Scaling limit of the odometer of correlated Gaussians on the torus

Bachelor thesis (2018)

Authors

J.B.P. de Graaff Electrical Engineering, Mathematics and Computer Science

Contributors

W.M. Ruszel (mentor)
A. Cipriani (graduation committee member)
E.M. van Elderen (graduation committee member)
Faculty
Electrical Engineering, Mathematics and Computer Science, Electrical Engineering, Mathematics and Computer Science
Copyright: © 2018 Jan de Graaff
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Published Date

02-07-2018

Language

English

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Faculty

Electrical Engineering, Mathematics and Computer Science

Abstract

In the divisible sandpile model, we consider a collection of i.i.d. Gaussian heights on a finite graph. It was shown by Levine et al. (2015) that the odometer function in this case equals a discrete, bi-Laplacian field. Subsequently, Cipriani et al. (2016) proved that the scaling limit of the odometer is a continuum bi-Laplacian field, this time on the unit torus. In this thesis, we will determine the scaling limit of a divisible sandpile with an initial configuration of correlated Gaussians, where the covariance is given by a stationary covariance function K(x-y). We show that after appropriate scaling, the odometer still converges to a bi-Laplacian field on the unit torus.

Files

Bep4.pdf
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