Symmetries of differential-difference dynamical systems in a two-dimensional lattice

Abstract

Classification of differential-difference equation of the form unm=Fnm(t, \upq\|(p,q)∈ ) are considered according to their Lie point symmetry groups. The set represents the point (n,m) and its six nearest neighbors in a two-dimensional triangular lattice. It is shown that the symmetry group can be at most 12-dimensional for abelian symmetry algebras and 13-dimensional for nonsolvable symmetry algebras.