Abstract:
The class of nonlinear evolution equations (NLEE) – gauge equivalent to the
$N$-wave equations related to the simple Lie algebra $g$ are derived and
analyzed. The corresponding Lax pairs and the time evolution of the
scattering data are found. The Zakharov–Shabat dressing method is
appropriately modified to construct their soliton solutions. Several
examples including ones describing isoparametric hypersurfaces are
presented. The hierarchy of the Hamiltonian structures to the gauge
equivalent systems to the $N$-wave ones is also discussed.