Figure 1: 125 tori are dropped into a bowl at 5 time steps per frame, resulting in significant deformation and tough collisions. Practical time steps in today’s state-of-the-art simulators typically rely on Newton’s method to solve large systems of nonlinear equations. In practice, this works well for small time steps but is unreliable at large time steps at or near the frame rate, particularly for difficult or stiff simulations. We show that recasting backward Euler as a minimization problem allows Newton’s method to be stabilized by standard optimization techniques with some novel improvements of our own. The resulting solver is capable of solving even the toughest simulations at the 24Hz frame rate and beyond. We show how simple collisio...
115 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1999.In molecular dynamics one sol...
We present a new time-stepping criterion for N-body simulations that is based on the true dynamical ...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
A new paradigm for rigid body simulation is presented and analyzed. Current techniques for rigid bod...
Figure 1: We propose a new “projection-based ” implicit Euler integrator that supports a large varie...
Figure 1: When used to simulate the motion of a cloth sheet with 6561 vertices our method (left) pro...
We develop an algorithm for the efficient and stable simulation of large-scale elastic rod assemblie...
Keyframe animation is a common technique to generate animations of deformable characters and other s...
Study of physical phenomena by means of mathematical models is common in various branches of enginee...
Physical simulated locomotion allows rich and varied interactions with environments and other charac...
We describe a scheme for time integration of mass-spring systems that makes use of a solver based on...
We describe a scheme for time integration of mass-spring systems that makes use of a solver based on...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
The robust handling of collisions and contacts is important in physics-based animation and simulatio...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
115 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1999.In molecular dynamics one sol...
We present a new time-stepping criterion for N-body simulations that is based on the true dynamical ...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...
A new paradigm for rigid body simulation is presented and analyzed. Current techniques for rigid bod...
Figure 1: We propose a new “projection-based ” implicit Euler integrator that supports a large varie...
Figure 1: When used to simulate the motion of a cloth sheet with 6561 vertices our method (left) pro...
We develop an algorithm for the efficient and stable simulation of large-scale elastic rod assemblie...
Keyframe animation is a common technique to generate animations of deformable characters and other s...
Study of physical phenomena by means of mathematical models is common in various branches of enginee...
Physical simulated locomotion allows rich and varied interactions with environments and other charac...
We describe a scheme for time integration of mass-spring systems that makes use of a solver based on...
We describe a scheme for time integration of mass-spring systems that makes use of a solver based on...
A b s t r a c t. This article considers the design and implementation of variable-timestep methods f...
The robust handling of collisions and contacts is important in physics-based animation and simulatio...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
115 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1999.In molecular dynamics one sol...
We present a new time-stepping criterion for N-body simulations that is based on the true dynamical ...
Time integration schemes with a fixed time step, much smaller than the dominant slow time scales of ...