An Isometrical C Pn-Theorem
Abstract
Let Mn\ (n≥3) be a complete Riemannian manifold with M≥ 1, and let Mini (i=1,2) be two comlplete totally geodesic submanifolds in M. We prove that if n1+n2=n-2 and if the distance |M1M2|≥π2, then Mi is isometric to Sni/ Zh, C P ni2 or C P ni2/ Z2 with the canonical metric when ni>0, and thus M is isometric to Sn/ Zh, C P n2 or C P n2/ Z2 except possibly when n=3 and M1 (or M2) iso S1/ Zh with h≥ 2 or n=4 and M1 (or M2) isoRP2.
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