Short loops in surfaces with a circle boundary component
Abstract
It is a classical theorem of Loewner that the systole of a Riemannian torus can be bounded in terms of its area. We answer a question of a similar flavor of Robert Young showing that if T is a Riemannian 2-torus with boundary in R n, such that the boundary curve is a standard unit circle, then the length of the shortest non-contractible loop in T is bounded in terms of the area of T.
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