Persistence with Partial Survival

Abstract

We introduce a parameter p, called partial survival, in the persistence of stochastic processes and show that for smooth processes the persistence exponent θ(p) changes continuously with p, θ(0) being the usual persistence exponent. We compute θ(p) exactly for a one-dimensional deterministic coarsening model, and approximately for the diffusion equation. Finally we develop an exact, systematic series expansion for θ(p), in powers of ε=1-p, for a general Gaussian process with finite density of zero crossings.

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