We demonstrate the acceleration potential of the Chebyshev semi-iterative approach for fluid simulations in Projective Dynamics. The Chebyshev approach has been successfully tested for deformable bodies, where the dynamical system behaves relatively linearly, even though Projective Dynamics, in general, is fundamentally nonlinear. The results for more complex constraints, like fluids, with a particular nonlinear dynamical system, remained unknown so far. We follow a method describing particle-based fluids in Projective Dynamics while replacing the Conjugate Gradient solver with Chebyshev’s method. Our results show that Chebyshev’s method can be successfully applied to fluids and potentially other complex constraints to accelerate simulation...
We describe an algorithm for performing Stokesian dynamics (SD) simulations of suspensions of arbitr...
In this work we consider a coupled partial differential equation (PDE) model which has appeared in t...
The main subject of this dissertation is smooth incompressible fluids. The emphasis is on the incomp...
We demonstrate the acceleration potential of the Chebyshev semi-iterative approach for fluid simulat...
We present a new method for particle based fluid simulation, using a combination of Projective Dynam...
We present a new method for implicit time integration of physical systems. Our approach builds a bri...
In this thesis, we consider the numerical solution of four kinds of linear systems: saddle-point pro...
The study of the stability of a dynamical system described by a set of partial differential equation...
This thesis presents new methods to simulate systems with hydrodynamic and electrostatic interaction...
Lateral diffusion along membranes is an important transport mecha-nism in biology. Dynamical simulat...
iv This dissertation presents efficient and scalable algorithms for the simulation of in-compressibl...
In Computer Graphics the fluid simulation plays a relevant role. Amongst the existing methods, the S...
Figure 1: We propose a new “projection-based ” implicit Euler integrator that supports a large varie...
A hybrid numerical method of particle-continuum dynamics designed for micro-fluidics is being develo...
Discrete simulation methods are efficient tools to investigate the behaviors of complex fluids such ...
We describe an algorithm for performing Stokesian dynamics (SD) simulations of suspensions of arbitr...
In this work we consider a coupled partial differential equation (PDE) model which has appeared in t...
The main subject of this dissertation is smooth incompressible fluids. The emphasis is on the incomp...
We demonstrate the acceleration potential of the Chebyshev semi-iterative approach for fluid simulat...
We present a new method for particle based fluid simulation, using a combination of Projective Dynam...
We present a new method for implicit time integration of physical systems. Our approach builds a bri...
In this thesis, we consider the numerical solution of four kinds of linear systems: saddle-point pro...
The study of the stability of a dynamical system described by a set of partial differential equation...
This thesis presents new methods to simulate systems with hydrodynamic and electrostatic interaction...
Lateral diffusion along membranes is an important transport mecha-nism in biology. Dynamical simulat...
iv This dissertation presents efficient and scalable algorithms for the simulation of in-compressibl...
In Computer Graphics the fluid simulation plays a relevant role. Amongst the existing methods, the S...
Figure 1: We propose a new “projection-based ” implicit Euler integrator that supports a large varie...
A hybrid numerical method of particle-continuum dynamics designed for micro-fluidics is being develo...
Discrete simulation methods are efficient tools to investigate the behaviors of complex fluids such ...
We describe an algorithm for performing Stokesian dynamics (SD) simulations of suspensions of arbitr...
In this work we consider a coupled partial differential equation (PDE) model which has appeared in t...
The main subject of this dissertation is smooth incompressible fluids. The emphasis is on the incomp...