Perverse coherent extensions on Calabi-Yau threefolds and representations of cohomological Hall algebras

Abstract

For Y X a toric Calabi-Yau threefold resolution and M∈ b(Y)T satisfying some hypotheses, we define a stack M(Y,M) parameterizing perverse coherent extensions of M, iterated extensions of M and the compactly supported perverse coherent sheaves of Bridgeland. We define framed variants M(Y,M), prove that they are equivalent to stacks of representations of framed quivers with potential (Q,W), and deduce natural monad presentations for these sheaves. Moreover, following Soibelman we prove that the homology H( M,ζ(Y,M),W) of the space of ζ-stable, -framed perverse coherent extensions of M, with coefficients in the sheaf W of vanishing cycles for W, is a representation of the Kontsevich-Soibelman cohomological Hall algebra of Y. For M= OY[1], M(Y,M) is the stack of perverse coherent systems of Nagao-Nakajima, so VYζ=H( M,ζ(Y,M),W) is the DT/PT series of Y for ζ=ζ/ by Szendroi and loc. cit., and we conjecture that Yζ is the vacuum module for the quiver Yangian of Li-Yamazaki. For M= OS[1] with S⊂ Y a divisor, M(Y,M) provides a definition in algebraic geometry for Nekrasov's spiked instanton variant of the ADHM construction, and analogous variants of the constructions of Kronheimer-Nakajima, Nakajima-Yoshioka, and Finkelberg-Rybnikov. We conjecture that H( M,ζ(Y,M),W) is the vacuum module of the vertex algebra (Y,S) defined by the authors in a companion paper, generalizing the AGT conjecture to this setting. For Y X=\xy-zmwn\, this gives a geometric approach to the relationship between W-algebras and Yangians for affine m|n.