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arxiv: 1106.1031 · v1 · pith:7XIUPYRTnew · submitted 2011-06-06 · 🧮 math.ST · stat.TH

Statistical inference across time scales

classification 🧮 math.ST stat.TH
keywords scalesmacroscopicmicroscopicstatisticaltimeacrossinferenceintermediate
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We investigate statistical inference across time scales. We take as toy model the estimation of the intensity of a discretely observed compound Poisson process with symmetric Bernoulli jumps. We have data at different time scales: microscopic, intermediate and macroscopic. We quantify the smooth statistical transition from a microscopic Poissonian regime to a macroscopic Gaussian regime. The classical quadratic variation estimator is efficient in both microscopic and macroscopic scales but surprisingly shows a substantial loss of information in the intermediate scale that can be explicitly related to the sampling rate. We discuss the implications of these findings beyond this idealised framework.

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