Water molecule bond length

Introduction

Classical Mechanics

Newton Equations

${\displaystyle F=ma}$ where ${\displaystyle F=-\nabla V}$. The system is 1D, thus gradient will be differential, and ${\displaystyle F=-{\frac {dV}{dx}}}$.

The mass ${\displaystyle m}$ should be the reduced mass of the oxygen--hydrogen system, but we use mass ${\displaystyle m=1}$ here.

Potential Function

Lennard--Jones potential with dimensionless parameters for TIPS model:

${\displaystyle V(x)=4\left[\left({\frac {1}{x}}\right)^{12}-\left({\frac {1}{x}}\right)^{6}\right]}$

where the distance ${\displaystyle x}$ is given in Ångstroms.

Integration

The finite differences (Euler method) are

${\displaystyle {\begin{aligned}v(t)&={\frac {x(t+\Delta t)-x(t)}{\Delta t}}\\a(t)&={\frac {v(t+\Delta t)-v(t)}{\Delta t}}\end{aligned}}}$ and

${\displaystyle a(t)=-{\frac {{\frac {d}{dx}}(V(x(t)))}{m}}}$

Velocity Verlet Algorithm

A very good and easy to implement integration method is velocity Verlet:

${\displaystyle {\begin{aligned}x(t+\Delta t)&=x(t)+v(t)\Delta t+{\frac {1}{2}}a\Delta t^{2}\\v(t+\Delta t)&=v(t)+{\frac {1}{2}}\left(a(t)+a(t+\Delta t)\right)\Delta t\end{aligned}}}$

where ${\displaystyle a(t)=a(x(t))=-{\frac {1}{m}}{\frac {d}{dx}}V(x(t))}$ is given at Section . . .

Temperature/ Initial distribution

The initial velocity of the hydrogen atom is chosen randomly from the Maxwell-Boltzmann distribution at given temperature ${\displaystyle T}$

${\displaystyle p(v)=\left({\frac {m}{2\pi k_{B}T}}\right)^{1/2}\exp \left[-{\frac {1}{2}}{\frac {mv^{2}}{k_{B}T}}\right]}$

The mean speed (for 3d?) is

${\displaystyle v_{\text{mean}}={\sqrt {\frac {8k_{B}T}{\pi m}}}}$

where ${\displaystyle k_{B}}$ is Boltzmann constant, here ${\displaystyle k_{B}=1}$.

Results

Issues

1D statement

References

D.T.W. Lin and C.-K. Chen: A molecular dynamics simulation of TIP4P and Lennard-Jones water in nanochannel, acta Mechanica 173, 181.194 (2004).