Affine and Finite Lie Algebras and Integrable Toda Field Equations on Discrete Space-Time

Abstract

Difference-difference systems are suggested corresponding to the Cartan matrices of any simple or affine Lie algebra. In the cases of the algebras AN, BN, CN, G2, D3, A1(1), A2(2), D(2)N these systems are proved to be integrable. For the systems corresponding to the algebras A2, A1(1), A2(2) generalized symmetries are found. For the systems A2, B2, C2, G2, D3 complete sets of independent integrals are found. The Lax representation for the difference-difference systems corresponding to AN, BN, CN, A(1)1, D(2)N are presented.