forked from lijiext/lammps
369 lines
16 KiB
Plaintext
369 lines
16 KiB
Plaintext
"LAMMPS WWW Site"_lws - "LAMMPS Documentation"_ld - "LAMMPS Commands"_lc :c
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:link(lws,http://lammps.sandia.gov)
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:link(ld,Manual.html)
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:link(lc,Section_commands.html#comm)
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:line
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kspace_style command :h3
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[Syntax:]
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kspace_style style value :pre
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style = {none} or {ewald} or {ewald/disp} or {ewald/omp} or {pppm} or {pppm/cg} or {pppm/disp} or {pppm/tip4p} or {pppm/stagger} or {pppm/disp/tip4p} or {pppm/gpu} or {pppm/omp} or {pppm/cg/omp} or {pppm/tip4p/omp} or {msm} or {msm/cg} or {msm/omp} or {msm/cg/omp} :ulb,l
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{none} value = none
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{ewald} value = accuracy
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accuracy = desired relative error in forces
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{ewald/disp} value = accuracy
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accuracy = desired relative error in forces
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{ewald/omp} value = accuracy
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accuracy = desired relative error in forces
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{pppm} value = accuracy
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accuracy = desired relative error in forces
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{pppm/cg} value = accuracy (smallq)
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accuracy = desired relative error in forces
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smallq = cutoff for charges to be considered (optional) (charge units)
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{pppm/disp} value = accuracy
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accuracy = desired relative error in forces
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{pppm/tip4p} value = accuracy
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accuracy = desired relative error in forces
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{pppm/disp/tip4p} value = accuracy
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accuracy = desired relative error in forces
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{pppm/gpu} value = accuracy
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accuracy = desired relative error in forces
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{pppm/omp} value = accuracy
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accuracy = desired relative error in forces
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{pppm/cg/omp} value = accuracy
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accuracy = desired relative error in forces
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{pppm/tip4p/omp} value = accuracy
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accuracy = desired relative error in forces
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{pppm/stagger} value = accuracy
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accuracy = desired relative error in forces
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{msm} value = accuracy
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accuracy = desired relative error in forces
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{msm/cg} value = accuracy (smallq)
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accuracy = desired relative error in forces
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smallq = cutoff for charges to be considered (optional) (charge units)
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{msm/omp} value = accuracy
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accuracy = desired relative error in forces
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{msm/cg/omp} value = accuracy (smallq)
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accuracy = desired relative error in forces
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smallq = cutoff for charges to be considered (optional) (charge units) :pre
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:ule
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[Examples:]
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kspace_style pppm 1.0e-4
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kspace_style pppm/cg 1.0e-5 1.0e-6
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kspace style msm 1.0e-4
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kspace_style none :pre
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[Description:]
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Define a long-range solver for LAMMPS to use each timestep to compute
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long-range Coulombic interactions or long-range 1/r^6 interactions.
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Most of the long-range solvers perform their computation in K-space,
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hence the name of this command.
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When such a solver is used in conjunction with an appropriate pair
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style, the cutoff for Coulombic or 1/r^N interactions is effectively
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infinite. If the Coulombic case, this means each charge in the system
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interacts with charges in an infinite array of periodic images of the
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simulation domain.
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Note that using a long-range solver requires use of a matching "pair
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style"_pair.html to perform consistent short-range pairwise
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calculations. This means that the name of the pair style contains a
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matching keyword to the name of the KSpace style, as in this table:
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Pair style : KSpace style
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coul/long : ewald or pppm
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coul/msm : msm
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lj/long or buck/long : disp (for dispersion)
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tip4p/long : tip4p :tb(s=:,ea=c)
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:line
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The {ewald} style performs a standard Ewald summation as described in
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any solid-state physics text.
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The {ewald/disp} style adds a long-range dispersion sum option for
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1/r^6 potentials and is useful for simulation of interfaces
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"(Veld)"_#Veld. It also performs standard Coulombic Ewald summations,
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but in a more efficient manner than the {ewald} style. The 1/r^6
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capability means that Lennard-Jones or Buckingham potentials can be
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used without a cutoff, i.e. they become full long-range potentials.
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The {ewald/disp} style can also be used with point-dipoles
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"(Toukmaji)"_#Toukmaji and is currently the only kspace solver in
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LAMMPS with this capability.
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:line
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The {pppm} style invokes a particle-particle particle-mesh solver
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"(Hockney)"_#Hockney which maps atom charge to a 3d mesh, uses 3d FFTs
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to solve Poisson's equation on the mesh, then interpolates electric
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fields on the mesh points back to the atoms. It is closely related to
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the particle-mesh Ewald technique (PME) "(Darden)"_#Darden used in
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AMBER and CHARMM. The cost of traditional Ewald summation scales as
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N^(3/2) where N is the number of atoms in the system. The PPPM solver
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scales as Nlog(N) due to the FFTs, so it is almost always a faster
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choice "(Pollock)"_#Pollock.
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The {pppm/cg} style is identical to the {pppm} style except that it
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has an optimization for systems where most particles are uncharged.
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Similarly the {msm/cg} style implements the same optimization for {msm}.
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The optional {smallq} argument defines the cutoff for the absolute
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charge value which determines whether a particle is considered charged
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or not. Its default value is 1.0e-5.
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The {pppm/tip4p} style is identical to the {pppm} style except that it
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adds a charge at the massless 4th site in each TIP4P water molecule.
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It should be used with "pair styles"_pair_style.html with a
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{tip4p/long} in their style name.
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The {pppm/stagger} style performs calculations using two different
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meshes, one shifted slightly with respect to the other. This can
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reduce force aliasing errors and increase the accuracy of the method
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for a given mesh size. Or a coarser mesh can be used for the same
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target accuracy, which saves CPU time. However, there is a trade-off
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since FFTs on two meshes are now performed which increases the
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compuation required. See "(Cerutti)"_#Cerutti, "(Neelov)"_#Neelov,
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and "(Hockney)"_#Hockney for details of the method.
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For high relative accuracy, using staggered PPPM allows the mesh size
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to be reduced by a factor of 2 in each dimension as compared to
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regular PPPM (for the same target accuracy). This can give up to a 4x
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speedup in the KSpace time (8x less mesh points, 2x more expensive).
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However, for low relative accuracy, the staggered PPPM mesh size may
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be essentially the same as for regular PPPM, which means the method
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will be up to 2x slower in the KSpace time (simply 2x more expensive).
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For more details and timings, see
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"Section_accelerate"_Section_accelerate.html.
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IMPORTANT NOTE: Using {pppm/stagger} may not give the same increase in
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the accuracy of energy and pressure as it does in forces, so some
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caution must be used if energy and/or pressure are quantities of
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interest, such as when using a barostat.
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:line
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The {pppm/disp} and {pppm/disp/tip4p} styles add a mesh-based long-range
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dispersion sum option for 1/r^6 potentials "(Isele-Holder)"_#Isele-Holder,
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similar to the {ewald/disp} style. The 1/r^6 capability means
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that Lennard-Jones or Buckingham potentials can be used without a cutoff,
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i.e. they become full long-range potentials.
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For these styles, you may want to adjust the default choice of
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parameters by using the "kspace_modify"_kspace_modify.html command.
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This can be done by either choosing the Ewald and grid parameters, or
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by specifying separate accuracies for the real and kspace
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calculations. Further information on the influence of the parameters
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and how to choose them is described in "(Isele-Holder)"_#Isele-Holder
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and "(Isele-Holder2)"_#Isele-Holder2.
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:line
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IMPORTANT NOTE: All of the PPPM styles can be used with
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single-precision FFTs by using the compiler switch -DFFT_SINGLE for
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the FFT_INC setting in your lo-level Makefile. This setting also
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changes some of the PPPM operations (e.g. mapping charge to mesh and
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interpolating electric fields to particles) to be performed in single
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precision. This option can speed-up long-range calulations,
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particularly in parallel or on GPUs. The use of the -DFFT_SINGLE flag
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is discussed in "this section"_Section_start.html#start_2_4 of the
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manual. MSM does not currently support the -DFFT_SINGLE compiler switch.
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:line
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The {msm} style invokes a multi-level summation method MSM solver,
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"(Hardy)"_#Hardy or "(Hardy2)"_#Hardy2, which maps atom charge to a 3d
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mesh, and uses a multi-level hierarchy of coarser and coarser meshes
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on which direct coulomb solves are done. This method does not use
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FFTs and scales as N. It may therefore be faster than the other
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K-space solvers for relatively large problems when running on large
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core counts. MSM can also be used for non-periodic boundary conditions and
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for mixed periodic and non-periodic boundaries.
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MSM is most competitive versus Ewald and PPPM when only relatively
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low accuracy forces, about 1e-4 relative error or less accurate,
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are needed. Note that use of a larger coulomb cutoff (i.e. 15
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angstroms instead of 10 angstroms) provides better MSM accuracy for
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both the real space and grid computed forces.
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Currently calculation of the full pressure tensor in MSM is expensive.
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Using the "kspace_modify"_kspace_modify.html {pressure/scalar yes}
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command provides a less expensive way to compute the scalar pressure
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(Pxx + Pyy + Pzz)/3.0. The scalar pressure can be used, for example,
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to run an isotropic barostat. If the full pressure tensor is needed,
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then calculating the pressure at every timestep or using a fixed
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pressure simulation with MSM will cause the code to run slower.
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:line
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The specified {accuracy} determines the relative RMS error in per-atom
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forces calculated by the long-range solver. It is set as a
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dimensionless number, relative to the force that two unit point
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charges (e.g. 2 monovalent ions) exert on each other at a distance of
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1 Angstrom. This reference value was chosen as representative of the
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magnitude of electrostatic forces in atomic systems. Thus an accuracy
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value of 1.0e-4 means that the RMS error will be a factor of 10000
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smaller than the reference force.
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The accuracy setting is used in conjunction with the pairwise cutoff
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to determine the number of K-space vectors for style {ewald} or the
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grid size for style {pppm} or {msm}.
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Note that style {pppm} only computes the grid size at the beginning of
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a simulation, so if the length or triclinic tilt of the simulation
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cell increases dramatically during the course of the simulation, the
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accuracy of the simulation may degrade. Likewise, if the
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"kspace_modify slab"_kspace_modify.html option is used with
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shrink-wrap boundaries in the z-dimension, and the box size changes
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dramatically in z. For example, for a triclinic system with all three
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tilt factors set to the maximum limit, the PPPM grid should be
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increased roughly by a factor of 1.5 in the y direction and 2.0 in the
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z direction as compared to the same system using a cubic orthogonal
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simulation cell. One way to ensure the accuracy requirement is being
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met is to run a short simulation at the maximum expected tilt or
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length, note the required grid size, and then use the
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"kspace_modify"_kspace_modify.html {mesh} command to manually set the
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PPPM grid size to this value.
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RMS force errors in real space for {ewald} and {pppm} are estimated
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using equation 18 of "(Kolafa)"_#Kolafa, which is also referenced as
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equation 9 of "(Petersen)"_#Petersen. RMS force errors in K-space for
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{ewald} are estimated using equation 11 of "(Petersen)"_#Petersen,
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which is similar to equation 32 of "(Kolafa)"_#Kolafa. RMS force
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errors in K-space for {pppm} are estimated using equation 38 of
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"(Deserno)"_#Deserno. RMS force errors for {msm} are estimated
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using ideas from chapter 3 of "(Hardy)"_#Hardy, with equation 3.197
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of particular note. When using {msm} with non-periodic boundary
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conditions, it is expected that the error estimation will be too
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pessimistic. RMS force errors for dipoles when using {ewald/disp}
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are estimated using equations 33 and 46 of "(Wang)"_#Wang.
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See the "kspace_modify"_kspace_modify.html command for additional
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options of the K-space solvers that can be set, including a {force}
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option for setting an absoulte RMS error in forces, as opposed to a
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relative RMS error.
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:line
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Styles with a {cuda}, {gpu}, {intel}, {kk}, {omp}, or {opt} suffix are
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functionally the same as the corresponding style without the suffix.
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They have been optimized to run faster, depending on your available
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hardware, as discussed in "Section_accelerate"_Section_accelerate.html
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of the manual. The accelerated styles take the same arguments and
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should produce the same results, except for round-off and precision
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issues.
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More specifically, the {pppm/gpu} style performs charge assignment and
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force interpolation calculations on the GPU. These processes are
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performed either in single or double precision, depending on whether
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the -DFFT_SINGLE setting was specified in your lo-level Makefile, as
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discussed above. The FFTs themselves are still calculated on the CPU.
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If {pppm/gpu} is used with a GPU-enabled pair style, part of the PPPM
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calculation can be performed concurrently on the GPU while other
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calculations for non-bonded and bonded force calculation are performed
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on the CPU.
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These accelerated styles are part of the USER-CUDA, GPU, USER-INTEL,
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KOKKOS, USER-OMP, and OPT packages respectively. They are only
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enabled if LAMMPS was built with those packages. See the "Making
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LAMMPS"_Section_start.html#start_3 section for more info.
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See "Section_accelerate"_Section_accelerate.html of the manual for
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more instructions on how to use the accelerated styles effectively.
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[Restrictions:]
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Note that the long-range electrostatic solvers in LAMMPS assume conducting
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metal (tinfoil) boundary conditions for both charge and dipole
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interactions. Vacuum boundary conditions are not currently supported.
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The {ewald/disp}, {ewald}, {pppm}, and {msm} styles support
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non-orthogonal (triclinic symmetry) simulation boxes. However, triclinic
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simulation cells may not yet be supported by suffix versions of these
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styles (such as {pppm/cuda}).
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All of the kspace styles are part of the KSPACE package. They are
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only enabled if LAMMPS was built with that package. See the "Making
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LAMMPS"_Section_start.html#start_3 section for more info. Note that
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the KSPACE package is installed by default.
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For MSM, a simulation must be 3d and one can use any combination of
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periodic, non-periodic, or shrink-wrapped boundaries (specified using
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the "boundary"_boundary.html command).
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For Ewald and PPPM, a simulation must be 3d and periodic in all dimensions.
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The only exception is if the slab option is set with "kspace_modify"_kspace_modify.html,
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in which case the xy dimensions must be periodic and the z dimension must be
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non-periodic.
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[Related commands:]
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"kspace_modify"_kspace_modify.html, "pair_style
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lj/cut/coul/long"_pair_lj.html, "pair_style
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lj/charmm/coul/long"_pair_charmm.html, "pair_style
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lj/long/coul/long"_pair_lj_long.html, "pair_style buck/coul/long"_pair_buck.html
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[Default:]
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kspace_style none :pre
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:line
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:link(Darden)
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[(Darden)] Darden, York, Pedersen, J Chem Phys, 98, 10089 (1993).
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:link(Deserno)
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[(Deserno)] Deserno and Holm, J Chem Phys, 109, 7694 (1998).
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:link(Hockney)
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[(Hockney)] Hockney and Eastwood, Computer Simulation Using Particles,
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Adam Hilger, NY (1989).
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:link(Kolafa)
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[(Kolafa)] Kolafa and Perram, Molecular Simualtion, 9, 351 (1992).
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:link(Petersen)
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[(Petersen)] Petersen, J Chem Phys, 103, 3668 (1995).
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:link(Wang)
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[(Wang)] Wang and Holm, J Chem Phys, 115, 6277 (2001).
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:link(Pollock)
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[(Pollock)] Pollock and Glosli, Comp Phys Comm, 95, 93 (1996).
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:link(Cerutti)
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[(Cerutti)] Cerutti, Duke, Darden, Lybrand, Journal of Chemical Theory
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and Computation 5, 2322 (2009)
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:link(Neelov)
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[(Neelov)] Neelov, Holm, J Chem Phys 132, 234103 (2010)
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:link(Veld)
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[(Veld)] In 't Veld, Ismail, Grest, J Chem Phys, 127, 144711 (2007).
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:link(Toukmaji)
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[(Toukmaji)] Toukmaji, Sagui, Board, and Darden, J Chem Phys, 113,
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10913 (2000).
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:link(Isele-Holder)
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[(Isele-Holder)] Isele-Holder, Mitchell, Ismail, J Chem Phys, 137, 174107 (2012).
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:link(Isele-Holder2)
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[(Isele-Holder2)] Isele-Holder, Mitchell, Hammond, Kohlmeyer, Ismail, J Chem Theory
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Comput 9, 5412 (2013).
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:link(Hardy)
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[(Hardy)] David Hardy thesis: Multilevel Summation for the Fast
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Evaluation of Forces for the Simulation of Biomolecules, University of
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Illinois at Urbana-Champaign, (2006).
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:link(Hardy2)
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[(Hardy)] Hardy, Stone, Schulten, Parallel Computing 35 (2009)
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164-177.
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