Disaggregation of Long Memory Processes on C∞ Class

Abstract

We prove that a large set of long memory (LM) processes (including classical LM processes and all processes whose spectral densities have a countable number of singularities controlled by exponential functions) are obtained by an aggregation procedure involving short memory (SM) processes whose spectral densities are infinitely differentiable (Cinfty). We show that the Cinfty class of spectral densities is the optimal class to get a general result for disaggregation of LM processes in SM processes, in the sense that the result given in Cinfty class cannot be improved taking for instance analytic functions instead of indefinitely derivable functions.

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