Print Email Facebook Twitter Dissipation in the Abelian sandpile model Title Dissipation in the Abelian sandpile model: Conditions for criticality Author Zaat, Justin (TU Delft Electrical Engineering, Mathematics and Computer Science; TU Delft Delft Institute of Applied Mathematics) Contributor Redig, F.H.J. (mentor) van der Toorn, R. (graduation committee) van Elderen, E.M. (graduation committee) Degree granting institution Delft University of Technology Programme Applied Mathematics Date 2019-07-25 Abstract The Abelian sandpile model was first introduced by Bak, Tang and Wiesenfeld in 1987. Since then, a lot of researchers have studied this model and similar models, all related by the concept of self-organized criticality. In this thesis, we study a variant on the classical model where dissipative and anti-dissipative vertices are incorporated in the model. These have an influence on the critical behaviour of the model. We first introduce a definition of criticality in this model and investigate which levels of dissipation are required to guarantee non-critical behaviour. In studying this variant, we encounter random walks and Green's functions. Subject Probability TheoryMarkov Processrandom walkself-organized systems To reference this document use: http://resolver.tudelft.nl/uuid:35696a58-57e6-4769-be36-1726e6056f7b Embargo date 2019-08-21 Part of collection Student theses Document type bachelor thesis Rights © 2019 Justin Zaat Files PDF BSc_thesis_Justin_Zaat.pdf 818.18 KB Close viewer /islandora/object/uuid:35696a58-57e6-4769-be36-1726e6056f7b/datastream/OBJ/view