Quasi-Hamiltonian mechanics associated to representations of Lie algebras

S&mitted hy Gorg IIeinig ABSTHACT We prove that the Lie algebra L' : [K,, K\_] = SK,,, [K,,, K,] = \*K,, where s is a real number, K,, is a Hermitian diagonal operator, and K+= K? has nontrivial matrix representations if and only if s > 0.

It has been shown that up to degree shifts any integrable highest weight (or standard) module of level \(k\) for an affine Lie algebra \(g\) can be imbedded in the tensor product of \(k\) copies of level one integrable highest weight modules. When the affine Lie algebra \(g\) is of classical type th

In our previous work (math/0008128), we studied the set Quant(K) of all universal quantization functors of Lie bialgebras over a field K of characteristic zero, compatible with the operations of taking duals and doubles. We showed that Quant ), where G 0 (K) is a universal group and Q Q(K) is a quot

It is nearly twenty years that there exist computer programs to reduce products of Lie algebra irreps. This is a contribution in the field that uses a modern computer language ("C") in a highly structured and object-oriented way. This gives the benefits of high portability, efficiency, and makes it