Persistence exponents via perturbation theory: MA(1)-processes

Abstract

For the moving average process Xn= n-1+n, n∈N, where ∈R and (i)i -1 is an i.i.d. sequence of normally distributed random variables, we study the persistence probabilities P(X0 0,…, XN 0), for N∞. We exploit that the exponential decay rate λ of that quantity, called the persistence exponent, is given by the leading eigenvalue of a concrete integral operator. This makes it possible to study the problem with purely functional analytic methods. In particular, using methods from perturbation theory, we show that the persistence exponent λ can be expressed as a power series in . Finally, we consider the persistence problem for the Slepian process, transform it into the moving average setup, and show that our perturbation results are applicable.

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