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- Q3726543 subject Q13292588.
- Q3726543 subject Q7013789.
- Q3726543 abstract "In queueing theory, a discipline within the mathematical theory of probability, the Pollaczek–Khinchine formula states a relationship between the queue length and service time distribution Laplace transforms for an M/G/1 queue (where jobs arrive according to a Poisson process and have general service time distribution). The term is also used to refer to the relationships between the mean queue length and mean waiting/service time in such a model.The formula was first published by Felix Pollaczek in 1930 and recast in probabilistic terms by Aleksandr Khinchin two years later. In ruin theory the formula can be used to compute the probability of ultimate ruin (probability of an insurance company going bankrupt).".
- Q3726543 wikiPageWikiLink Q113723.
- Q3726543 wikiPageWikiLink Q1145117.
- Q3726543 wikiPageWikiLink Q13292588.
- Q3726543 wikiPageWikiLink Q17082609.
- Q3726543 wikiPageWikiLink Q175199.
- Q3726543 wikiPageWikiLink Q199691.
- Q3726543 wikiPageWikiLink Q372071.
- Q3726543 wikiPageWikiLink Q3916814.
- Q3726543 wikiPageWikiLink Q3997728.
- Q3726543 wikiPageWikiLink Q5862903.
- Q3726543 wikiPageWikiLink Q617388.
- Q3726543 wikiPageWikiLink Q7013789.
- Q3726543 wikiPageWikiLink Q7128099.
- Q3726543 wikiPageWikiLink Q723638.
- Q3726543 wikiPageWikiLink Q7902862.
- Q3726543 wikiPageWikiLink Q847526.
- Q3726543 comment "In queueing theory, a discipline within the mathematical theory of probability, the Pollaczek–Khinchine formula states a relationship between the queue length and service time distribution Laplace transforms for an M/G/1 queue (where jobs arrive according to a Poisson process and have general service time distribution).".
- Q3726543 label "Pollaczek–Khinchine formula".