Factorization problem with intersection

Abstract

We propose a generalization of the factorization method to the case when G is a finite dimensional Lie algebra such that G=G0 M N (direct sum of vector spaces), where G0 is a subalgebra in G, M, N are G0-modules, and G0 +M, G0 +N are subalgebras in G. In particular, we consider the case when G is a -graded Lie algebra. Using this generalization, we construct some top-like systems related to the algebra so(3,1). According to the general scheme, these systems can be reduced to linear systems with variable coefficients. For the top-like systems first integrals and infinitesimal symmetries are found.