Exact Calabi-Yau categories and odd-dimensional Lagrangian spheres

Abstract

An exact Calabi-Yau structure, originally introduced by Keller, is a special kind of smooth Calabi-Yau structure in the sense of Kontsevich-Vlassopoulos. For a Weinstein manifold M, the existence of an exact Calabi-Yau structure on the wrapped Fukaya category W(M) imposes strong restrictions on its symplectic topology. Under the cyclic open-closed map constructed by Ganatra, an exact Calabi-Yau structure on W(M) induces a class b in the degree one equivariant symplectic cohomology SHS11(M). Any Weinstein manifold admitting a quasi-dilation in the sense of Seidel-Solomon has an exact Calabi-Yau structure on W(M). We prove that there are many Weinstein manifolds whose wrapped Fukaya categories are exact Calabi-Yau despite the fact the fact there is no quasi-dilation in SH1(M), a typical example is given by the affine hypersurface \x3+y3+z3+w3=1\⊂C4. As an application, we prove the homological essentiality of Lagrangian spheres in many odd-dimensional smooth affine varieties with exact Calabi-Yau wrapped Fukaya categories.