Results of systematic numerical studies of grain boundaries (GBs) betw
een traveling waves are reported. Starting from the two-dimensional (2
D) complex Swift-Hohenberg (SH) equation, we demonstrate that it admit
s steadily moving GBs in the form of sinks and sources. The sinks are
always stable, while the sources may be stable or unstable. Sometimes,
chaotic patterns are also observed. Next, we reduce the 2D SH equatio
n to two coupled 1D SH equations, assuming that the wave field is a su
perposition of two waves with fixed y-components of the corresponding
wave vectors. Direct comparison demonstrates that typical wave pattern
s described by the 2D equation and by the coupled 1D equations are pra
ctically indistinguishable. Within the framework of the latter approxi
mation, we compute dependence of velocities of the sinks and sources u
pon the orientation of the traveling waves. In particular, for nearly
equal wave vectors on both sides of GB, the velocity proves to be clos
e to the mean group velocity of the pattern. In the opposite limit of
nearly antiparallel wave vectors, the sink's velocity is close to an e
arlier analytical prediction (two thirds of the mean group velocity).
We have also considered further simplifications of the coupled 1D SH e
quations, reducing them to coupled Ginzburg-Landau equations, and then
to a nonlinear phase-diffusion equation. The simplified equations sti
ll provide a satisfactory description of various dynamical regimes. Es
pecially, the stability of the stationary source is discussed with the
nonlinear phase-diffusion equation. Finally, we report preliminary re
sults of simulations of patterns containing triple points, produced by
collisions between nonparallel GBs. The triple point may be both stab
le and unstable. (C) 1998 Elsevier Science B.V.