permutation generator - definição. O que é permutation generator. Significado, conceito
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O que (quem) é permutation generator - definição

Random Permutation Statistics; Permutation statistic; Permutation statistics; Random permutation statistic

Cyclic permutation         
  • Matrix]] of <math>\pi</math>
TYPE OF (MATHEMATICAL) PERMUTATION WITH NO FIXED ELEMENT
Transposition (mathematics); Circular permutation; Adjacent transposition; Circular Permutation; Anticyclic permutation
In mathematics, and in particular in group theory, a cyclic permutation (or cycle) is a permutation of the elements of some set X which maps the elements of some subset S of X to each other in a cyclic fashion, while fixing (that is, mapping to themselves) all other elements of X. If S has k elements, the cycle is called a k-cycle.
Electric generator         
  • Hydroelectric power station at [[Gabčíkovo Dam]], [[Slovakia]]
  • Protesters at [[Occupy Wall Street]] using bicycles connected to a motor and one-way diode to charge batteries for their electronics<ref>[http://cityroom.blogs.nytimes.com/2011/10/30/with-generators-gone-wall-street-protesters-try-bicycle-power/ With Generators Gone, Wall Street Protesters Try Bicycle Power], Colin Moynihan, ''New York Times'', 30 October 2011; accessed 2 November 2011</ref>
  • The [[Faraday disk]] was the first electric generator. The horseshoe-shaped magnet ''(A)'' created a magnetic field through the disk ''(D)''. When the disk was turned, this induced an electric current radially outward from the center toward the rim. The current flowed out through the sliding spring contact ''m'', through the external circuit, and back into the center of the disk through the axle.
  • alternating current generator]], c. 1900.
  • Early [[Ganz]] Generator in [[Zwevegem]], [[West Flanders]], [[Belgium]]
  •  R<sub>L</sub>, load resistance
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  • The [[Athlone Power Station]] in [[Cape Town]], [[South Africa]]
  • commutator]] needed for high power applications.
  • Mobile electric generator
  • kVA]] direct-driven power station AC alternator, with a separate belt-driven exciter generator.
  • [[Hippolyte Pixii]]'s dynamo. The commutator is located on the shaft below the spinning magnet.
DEVICE THAT CONVERTS OTHER ENERGY TO ELECTRICAL ENERGY
Generator (device); Electrical generators; Power unit; Electricity generator; Direct-current generator; Emergency vehicle generator; Energy generator; Electric generators; Turbine generator (TG); AC generator; Tachogenerator; Electric power generator; Electrical Generator; Electrical generator; DC Generator; Turbine generator; Energy generation; DC generator; Generator (electricity)
In electricity generation, a generatorAlso called electric generator, electrical generator, and electromagnetic generator. is a device that converts motive power (mechanical energy) into electric power for use in an external circuit.
Induction generator         
  • Equivalent circuit of induction generator
IN ELECTRICITY
Asynchronous generator
·add. ·- A machine built as an induction motor and driven above synchronous speed, thus acting as an alternating-current generator;
- called also asynchronous generator. Below synchronism the machine takes in electrical energy and acts as an induction motor; at synchronism the power component of current becomes zero and changes sign, so that above synchronism the machine (driven for thus purpose by mechanical power) gives out electrical energy as a generator.

Wikipédia

Random permutation statistics

The statistics of random permutations, such as the cycle structure of a random permutation are of fundamental importance in the analysis of algorithms, especially of sorting algorithms, which operate on random permutations. Suppose, for example, that we are using quickselect (a cousin of quicksort) to select a random element of a random permutation. Quickselect will perform a partial sort on the array, as it partitions the array according to the pivot. Hence a permutation will be less disordered after quickselect has been performed. The amount of disorder that remains may be analysed with generating functions. These generating functions depend in a fundamental way on the generating functions of random permutation statistics. Hence it is of vital importance to compute these generating functions.

The article on random permutations contains an introduction to random permutations.