomposition_theorem type Content105809192.
Doob_decomposition_theorem type Hypothesis105888929.
Doob_decomposition_theorem type Idea105833840.
Doob_decomposition_theorem type Message106598915.
Doob_decomposition_theorem type Model105890249.
Doob_decomposition_theorem type ProbabilityTheorems.
Doob_decomposition_theorem type Proposition106750804.
Doob_decomposition_theorem type PsychologicalFeature100023100.
Doob_decomposition_theorem type Statement106722453.
Doob_decomposition_theorem type StochasticProcess113561896.
Doob_decomposition_theorem type StochasticProcesses.
Doob_decomposition_theorem type Theorem106752293.
Doob_decomposition_theorem comment "In the theory of stochastic processes in discrete time, a part of the mathematical theory of probability, the Doob decomposition theorem gives a unique decomposition of every adapted and integrable stochastic process as the sum of a martingale and a predictable process (or "drift") starting at zero. The theorem was proved by and is named for Joseph L. Doob.The analogous theorem in the continuous-time case is the Doob–Meyer decomposition theorem.".
Doob_decomposition_theorem label "Doob decomposition theorem".
Doob_decomposition_theorem label "Doob-Zerlegung".
Doob_decomposition_theorem sameAs Doob-Zerlegung.
Doob_decomposition_theorem sameAs m.06w5jw8.
Doob_decomposition_theorem sameAs Q1242398.
Doob_decomposition_theorem sameAs Q1242398.
Doob_decomposition_theorem sameAs Doob_decomposition_theorem.
Doob_decomposition_theorem wasDerivedFrom Doob_decomposition_theorem?oldid=602982136.
Doob_decomposition_theorem isPrimaryTopicOf Doob_decomposition_theorem.