On the maximal correlation of some stochastic processes
Abstract
We study the maximal correlation coefficient R(X,Y) between two stochastic processes X and Y. In the case when (X,Y) is a random walk, we find R(X,Y) using the Cs\'aki-Fischer identity and the lower semicontinuity of the map Law(X,Y) R(X,Y). When (X,Y) is a two-dimensional L\'evy process, we express R(X,Y) in terms of the L\'evy measure of the process and the covariance matrix of the diffusion part of the process. Consequently, for a two-dimensional α-stable random vector (X,Y) with 0<α<2, we express R(X,Y) in terms of α and the spectral measure τ of the α-stable distribution. We also establish analogs and extensions of the Dembo-Kagan-Shepp-Yu inequality and the Madiman-Barron inequality.
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