Symmetries and stabilization for sheaves of vanishing cycles

Abstract

Let U be a smooth C-scheme, f:U A1 a regular function, and X=Crit(f) the critical locus, as a C-subscheme of U. Then one can define the "perverse sheaf of vanishing cycles" PVU,f, a perverse sheaf on X. This paper proves four main results: (a) Suppose :U U is an isomorphism with f=f and X=idX. Then induces an isomorphism *:PVU,f PVU,f. We show that * is multiplication by det(dX)=1 or -1. (b) PVU,f depends up to canonical isomorphism only on X(3),f(3), for X(3) the third-order thickening of X in U, and f(3)=fX(3):X(3) A1. (c) If U,V are smooth C-schemes, f:U A1, g:V A1 are regular, X=Crit(f), Y=Crit(g), and :U V is an embedding with f=g and X:X Y an isomorphism, there is a natural isomorphism :PVU,fX*(PVV,g) Z2P, for P a natural principal Z2-bundle on X. (d) If (X,s) is an oriented d-critical locus in the sense of Joyce arXiv:1304.4508, there is a natural perverse sheaf PX,s on X, such that if (X,s) is locally modelled on Crit(f:U A1) then PX,s is locally modelled on PVU,f. We also generalize our results to replace U,X by complex analytic spaces, and PVU,f by D-modules, or mixed Hodge modules. We discuss applications of (d) to categorifying Donaldson-Thomas invariants of Calabi-Yau 3-folds, and to defining a 'Fukaya category' of Lagrangians in a complex symplectic manifold using perverse sheaves. This is the third in a series of papers arXiv:1304.4508, arXiv:1305.6302, arXiv:1305.6428, arXiv:1312.0090, arXiv:1403.2403, arXiv:1404.1329, arXiv:1504.00690.