The semisimplicity of an algebra generated by an isometric operator

Let M(clR") be a smooth compact manifold. Recall (see, for instance, [3, 61) that a bounded linear operator S in L,(M) is called an abstract singular operator if the following conditions (axioms) hold: 1. the operator S2 -I is compact (and the operators S f Z are noncompact); 2. the operator S\* -S

We consider the problem of decomposing a semisimple Lie algebra defined over a field of characteristic zero as a direct sum of its simple ideals. The method is based on the decomposition of the action of a Car-tan subalgebra. An implementation of the algorithm in the system ELIAS is discussed at the

{O,l, 2,. .}, dimE = n < co), with maximal deficiency indices (n, n), generated by an infinite Jacobi matrix with matrix entries. A description of all maximal dissipative, maximal accretive, selfadjoint, and other extensions of such a symmetric operator is given in terms of boundary conditions at i