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Relaxation to equilibrium of generalized East processes on Zd: Renormalization group analysis and energy-entropy competition

Abstract:
We consider a class of kinetically constrained interacting particle systems on Zd which play a key role in several heuristic qualitative and quantitative approaches to describe the complex behavior of glassy dynamics. With rate one and independently among the vertices of Zd, to each occupation variable ηx ∈{0,1} a new value is proposed by tossing a (1−q)-coin. If a certain local constraint is satisfied by the current configuration the proposed move is accepted, otherwise it is rejected. For d=1, the constraint requires that there is a vacancy at the vertex to the left of the updating vertex. In this case, the process is the well-known East process. On Z2, the West or the South neighbor of the updating vertex must contain a vacancy, similarly, in higher dimensions. Despite of their apparent simplicity, in the limit q↘0 of low vacancy density, corresponding to a low temperature physical setting, these processes feature a rather complicated dynamic behavior with hierarchical relaxation time scales, heterogeneity and universality. Using renormalization group ideas, we first show that the relaxation time on Zd scales as the 1/d-root of the relaxation time of the East process, confirming indications coming from massive numerical simulations. Next, we compute the relaxation time in finite boxes by carefully analyzing the subtle energy-entropy competition, using a multiscale analysis, capacity methods and an algorithmic construction. Our results establish dynamic heterogeneity and a dramatic dependence on the boundary conditions. Finally, we prove a rather strong anisotropy property of these processes: the creation of a new vacancy at a vertex x out of an isolated one at the origin (a seed) may occur on (logarithmically) different time scales which heavily depend not only on the ℓ1-norm of x but also on its direction.
Publication status:
Published
Peer review status:
Peer reviewed

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Publisher copy:
10.1214/15-AOP1011

Authors

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Institution:
University of Oxford
Division:
MPLS
Department:
Statistics
Oxford college:
Lady Margaret Hall
Role:
Author
ORCID:
0000-0003-0387-3432


Publisher:
Institute of Mathematical Statistics
Journal:
Annals of Probability More from this journal
Volume:
44
Issue:
3
Pages:
1817-1863
Publication date:
2016-05-16
Acceptance date:
2015-03-26
DOI:
EISSN:
2168-894X
ISSN:
0091-1798


Keywords:
Pubs id:
pubs:680482
UUID:
uuid:29c0f08f-2208-4308-aa75-d88acd34e6ee
Local pid:
pubs:680482
Source identifiers:
680482
Deposit date:
2018-09-25
ARK identifier:

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