Homotopy types of diffeomorphism groups of polar Morse-Bott foliations on lens spaces, 1

Abstract

Let T= S1× D2 be the solid torus, F the Morse-Bott foliation on T into 2-tori parallel to the boundary and one singular circle S1× 0, which is the central circle of the torus T, and D(F,∂ T) the group of diffeomorphisms of T fixed on ∂ T and leaving each leaf of the foliation F invariant. We prove that D(F,∂ T) is contractible. Gluing two copies of T by some diffeomorphism between their boundaries, we will get a lens space Lp,q with a Morse-Bott foliation Fp,q obtained from F on each copy of T. We also compute the homotopy type of the group D(Fp,q) of diffeomorphisms of Lp,q leaving invariant each leaf of Fp,q.