We address the problem of imposing rigid constraints between connected sites in a dynamic computer simulation. For two important cases, the linear and ring topologies, each site is connected to at most two nearest neighbors. The constraint matrix is then invertible in order n operations. We show that, this being the case, a computational method based on a matrix inversion of the linearized constraint equations (MILC SHAKE) can be orders of magnitude faster than the simple SHAKE or RATTLE methods
A new, convenient, and effective energy constraint control is developed from a geometric interpretat...
Automated algorithms for the dynamic analysis and simulation of constrained multibody systems assume...
Stability is a desirable characteristic for linear dynamical systems, but it is often ignored by alg...
We describe a method to impose constraints in a molecular dynamics simulation. A technique developed...
In this article we present a new LINear Constraint Solver (LINCS) for molecular simulations with bon...
We derive a family of efficient constrained dynamics algorithms by formulating an equivalent linear ...
We formulate constrained dynamics as an equality-constrained linear quadratic regulator (LQR) proble...
In this article, we present a new LINear Constraint Solver (LINCS) for molecular simulations with bo...
We present a technique, "Dynamic Constraints," for controlling the positions and orientations of rig...
.LINCS for molecular simulations with bond constraints. The algorithm is inherently stable, as the c...
Simple and efficient way of integrating rigid rotations is presented. The algorithm is stable, secon...
A coupling method is presented that aims at computing the dynamics of constrained mechanical systems...
In molecular dynamics simulations we can often increase the time step by imposing constraints on bon...
This paper introduces a generic way of dealing with a set of different constraints (bilateral, unila...
We present "dynamic constraints," a physically-based technique for constraint-based control of compu...
A new, convenient, and effective energy constraint control is developed from a geometric interpretat...
Automated algorithms for the dynamic analysis and simulation of constrained multibody systems assume...
Stability is a desirable characteristic for linear dynamical systems, but it is often ignored by alg...
We describe a method to impose constraints in a molecular dynamics simulation. A technique developed...
In this article we present a new LINear Constraint Solver (LINCS) for molecular simulations with bon...
We derive a family of efficient constrained dynamics algorithms by formulating an equivalent linear ...
We formulate constrained dynamics as an equality-constrained linear quadratic regulator (LQR) proble...
In this article, we present a new LINear Constraint Solver (LINCS) for molecular simulations with bo...
We present a technique, "Dynamic Constraints," for controlling the positions and orientations of rig...
.LINCS for molecular simulations with bond constraints. The algorithm is inherently stable, as the c...
Simple and efficient way of integrating rigid rotations is presented. The algorithm is stable, secon...
A coupling method is presented that aims at computing the dynamics of constrained mechanical systems...
In molecular dynamics simulations we can often increase the time step by imposing constraints on bon...
This paper introduces a generic way of dealing with a set of different constraints (bilateral, unila...
We present "dynamic constraints," a physically-based technique for constraint-based control of compu...
A new, convenient, and effective energy constraint control is developed from a geometric interpretat...
Automated algorithms for the dynamic analysis and simulation of constrained multibody systems assume...
Stability is a desirable characteristic for linear dynamical systems, but it is often ignored by alg...