On motivic vanishing cycles of critical loci

Abstract

Let U be a smooth scheme over an algebraically closed field K of characteristic zero and f:U A1 a regular function, and write X=Crit(f), as a closed subscheme of U. The motivic vanishing cycle MFU,fφ is an element of the μ-equivariant motivic Grothendieck ring MμX defined by Denef and Loeser math.AG/0006050 and Looijenga math.AG/0006220, and used in Kontsevich and Soibelman's theory of motivic Donaldson-Thomas invariants, arXiv:0811.2435. We prove three main results: (a) MFU,fφ depends only on the third-order thickenings U(3),f(3) of U,f. (b) If V is another smooth scheme, g:V A1 is regular, Y=Crit(g), and :U V is an embedding with f=g and X:X Y an isomorphism, then X*(MFV,gφ) equals MFU,fφ "twisted" by a motive associated to a principal Z2-bundle defined using , where now we work in a quotient ring MμX of MμX. (c) If (X,s) is an "oriented algebraic d-critical locus" in the sense of Joyce arXiv:1304.4508, there is a natural motive MFX,s ∈ MμX, such that if (X,s) is locally modelled on Crit(f:U A1), then MFX,s is locally modelled on MFU,fφ. Using results from arXiv:1305.6302, these imply the existence of natural motives on moduli schemes of coherent sheaves on a Calabi-Yau 3-fold equipped with "orientation data", as required in Kontsevich and Soibelman's motivic Donaldson-Thomas theory arXiv:0811.2435, and on intersections of oriented Lagrangians in an algebraic symplectic manifold. This paper is an analogue for motives of results on perverse sheaves of vanishing cycles proved in arXiv:1211.3259. We extend this paper to Artin stacks in arXiv:1312.0090.