Litcius/Paper detail

The Fractal Geometry of Growth: Fluctuation–Dissipation Theorem and Hidden Symmetry

Petrus H. R. dos Anjos, Márcio S. Gomes-Filho, Washington S. Alves, David L. Azevedo, Fernando A. Oliveira

2021Frontiers in Physics23 citationsDOIOpen Access PDF

Abstract

Growth in crystals can be usually described by field equations such as the Kardar-Parisi-Zhang (KPZ) equation. While the crystalline structure can be characterized by Euclidean geometry with its peculiar symmetries, the growth dynamics creates a fractal structure at the interface of a crystal and its growth medium, which in turn determines the growth. Recent work by Gomes-Filho et al. ( Results in Physics , 104,435 (2021)) associated the fractal dimension of the interface with the growth exponents for KPZ and provides explicit values for them. In this work, we discuss how the fluctuations and the responses to it are associated with this fractal geometry and the new hidden symmetry associated with the universality of the exponents.

Topics & Concepts

FractalUniversality (dynamical systems)Homogeneous spaceFractal dimensionGeometryMathematicsSymmetry (geometry)Fractal derivativeEuclidean geometryPhysicsMathematical physicsStatistical physicsFractal analysisMathematical analysisCondensed matter physicsTheoretical and Computational PhysicsRandom Matrices and ApplicationsStochastic processes and statistical mechanics