Characterization of a transition in the transport dynamics of a diffusive sandpile by means of recurrence quantification analysis

Mier Maza, Jose Angel; Sánchez Fernández, Luis Raúl; Newman, D.E.

Characterization of a transition in the transport dynamics of a diffusive sandpile by means of recurrence quantification analysis

Author(s): Mier Maza, Jose Angel; Sánchez Fernández, Luis Raúl; Newman, D.E.

Publisher: American Chemical Society (ACS)

Issued date: 2016-08-22

Citation: Mier, J. A., Sánchez, R., & Newman, D. E. (2016). Characterization of a transition in the transport dynamics of a diffusive sandpile by means of recurrence quantification analysis. In Physical Review E, 94(2), 022128-022139

ISSN: 2470-0045

DOI: https://doi.org/10.1103/PhysRevE.94.022128

xmlui.dri2xhtml.METS-1.0.item-contributor-funder: Ministerio de Economía y Competitividad (España)
Universidad Carlos III de Madrid

Sponsor: This research was sponsored by Ministerio de Economia y Competitividad of Spain under Projects No. ENE2012- 31753 and ENE2012-33219. Research supported in part by DOE Office of Science Grant No. DE-FG02-04ER5741 at University of Alaska. Sandpile simulations have been run in Uranus, a supercomputer cluster located at Universidad Carlos III de Madrid (Spain) that has been funded by the Spanish Government via the national projects UNC313-4E-2361, ENE2009-12213-C03-03, ENE2012-33219, and ENE2012- 31753

Publisher version: https://journals.aps.org/pre/abstract/10.1103/PhysRevE.94.022128

Project: Gobierno de España. ENE2009-12213-C03-03
Gobierno de España. ENE2012-33219
Gobierno de España. ENE2012-31753
Indefinido. UNC313-4E-2361

Keywords: Self-organized criticality , Observed chaotic data , Embedding dimension , Turbulent transport , Marginal stability , Fusion plasmas , Time-series , Model , Systems , Plots

URI: http://hdl.handle.net/10016/35669

Abstract:

Recurrence quantification analysis (RQA) is used to characterize a dynamical transition that takes place in the diffusive sandpile. The transition happens when a combination of the drive strength, diffusivity, and overturning size exceeds a critical value. Abo [+]

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