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Recurrence and recurrent may refer to: Disease recurrence, also called "relapse" Eternal recurrence, the concept that the universe is perpetually recurring; Historic recurrence, the repetition of similar events in history; Poincaré recurrence theorem, Henri Poincaré's theorem on dynamical systems
In other cases, recurring characters have been given spin-off series of their own, such as Dr. Frasier Crane who originally was a recurring character on Cheers. [4] Kelsey Grammer, along with fellow recurring actor John Ratzenberger were hired for seven episodes, to play Frasier Crane and Cliff Clavin respectively. Cliff was scheduled to recur ...
The easiest way to make a recurrent sequence is to form a periodic sequence, one where the sequence repeats entirely after a given number m of steps. Such a sequence is then uniformly recurrent and n X can be set to any multiple of m that is larger than twice the length of X. A recurrent sequence that is ultimately periodic is purely periodic. [2]
Recurring means occurring repeatedly and can refer to several different things: Mathematics and finance. Recurring expense, an ongoing (continual) expenditure;
The human mind has different mechanisms for processing individual pieces of information and sequences. Videos are sequences of images, audio files are sequences of sound samples, music is ...
Recurrent event analysis is a branch of survival analysis that analyzes the time until recurrences occur, such as recurrences of traits or diseases. Recurrent events are often analyzed in social sciences and medical studies, for example recurring infections, depressions or cancer recurrences.
Rather than select a single definition, Gledhill [3] proposes that collocation involves at least three different perspectives: co-occurrence, a statistical view, which sees collocation as the recurrent appearance in a text of a node and its collocates; [4] [5] [6] construction, which sees collocation either as a correlation between a lexeme and ...
A famous example is the recurrence for the Fibonacci numbers, = + where the order is two and the linear function merely adds the two previous terms. This example is a linear recurrence with constant coefficients , because the coefficients of the linear function (1 and 1) are constants that do not depend on n . {\displaystyle n.}