Proof of Bishop's volume comparison theorem using singular soap bubbles
Abstract
Bishop's volume comparison theorem states that a compact n-manifold with Ricci curvature larger than the standard n-sphere has less volume. While the traditional proof uses geodesic balls, we present another proof using isoperimetric hypersurfaces, also known as "soap bubbles," which minimize area for a given volume. Curiously, isoperimetric hypersurfaces can have codimension 7 singularities, an interesting challenge we are forced to overcome.
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