The energy functional on the Virasoro-Bott group with the L²-metric has no local minima
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🧮 math.DG
math.AP
keywords
metricenergyfunctionalgrouplocalminimapathsvirasoro-bott
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The geodesic equation for the right invariant $L^2$-metric (which is a weak Riemannian metric) on each Virasoro-Bott group is equivalent to the KdV-equation. We prove that the corresponding energy functional, when restricted to paths with fixed endpoints, has no local minima. In particular solutions of KdV don't define locally length-minimizing paths.
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