Average signature of geodesic paths in compact Lie groups
Abstract
For any compact connected Lie group G, we introduce a novel notion of average signature A(G) valued in its tensor Lie algebra, by taking the average value of the signature of the unique length-minimizing geodesics between all pairs of generic points in G. we prove that using the average signature together with the trace operation with respect to the given bi-invariant Riemannian metric on G, one can recover certain geometric quantities of G, including the dimension, the diameter, the volume and the scalar curvature.
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