Geometric Diffeomorphism Finiteness in Low Dimensions and Homotopy Group Finiteness

Our main result asserts that for any given numbers C and D the class of simply connected closed smooth manifolds of dimension m<7 which admit a Riemannian metric with sectional curvature bounded in absolute value by C and diameter uniformly bounded from above by D contains only finitely many diffeomorphism types. Thus in these dimensions the lower positive bound on volume in Cheeger's Finiteness Theorem can be replaced by a purely topological condition, simply-connectedness. In dimension 4 instead of simply-connectedness here only non-vanishing of the Euler characteristic has to be required. As a topological corollary we obtain that for k+l<7 there are over a given smooth closed l-manifold only finitely many principal $T^k$ bundles with simply connected and non-diffeomorphic total spaces. Furthermore, for any given numbers C and D and any dimension m it is shown that for each natural number i there are up to isomorphism always only finitely many possibilities for the i-th homotopy group of a simply connected closed m-manifold which admits a metric with sectional curvature bounded in absolute value by C and diameter bounded from above by D.