Bott Periodicity for Fibred Cusp Operators
classification
🧮 math.DG
math.AP
keywords
associatedcuspfibredgroupshomotopyidentityk-theoryoperators
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In the framework of fibred cusp operators on a manifold $X$ associated to a boundary fibration $\Phi: \pa X\to Y$, the homotopy groups of the space of invertible smoothing perturbations of the identity are computed in terms of the K-theory of $T^{*}Y$. It is shown that there is a periodicity, namely the odd and the even homotopy groups are isomorphic among themselves. To obtain this result, one of the important steps is the description of the index of a Fredholm smoothing perturbation of the identity in terms of an associated K-class in the K-theory of $T^{*}Y$.
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