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Rademacher-Walsh functions and the spectral type of Hermite polynomial of a Wiener process

M. N. Lukić (1989)

Matematički Vesnik

Radonification of cylindrical semimartingales on Hilbert spaces

Albert Badrikian, Ali Süleyman Üstünel (1996)

Annales mathématiques Blaise Pascal

Random coefficients bifurcating autoregressive processes

Benoîte de Saporta, Anne Gégout-Petit, Laurence Marsalle (2014)

ESAIM: Probability and Statistics

This paper presents a new model of asymmetric bifurcating autoregressive process with random coefficients. We couple this model with a Galton−Watson tree to take into account possibly missing observations. We propose least-squares estimators for the various parameters of the model and prove their consistency, with a convergence rate, and asymptotic normality. We use both the bifurcating Markov chain and martingale approaches and derive new results in both these frameworks.

Random discrete distributions derived from self-similar random sets.

Pitman, Jim, Yor, Marc (1996)

Electronic Journal of Probability [electronic only]

Random fields and random sampling

Sandra Dias, Maria da Graça Temido (2019)

Kybernetika

We study the limiting distribution of the maximum value of a stationary bivariate real random field satisfying suitable weak mixing conditions. In the first part, when the double dimensions of the random samples have a geometric growing pattern, a max-semistable distribution is obtained. In the second part, considering the random field sampled at double random times, a mixture distribution is established for the limiting distribution of the maximum.

Random fields on the adele ring and Wilson's renormalization group

M. D. Missarov (1989)

Annales de l'I.H.P. Physique théorique

Random Fourier series on locally compact abelian groups

Michael B. Marcus, Gilles Pisier (1979)

Séminaire de probabilités de Strasbourg

Random fractals generated by a local Gaussian process indexed by a class of functions

Claire Coiffard (2012)

ESAIM: Probability and Statistics

In this paper, we extend the results of Orey and Taylor [S. Orey and S.J. Taylor, How often on a Brownian path does the law of the iterated logarithm fail? Proc. London Math. Soc.28 (1974) 174–192] relative to random fractals generated by oscillations of Wiener processes to a multivariate framework. We consider a setup where Gaussian processes are indexed by classes of functions.

Random fractals generated by a local gaussian process indexed by a class of functions

Claire Coiffard (2011)

ESAIM: Probability and Statistics

In this paper, we extend the results of Orey and Taylor [S. Orey and S.J. Taylor, How often on a Brownian path does the law of the iterated logarithm fail? Proc. London Math. Soc. 28 (1974) 174–192] relative to random fractals generated by oscillations of Wiener processes to a multivariate framework. We consider a setup where Gaussian processes are indexed by classes of functions.

Random functionals on K{M_{p}} spaces

Ch. Swartz, D. Myers (1971)

Studia Mathematica

Random hysteresis loops

Gioia Carinci (2013)

Annales de l'I.H.P. Probabilités et statistiques

Dynamical hysteresis is a phenomenon which arises in ferromagnetic systems below the critical temperature as a response to adiabatic variations of the external magnetic field. We study the problem in the context of the mean-field Ising model with Glauber dynamics, proving that for frequencies of the magnetic field oscillations of order $N^{- 2 / 3}$ , $N$ the size of the system, the “critical” hysteresis loop becomes random.

Random Integrals and Type and Cotype of Banach Space.

Eva Rowecka (1986)

Mathematische Zeitschrift

Random Markov Mappings.

Robert Atalla, Robert Sine (1976)

Mathematische Annalen

Random measures and harmonizable sequences

K. Urbanik (1968)

Studia Mathematica

Random $n$ -ary sequence and mapping uniformly distributed

Nguyen Van Ho, Nguyen Thi Hoa (1995)

Applications of Mathematics

Višek [3] and Culpin [1] investigated infinite binary sequence $X = (X_{1}, X_{2}, \dots)$ with $X_{i}$ taking values $0$ or $1$ at random. They investigated also real mappings $H (X)$ which have the uniform distribution on $[0; 1]$ (notation $𝒰 (0; 1)$ ). The problem for $n$ -ary sequences is dealt with in this paper.

Random priority two-person full-information best choice problem with imperfect observation

Zdzisław Porosiński, Krzysztof Szajowski (2000)

Applicationes Mathematicae

The following version of the two-player best choice problem is considered. Two players observe a sequence of i.i.d. random variables with a known continuous distribution. The random variables cannot be perfectly observed. Each time a random variable is sampled, the sampler is only informed whether it is greater than or less than some level specified by him. The aim of the players is to choose the best observation in the sequence (the maximal one). Each player can accept at most one realization of...

Random processes with convex coordinates on triangular graphs.

Boyd, J.N., Raychowdhury, P.N. (1997)

International Journal of Mathematics and Mathematical Sciences

Random real trees

Jean-François Le Gall (2006)

Annales de la faculté des sciences de Toulouse Mathématiques

We survey recent developments about random real trees, whose prototype is the Continuum Random Tree (CRT) introduced by Aldous in 1991. We briefly explain the formalism of real trees, which yields a neat presentation of the theory and in particular of the relations between discrete Galton-Watson trees and continuous random trees. We then discuss the particular class of self-similar random real trees called stable trees, which generalize the CRT. We review several important results concerning stable...

Random sequences with normal covariances

Jiří Michálek (1987)

Kybernetika

Random set functions

Jiří Michálek (1982)

Kybernetika

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