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Generating function techniques are used to study the probability that an element of a classical group defined over a finite field is separable, cyclic, semisimple or regular. The limits of these probabilities as the dimension tends to infinity are calculated in all cases, and exponential convergence to the limit is proved. These results complement and extend earlier results of the authors, G. E. Wall, and Guralnick & Lubeck.
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Add A Generating Function Approach to the Enumeration of Matrices in Classical Groups over Finite Fields, Generating function techniques are used to study the probability that an element of a classical group defined over a finite field is separable, cyclic, semisimple or regular. The limits of these probabilities as the dimension tends to infinity are calcula, A Generating Function Approach to the Enumeration of Matrices in Classical Groups over Finite Fields to the inventory that you are selling on WonderClubX
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Add A Generating Function Approach to the Enumeration of Matrices in Classical Groups over Finite Fields, Generating function techniques are used to study the probability that an element of a classical group defined over a finite field is separable, cyclic, semisimple or regular. The limits of these probabilities as the dimension tends to infinity are calcula, A Generating Function Approach to the Enumeration of Matrices in Classical Groups over Finite Fields to your collection on WonderClub |