Homotopy types of diffeomorphisms groups of simplest Morse-Bott foliations on lens spaces, 2

Abstract

Let F be a Morse-Bott foliation on the solid torus T=S1× D2 into 2-tori parallel to the boundary and one singular central circle. Gluing two copies of T by some diffeomorphism between their boundaries, one gets a lens space Lp,q with a Morse-Bott foliation Fp,q obtained from F on each copy of T and thus consisting of two singluar circles and parallel 2-tori. In the previous paper [O. Khokliuk, S. Maksymenko, Journ. Homot. Rel. Struct., 2024, 18, 313-356] there were computed weak homotopy types of the groups Dlp(Fp,q) of leaf preserving (i.e. leaving invariant each leaf) diffeomorphisms of such foliations. In the present paper it is shown that the inclusion of these groups into the corresponding group D+fol(Fp,q) of foliated (i.e. sending leaves to leaves) diffeomorphisms which do not interchange singular circles are homotopy equivalences.