Место издания:Centre de Recerca Matem`atica Bellaterra (Barcelona), Spain
Первая страница:33
Последняя страница:34
Аннотация:
One approach of topological analysis of integrable Hamiltonian systems allows
us to describe regular Liouville foliations on 3-dimensional isoenergy surface
$Q^3_{a,b,h} = {f1 = a, f2 = b, H = h}$
using Fomenko-Zieschang invariant. These invariants for all regular Liouville
foliations for Kovalevskaya case on Lie algebra so(4) will be presented in our talk. We will also discuss the topology and bifurcations of Liouville foliations for this system.