Deterministic Equations of Motion and Phase Ordering Dynamics

B. Zheng

arXiv:cond-mat/9909324·cond-mat.stat-mech·October 31, 2009

Deterministic Equations of Motion and Phase Ordering Dynamics

B. Zheng

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TL;DR

This paper numerically investigates phase ordering in 2D $\

Contribution

It introduces a numerical approach to solving deterministic equations of motion for 2D $\

Findings

01

Dynamic scaling observed in phase ordering

02

Dominance of a fixed point related to minimum energy states

03

Insights into the role of initial randomness in dynamics

Abstract

We numerically solve microscopic deterministic equations of motion for the 2D $ϕ^{4}$ theory with random initial states. Phase ordering dynamics is investigated. Dynamic scaling is found and it is dominated by a fixed point corresponding to the minimum energy of random initial states.

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