论文信息 - Random Matrices and Brownian Motion

Random Matrices and Brownian Motion

For T ∈ GL n ( F q ), let Ω n ( t, T ) be the number of irreducible factors of degree less than or equal to n t in the characteristic polynomial of T . Let and suppose T is chosen from G L n ( F q ) at random uniformly. We prove that the stochastic process ≺ Z n ( t )≻ t ∈[0, 1] converges to the standard Brownian motion process W ( t ), as n → ∞.

William M. Y. Goh | Eric Schmutz

[1] F. MacWilliams,et al. The Theory of Error-Correcting Codes , 1977 .

[2] R. Graham,et al. An affine walk on the hypercube , 1992 .

[3] Joseph P. S. Kung,et al. The cycle structure of a linear transformation over a finite field , 1981 .

[4] A. V. Skorohod,et al. The theory of stochastic processes , 1974 .

[5] Richard Stong,et al. Some asymptotic results on finite vector spaces , 1988 .

[6] W. J. Thron,et al. Encyclopedia of Mathematics and its Applications. , 1982 .

[7] Boris Pittel,et al. Random permutations and Brownian motion , 1985 .

[8] Edmund Taylor Whittaker,et al. A Course of Modern Analysis , 2021 .

[9] William M. Y. Goh,et al. A Central Limit Theorem on GLn /Fq) , 1991, Random Struct. Algorithms.

[10] Jennie C. Hansen,et al. A Functional Central Limit Theorem for Random Mappings , 1989 .