The Connection between Discrete- and Continuous-Time Descriptions of
Gaussian Continuous Processes
- URL: http://arxiv.org/abs/2101.06482v2
- Date: Wed, 20 Jan 2021 11:10:06 GMT
- Title: The Connection between Discrete- and Continuous-Time Descriptions of
Gaussian Continuous Processes
- Authors: Federica Ferretti, Victor Chard\`es, Thierry Mora, Aleksandra M
Walczak, Irene Giardina
- Abstract summary: We show that discretizations yielding consistent estimators have the property of invariance under coarse-graining'
This result explains why combining differencing schemes for derivatives reconstruction and local-in-time inference approaches does not work for time series analysis of second or higher order differential equations.
- Score: 60.35125735474386
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: Learning the continuous equations of motion from discrete observations is a
common task in all areas of physics. However, not any discretization of a
Gaussian continuous-time stochastic process can be adopted in parametric
inference. We show that discretizations yielding consistent estimators have the
property of `invariance under coarse-graining', and correspond to fixed points
of a renormalization group map on the space of autoregressive moving average
(ARMA) models (for linear processes). This result explains why combining
differencing schemes for derivatives reconstruction and local-in-time inference
approaches does not work for time series analysis of second or higher order
stochastic differential equations, even if the corresponding integration
schemes may be acceptably good for numerical simulations.
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