A very large class of kinetic growth processes manifest oscillatory behaviour in a variety of physical quantities such as the propagation of the growing interface and the density of the resulting cluster. The authors demonstrate that these oscillations should generically display quasiperiodic behaviour. Using a formalism based on the projection method for quasicrystalline spectra, they elucidate general features such as the dominant frequency and amplitude of the oscillations. They also briefly discuss the effects of interfacial roughening on the spectra of the oscillations.Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/48812/2/jav20i15pL987.pd
The dynamics of fluctuating radially growing interfaces is approached using the formalism of stochas...
The authors have studied fluctuations in the steady state of a modified ballistic deposition model. ...
We investigate Kardar-Parisi-Zhang (KPZ) surface growth in the presence of power-law temporally corr...
The authors describe an up till now unrecognised phenomenon in kinetic growth models which leads to ...
The authors demonstrate the existence of growth oscillations in single clusters of particles grown s...
We study the dynamics of growth at the interface level for two different kinetic models. Both of the...
Understanding the growth of quasicrystals poses a challenging problem, not the least because the qua...
[[abstract]]An extensive analytical and numerical study on a class of growth processes with spatiote...
Abstract The growth mechanism of interfaces in nature may be anomalous in the sense that the inter...
We report on the quantum-mechanical displacement form factor in quasiperiodic and random heterostruc...
Theoretical aspects of crystal growth far from equilibrium are investigated. The study of temporal c...
For stochastic growth models in the Kardar-Parisi-Zhang (KPZ) class in $1+1$ dimensions, fluctuation...
We show by numerical simulations that discretized versions of commonly studied continuum nonlinear g...
The dynamics of a one-dimensional growth model involving attachment and detachment of particles is s...
[[abstract]]We give an extensive study on a class of interfacial superroughening processes with fini...
The dynamics of fluctuating radially growing interfaces is approached using the formalism of stochas...
The authors have studied fluctuations in the steady state of a modified ballistic deposition model. ...
We investigate Kardar-Parisi-Zhang (KPZ) surface growth in the presence of power-law temporally corr...
The authors describe an up till now unrecognised phenomenon in kinetic growth models which leads to ...
The authors demonstrate the existence of growth oscillations in single clusters of particles grown s...
We study the dynamics of growth at the interface level for two different kinetic models. Both of the...
Understanding the growth of quasicrystals poses a challenging problem, not the least because the qua...
[[abstract]]An extensive analytical and numerical study on a class of growth processes with spatiote...
Abstract The growth mechanism of interfaces in nature may be anomalous in the sense that the inter...
We report on the quantum-mechanical displacement form factor in quasiperiodic and random heterostruc...
Theoretical aspects of crystal growth far from equilibrium are investigated. The study of temporal c...
For stochastic growth models in the Kardar-Parisi-Zhang (KPZ) class in $1+1$ dimensions, fluctuation...
We show by numerical simulations that discretized versions of commonly studied continuum nonlinear g...
The dynamics of a one-dimensional growth model involving attachment and detachment of particles is s...
[[abstract]]We give an extensive study on a class of interfacial superroughening processes with fini...
The dynamics of fluctuating radially growing interfaces is approached using the formalism of stochas...
The authors have studied fluctuations in the steady state of a modified ballistic deposition model. ...
We investigate Kardar-Parisi-Zhang (KPZ) surface growth in the presence of power-law temporally corr...