A 'Darboux Theorem' for shifted symplectic structures on derived Artin stacks, with applications

Abstract

This is the fifth in a series arXiv:1304.4508, arXiv:1305,6302, arXiv:1211.3259, arXiv:1305.6428 on the 'k-shifted symplectic derived algebraic geometry' of Pantev, Toen, Vaquie and Vezzosi, arXiv:1111.3209. This paper extends the previous three from (derived) schemes to (derived) Artin stacks. We prove four main results: (a) If (X,ω) is a k-shifted symplectic derived Artin stack for k<0 in the sense of arXiv:1111.3209, then near each x∈ X we can find a 'minimal' smooth atlas :U X with U an affine derived scheme, such that (U,*(ω)) may be written explicitly in coordinates in a standard 'Darboux form'. (b) If (X,ω) is a -1-shifted symplectic derived Artin stack and X' the underlying classical Artin stack, then X' extends naturally to a 'd-critical stack' (X',s) in the sense of arXiv:1304.4508. (c) If (X,s) is an oriented d-critical stack, we can define a natural perverse sheaf PX,s on X, such that whenever T is a scheme and t:T X is smooth of relative dimension n, then T is locally modelled on a critical locus Crit(f:U A1) for U smooth, and t*(PX,s)[n] is locally modelled on the perverse sheaf of vanishing cycles PVU,f of f. (d) If (X,s) is a finite type oriented d-critical stack, we can define a natural motive MFX,s in a ring of motives Mst,μX on X, such that whenever T is a finite type scheme and t:T X is smooth of dimension n, then T is locally modelled on a critical locus Crit(f:U A1) for U smooth, and L-n/2 t*(MFX,s) is locally modelled on the motivic vanishing cycle MFmot,φU,f of f in Mst,μT. Our results have applications to categorified and motivic extensions of Donaldson-Thomas theory of Calabi-Yau 3-folds