We introduce a marker-particle method for the computation of three-dimensional solid surface morphologies evolving by surface diffusion. The method does not use gridding of surfaces or numerical differentiation, and applies to surfaces with finite slopes and overhangs. We demonstrate the method by computing the evolution of perturbed cylindrical wires on a substrate. We show that computed growth rates at early times agree with those predicted by the linear stability analysis. Furthermore, when the marker particles are redistributed periodically to maintain even spacing, the method can follow breakup of the wire
This paper develops techniques to locally control curvature and continuity in particle-based surface...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mechanical Engineering, 2019Cat...
In this thesis we explore problems in surface- and diffusion limited growth. Molecular beam epita...
We introduce a marker-particle method for the computation of three-dimensional solid surface morphol...
In this article we propose models and a numerical method for pattern formation on evolving curved su...
A methodology is presented to simulate the growth and interaction of unstable fronts. Such fronts ar...
Kinetics of surface growth with coupled diffusion is studied for the case of growth on a spherical s...
© 2020 Modeling the spontaneous evolution of morphology in natural systems and its preservation by p...
We propose a new numerical method for modeling motion of open curves in two dimensions and open surf...
Reaction-diffusion processes on complex deforming surfaces are fundamental to a number of biological...
In this work we have developed several numerical examples of reaction-diffusion equations with growi...
In this paper we examine spatio-temporal pattern formation in reaction-diffusion systems on the surf...
This paper describes surface evolution formulated in terms of a Hamilton-Jacobi equation and a solut...
Abstract. The paper studies a finite element method for computing transport and diffusion along evol...
We develop numerical methods for solving partial differential equations (PDE) defined on an evolving...
This paper develops techniques to locally control curvature and continuity in particle-based surface...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mechanical Engineering, 2019Cat...
In this thesis we explore problems in surface- and diffusion limited growth. Molecular beam epita...
We introduce a marker-particle method for the computation of three-dimensional solid surface morphol...
In this article we propose models and a numerical method for pattern formation on evolving curved su...
A methodology is presented to simulate the growth and interaction of unstable fronts. Such fronts ar...
Kinetics of surface growth with coupled diffusion is studied for the case of growth on a spherical s...
© 2020 Modeling the spontaneous evolution of morphology in natural systems and its preservation by p...
We propose a new numerical method for modeling motion of open curves in two dimensions and open surf...
Reaction-diffusion processes on complex deforming surfaces are fundamental to a number of biological...
In this work we have developed several numerical examples of reaction-diffusion equations with growi...
In this paper we examine spatio-temporal pattern formation in reaction-diffusion systems on the surf...
This paper describes surface evolution formulated in terms of a Hamilton-Jacobi equation and a solut...
Abstract. The paper studies a finite element method for computing transport and diffusion along evol...
We develop numerical methods for solving partial differential equations (PDE) defined on an evolving...
This paper develops techniques to locally control curvature and continuity in particle-based surface...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mechanical Engineering, 2019Cat...
In this thesis we explore problems in surface- and diffusion limited growth. Molecular beam epita...