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Natural divisors and the brownian motion

Eugenijus Manstavičius (1996)

Journal de théorie des nombres de Bordeaux

A model of the Brownian motion defined in terms of the natural divisors is proposed and weak convergence of the related measures in the space $𝐃$ [0,1] is proved. An analogon of the Erdös arcsine law, known for the prime divisors [6] (see [14] for the proof), is obtained. These results together with the author’s investigation [15] extend the systematic study [9] of the distribution of natural divisors. Our approach is based upon the functional limit theorems of probability theory.

Nevanlinna theory, Fuchsian functions and Brownian motion windings.

Jean-Claude Gruet (2002)

Revista Matemática Iberoamericana

Atsuji proposed some integrals along Brownian paths to study the Nevanlinna characteristic function T(f,r) when f is meromorphic in the unit disk D. We show that his criterios does not apply to the basic case when f is a modular elliptic function. The divergence of similar integrals computed along the geodesic flow is also proved. (A)

Displaying 1 – 9 of 9

Natural divisors and the brownian motion

Nevanlinna theory, Fuchsian functions and Brownian motion windings.

Noncolliding Brownian motions and Harish-Chandra formula.

Nondifferentiable functions, Haar null sets and Wiener measure

Nonintersecting planar Brownian motions.

Nonlinear filtering for reflecting diffusions in random environments via nonparametric estimation.

Non-polar points for reflected brownian motion

Note rectificative : “Asymptotic winding of the geodesic flow on modular surfaces and continuous fractions”

Note sur les processus d'Ornstein-Uhlenbeck

Currently displaying 1 – 9 of 9