Microlocal branes are constructible sheaves
Abstract
Let be a real analytic manifold, and let be its cotangent bundle. In a recent paper with E. Zaslow \cite{NZ}, we showed that the dg category of constructible sheaves on quasi-embeds into the triangulated envelope of the Fukaya category of . We prove here that the quasi-embedding is in fact a quasi-equivalence. When is complex, one may interpret this as a topological analogue of the identification of Lagrangian branes in and holonomic -modules developed by Kapustin and Kapustin-Witten from a physical perspective. As a concrete application, we show that compact connected exact Lagrangians in (with some modest homological assumptions) are equivalent in the Fukaya category to the zero section. In particular, this determines their (complex) cohomology ring and homology class in , and provides a homological bound on their number of intersection points. An independent characterization of compact branes in has recently been obtained by Fukaya-Seidel-Smith.
Cite
@article{arxiv.math/0612399,
title = {Microlocal branes are constructible sheaves},
author = {David Nadler},
journal= {arXiv preprint arXiv:math/0612399},
year = {2009}
}
Comments
49 pages; minor expository changes