Temperature%20and%20pressure%20coupling

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Title: Temperature%20and%20pressure%20coupling

1
Temperature and pressure coupling

2
Why control the temperature and pressure?

isothermal and isobaric simulations (NPT) are
most relevant to experimental data
constant NPT ensemble constant number of
particles, pressure, and temperature

3
Causes of temperature and pressure fluctuations

4
Temperature coupling methods in GROMACS

weak coupling
exponential relaxation Berendsen
temperature coupling (Berendsen, 1984)
extended system coupling
oscillatory relaxation Nosé-Hoover
temperature coupling (Nosé, 1984 Hoover, 1985)

5
Berendsen temperature coupling

the temperature of a system is related to its
kinetic energy, therefore, the temperature can
be easily altered by scaling the velocities vi by
a factor ?
is the temperature coupling time constant
need to specify in input file (.mdp file)

7
Some notes on Berendsen weak coupling algorithm

very efficient for relaxing a system to the
target temperature
prolonged temperature differences of the separate
components leads to a phenomenon called
hot-solvent, cold-solute, even though the
overall temperature is at the correct value
Solutions
apply temperature coupling separately to the
solute and to the solvent problem with
unequal distribution of energy between the
different components

8
solutions continued

stochastic collisions (Anderson, 1980)
- a random particles velocity is reassigned by
random selection from the Maxwell-Boltzmann
distribution at set intervals does not
generate a smooth trajectory, less realistic
dynamics
extended system (Nosé, 1984 Hoover 1985)
- the thermal reservoir is considered an
integral part of the system and it is represented
by an additional degree of freedom s
- used in GROMACS

9
Nosé-Hoover extended system

canonical ensemble (NVT)
more gentle than Anderson where particles
suddenly gain new random velocities
the Hamiltonian is extended by including a
thermal reservoir term s and a friction parameter
?, in the equations of motion
H K V Ks Vs

10
Nosé-Hoover extended system

The particles equation of motion
? is a dynamic quantity with its own equation of
motion
is proportional to the temperature coupling
time constant (specified in .mdp file)

Nosé-Hoover produces an oscillatory relaxation,
it takes several times longer to relax with
Nosé-Hoover coupling than with weak coupling
can use Berendsen weak coupling for equilibration
to reach desired target, then switch to
Nosé-Hoover
Nosé-Hoover chain the Nose-Hoover thermostat is
coupled to another thermostat or a chain of
thermostats and each are allowed to fluctuate

13
Pressure coupling

The system can be coupled to a pressure bath as
in temperature coupling
weak coupling
exponential relaxation Berendsen pressure
coupling
extended ensemble coupling
oscillatory relaxation Parrinello-Rahman
pressure coupling (Parrinello and Rahman, 1980,
1981, 1982)

14
Berendsen pressure coupling

equations of motion are modified with a
first order relaxation of P towards a
reference Po
rescaling the edges and the atomic coordinates ri
at each step by a factor u leads to volume change
u is proportional to ß which is the isothermal
compressibility of the system and which is the
pressure coupling time constant. Both values
must be specified in .mdp file

Berendsen scaling can be done
1. isotropically scaling factor is equal for
all three directions i.e. in water
2. semi-isotropically where the x/y directions
are scaled independently from the z direction
i.e. lipid bilayer
3. anisotropically scaling factor is
calculated independently for each of the three
axes

16
Parrinello-Rahman pressure coupling

volume and shape are allowed to fluctuate
extra degree of freedom added, similar to
Nosé-Hoover temperature coupling, the Hamiltonian
is extended
box vectors and W-1 are functions of M
W-1 determines the strength of coupling
have to provide ß and
in the input file (.mdp file)

if your system is far from equilibrium, it may be
best to use weak coupling (Berendsen) to reach
target pressure and then switch to
Parrinello-Rahman as in temperature coupling
in most cases the Parrinello-Rahman barostat is
combined with the Nosé-Hoover thermostat
the extended methods are more difficult to
program but safer

18
Weak coupling in .mdp file

19
Extended system coupling in .mdp file

20
References

Berendsen, H.J.C., Postma, J.P.M., DiNola, A.,
Haak, J.R. Molecular dynamics with coupling to an
external bath. J. Chem. Phys. 813684-3690, 1984
Nosé, S. A molecular dynamics method for
simulations in the canonical ensemble. Mol.
Phys. 52255-268, 1984
Hoover, W.G. Canonical dynamics equilibrium
phase-space distributions. Phys. Rev. A
311695-1697, 1985
Berendsen, H.J.C. Transport properties computed
by linear response through weak coupling to a
bath. In Computer Simulations in Material
Science. Meyer, M., Pontikis, V. eds. Kluwer
1991, 139-155
Parrinello, M., Rahman, A. Polymorphic
transitions in single crystals A new molecular
dynamics method. J. Appl. Phys. 527182-7190,
1981
Nosé, S., Klein, M.L. Constant pressure molecular
dynamics for molecular systems. Mol. Phys. 50
1055-1076, 1983