Rigidity Conditions for the Boundaries of Submanifolds in a Riemannian Manifold

Abstract

Developing A.D. Aleksandrov's ideas, the first-named author of this article proposed the following approach to study of rigidity problems for the boundary of a C0-submanifold in a smooth Riemannian manifold: Let Y1 be a 2-dimensional compact connected C0-submanifold with nonempty boundary in a 2-dimensional smooth connected Riemannian manifold (X,g) without boundary satisfying the condition Y1(x,y) = x' x, y' y, x',y' ∈ Int Y1 \[l(γx',y', Int Y1)]\ < ∞, if x,y ∈ Y1. Here ∈f[l(γx',y', Int Y1)] is the infimum of the length of smooth paths joining x' and y' in the interior Int Y1 of Y1. In the present paper, we first establish that Y1 is a metric on Y1. Suppose further that Y1 is strictly convex in the metric Y1. Consider another 2-dimensional compact connected C0-submanifold Y2 of X with boundary satisfying the condition Y2(x,y) < ∞, x,y ∈ Y2, and assume that ∂ Y1 and ∂ Y2 are isometric in the metrics Yj, j = 1,2. There appears the following natural question: Under which additional conditions are the boundaries ∂ Y1 and ∂ Y2 of Y1 and Y2 isometric in the metric X of the ambient manifold X? The paper is devoted to the detailed discussions of this question. In it, we in particular obtain a number of new results concerning the rigidity problems for the boundaries of C0-submanifolds in a Riemannian manifold. The case of Yj = X = n, n > 2, is also considered.