On the curvature bounded sphere problem in R3
Abstract
We prove that if a topological sphere smoothly embedded into R3 with normal curvatures absolutely bounded by 1 is contained in an open ball of radius 2, then the region it bounds must contain a unit ball. This result suggests a potential direction for a problem formulated by D.Burago and A.Petrunin asking whether a topological sphere smoothly embedded in R3 with normal curvatures absolutely bounded by 1 encloses a volume of at least 43π. The appendix presents an example illustrating an alternative aspect for this problem.
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