Inradius collapsed manifolds with a lower Ricci curvature bound
Abstract
In this paper, we study a family of n-dimensional Riemannian manifolds with boundary having lower bounds on the Ricci curvatures of interior and boundary and on the second fundamental form of boundary. A sequence of manifolds in this family is said to be inradius collapsed if their inradii tend to zero. We prove that the limit space C0 of boundaries of inradius collapsed manifolds admits an isometric involution f, and that the limit of the manifolds themselves is isometric to the quotient space C0/f. As an application, we show that the number of boundary components of inradius collapsed manifolds is at most two. Moreover, we prove that the limit space has a lower Ricci curvature bound and an upper dimension bound in a synthetic sense if in addition their boundaries are non-collapsed.
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