A complete characterization of a correlated Bernoulli process
Abstract
We present a complete characterization of the asymptotic behaviour of a correlated Bernoulli sequence which depends on the parameter θ ∈ [0,1]. A martingale theory based approach will allow us to prove versions of the law of large numbers, quadratic strong law, law of iterated logarithm, almost sure central limit theorem and functional central limit theorem, in the case θ 1/2. For θ > 1/2, we will obtain a strong convergence to a non-degenerated random variable, including a central limit theorem and a law of iterated logarithm for the fluctuations.
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