Duality and kernels in microlocal geometry
Abstract
We study the dualizability of sheaves on manifolds with isotropic singular supports Sh(M) and microsheaves with isotropic supports μ sh() and obtain a classification result of colimit-preserving functors by convolutions of sheaf kernels. Moreover, for sheaves with isotropic singular supports and compact supports Shb(M)0, the standard categorical duality and Verdier duality are related by the wrap-once functor, which is the inverse Serre functor in proper objects, and we thus show that the Verdier duality extends naturally to all compact objects Shc(M)0 when the wrap-once functor is an equivalence, for instance, when is a full Legendrian stop or a swappable Legendrian stop.
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