Homotopic properties of the neighborhood of a degenerate periodic solution for integrable Hamiltonian systems with a non-Bottean integral (Q1358558)

In a neighbourhood of a degenerate saddle, there occurs a disintegration of one Liouville torus to a certain number \(s\) of tori: the normal section of the solid torus with \(s\) tori drilled is the disc with certain number of \(p\) holes, and the deformation turns the boundary circle into \(p\) circles; the exterior torus is converted into \(s\) tori which wind \(p/s\) times along the axis. So we have a fiber bundle \(N^p\to B^q_p\to S^1\) with base space \(S^1\) and fiber \(N^p\) which is a disc with \(p\) holes. The author discusses the geometry of the total manifolds \(B^q_p\), in particular the fundamental groups \(\pi_1 (B^q_p)\) and the homotopy equivalence classes.