some relations between the metric structure and the ... - Math Berkeley
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some relations between the metric structure and the ... - Math Berkeley
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BULLETIN OF T H E AMERICAN MATHEMATICAL SOCIETY Volume 77, Number 4, July 1971
SOME RELATIONS BETWEEN THE METRIC STRUCTURE AND THE ALGEBRAIC STRUCTURE OF THE FUNDAMENTAL GROUP IN MANIFOLDS OF NONPOSITIVE CURVATURE BY D E T L E F GROMOLL1 AND J O S E P H A. W O L F 2
Communicated by Shlomo Sternberg, October 30, 1970
1. Introduction. Let M be a. complete simply connected riemannian manifold of dimension n and sectional curvature K^O. Working with closed geodesically convex subsets 0 5^ MQ M, we use the fact (see [4] or [ó]) t h a t M is a topological submanifold of M of some dimension k, O^kSn, with totally geodesic interior ° M a n d possibly empty boundary dM. Note that M is star-shaped from every point, thus contractible, and in particular simply connected. Consider a properly discontinuous group T of homeomorphisms of M t h a t acts by isometries on °M. If the elements of T satisfy the semisimplicity condition described below (automatic if T\M is compact), and if S is a solvable subgroup of T, then Theorem 1 exhibits a flat totally geodesic S-stable subspace EC.M, complete in M, such that 2 has finite kernel on E and 2 \ E is compact. Thus S is an extension of a finite group by a crystallographic group of rank dim E. In particular, (i) 2) is finitely generated, (ii) if 2 \ M is compact, then M is a complete flat totally geodesic subspace of M, and (iii) if T\M is a manifold, then the image of E in T\M is a compact totally geodesic euclidean space form. Theorem 1 extends and unifies several results concerning the case where M = M and T\M is a compact manifold. Those results are the classical theorem of Preissmann [7] which says that if K (ii) 2 acts with finite kernel on E, and (iii) H\E is compact. In particular, 2 is finitely generated and is an extension of the finite group $ by a crystallographic group of rank —dim E. PROOF. First suppose 2 abelian. If 5 C 2 denote Cs^ftaes Cc. Let T be the torsion subgroup of S. If TT^ {1} let 1 ^ r C T ; then dim CT < d i m M and T acts as a torsion abelian group on CT. By induction on dimension now T has a fixed point on CT. Thus T is finite and CT?£0. If (Ti£2— T then Cffl meets CT by Lemma 1, so CGXC\CT = DiXEl as in Lemma 2. This starts the recursion with S\ = TVJ {ai}. Now suppose {(Ti, • • • ,
