Statistical mechanics characterization of spatio-compositional inhomogeneity

TL;DR

This paper introduces a multiscale entropic measure to analyze spatio-compositional inhomogeneity in systems like pillar arrangements, capturing subtle disorder features and applied to various complex patterns.

Contribution

It proposes a novel two-component entropic measure for multiscale analysis of inhomogeneity, incorporating constraints on pillar heights and compositions, with broad applicability.

Findings

Effective in quantifying subtle inhomogeneities in complex patterns

Applicable to fractional Brownian motion and laser-speckle pattern analysis

Neglecting certain constraints still yields meaningful correlations

Abstract

On the basis of a model system of pillars built of unit cubes, a two-component entropic measure for the multiscale analysis of spatio-compositional inhomogeneity is proposed. It quantifies the statistical dissimilarity per cell of the actual configurational macrostate and the theoretical reference one that maximizes entropy. Two kinds of disorder compete: i) the spatial one connected with possible positions of pillars inside a cell (the first component of the measure), ii) the compositional one linked to compositions of each local sum of their integer heights into a number of pillars occupying the cell (the second component). As both the number of pillars and sum of their heights are conserved, the upper limit for a pillar height hmax occurs. If due to a further constraint there is the more demanding limit h <= h* < hmax, the exact number of restricted compositions can be then obtained only through the generating function. However, at least for systems with exclusively composition degrees of freedom, we show that the neglecting of the h* is not destructive yet for a nice correlation of the h*-constrained entropic measure and its less demanding counterpart, which is much easier to compute. Given examples illustrate a broad applicability of the measure and its ability to quantify some of the subtleties of a fractional Brownian motion, time evolution of a quasipattern [28,29] and reconstruction of a laser-speckle pattern [2], which are hardly to discern or even missed.