About: Telegraph process

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In probability theory, the telegraph process is a memoryless continuous-time stochastic process that shows two distinct values. It models burst noise (also called popcorn noise or random telegraph signal). If the two possible values that a random variable can take are and , then the process can be described by the following master equations: and where is the transition rate for going from state to state and is the transition rate for going from going from state to state . The process is also known under the names Kac process (after mathematician Mark Kac), and dichotomous random process.

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rdf:type	yago:WikicatStochasticDifferentialEquations yago:WikicatStochasticProcesses yago:Abstraction100002137 yago:Cognition100023271 yago:Communication100033020 yago:Concept105835747 yago:Content105809192 yago:DifferentialEquation106670521 yago:Equation106669864 yago:Hypothesis105888929 yago:Idea105833840 yago:MathematicalStatement106732169 yago:Message106598915 yago:Model105890249 yago:PsychologicalFeature100023100 yago:Statement106722453 yago:StochasticProcess113561896
rdfs:label	Proceso telegráfico (es) Telegraph process (en)
rdfs:comment	En la teoría de la probabilidad, el proceso telegráfico es un proceso estocástico de tiempo continuo sin memoria que muestra dos valores distintos. Modela el ruido de explosión (también llamado ruido de pururú o señal de telégrafo aleatoria). Si los dos estados posibles se llaman a y b, el proceso se puede describir mediante las siguientes : y El proceso también se conoce con los nombres de proceso de , y proceso aleatorio dicotómico.. (es) In probability theory, the telegraph process is a memoryless continuous-time stochastic process that shows two distinct values. It models burst noise (also called popcorn noise or random telegraph signal). If the two possible values that a random variable can take are and , then the process can be described by the following master equations: and where is the transition rate for going from state to state and is the transition rate for going from going from state to state . The process is also known under the names Kac process (after mathematician Mark Kac), and dichotomous random process. (en)
dcterms:subject	Stochastic differential equations
Wikipage page ID	11944793 (xsd:integer)
Wikipage revision ID	1117890367 (xsd:integer)
Link from a Wikipage to another Wikipage	Probability distribution Biology Memorylessness Transition rate matrix Correlation function Physics Stock Master equation Exponential decay Exponential distribution Fluorescence Fluorescence intermittency Transcription factor Probability theory Random variable Mark Kac Burst noise Spin (physics) Finance Stochastic differential equations Markov chain List of stochastic processes topics Stochastic process Random telegraph signal Single molecule experiment dbr:Algebraic_tail
sameAs	Telegraph process Telegraph process Telegraph process Telegraph process Telegraph process
dbp:wikiPageUsesTemplate	dbt:Short_description dbt:Stochastic_processes
has abstract	En la teoría de la probabilidad, el proceso telegráfico es un proceso estocástico de tiempo continuo sin memoria que muestra dos valores distintos. Modela el ruido de explosión (también llamado ruido de pururú o señal de telégrafo aleatoria). Si los dos estados posibles se llaman a y b, el proceso se puede describir mediante las siguientes : y El proceso también se conoce con los nombres de proceso de , y proceso aleatorio dicotómico.. (es) In probability theory, the telegraph process is a memoryless continuous-time stochastic process that shows two distinct values. It models burst noise (also called popcorn noise or random telegraph signal). If the two possible values that a random variable can take are and , then the process can be described by the following master equations: and where is the transition rate for going from state to state and is the transition rate for going from going from state to state . The process is also known under the names Kac process (after mathematician Mark Kac), and dichotomous random process. (en)
prov:wasDerivedFrom	wikipedia-en:Telegraph_process?oldid=1117890367&ns=0
page length (characters) of wiki page	4334 (xsd:nonNegativeInteger)
foaf:isPrimaryTopicOf	wikipedia-en:Telegraph_process
is Link from a Wikipage to another Wikipage of	Run-and-tumble motion Continuous stochastic process Kac process Mark Kac Burst noise Catalog of articles in probability theory List of statistics articles List of stochastic processes topics Katz process Dichotomous process Dichotomous random process
is Wikipage redirect of	Kac process Katz process Dichotomous process Dichotomous random process
is known for of	Mark Kac
is known for of	Mark Kac
is foaf:primaryTopic of	wikipedia-en:Telegraph_process

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