Abstract
Riemannian geometry on the space of (continuous) paths in a manifold $M$ has been studied by Cruzeiro and Malliavin. I will use concepts in path space analysis to define a Levi-Civita connection on free loop space, using the $G^0$ metric. A tangent vector $X$ at a loop $\gamma$ is a vector field along $\gamma$ such that $X(s) \in T_{\gamma(s)}M$. Following closely the calculations done by Fang, the Riemannian curvature $R^{LM}$ is given by $R^{LM}(X,Y)Z (\cdot) = R^M(X(\cdot),Y(\cdot))Z(\cdot)$.
Citation
Adrian P. C. Lim. "Path space and free loop space." Bull. Belg. Math. Soc. Simon Stevin 18 (2) 353 - 374, may 2011. https://doi.org/10.36045/bbms/1307452085
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