Motivic Donaldson--Thomas invariants of some quantized threefolds

This paper is motivated by the question of how motivic Donaldson--Thomas invariants behave in families. We compute the invariants for some simple families of noncommutative Calabi--Yau threefolds, defined by quivers with homogeneous potentials. These families give deformation quantizations of affine three-space, the resolved conifold, and the resolution of the transversal $A_n$-singularity. It turns out that their invariants are generically constant, but jump at special values of the deformation parameter, such as roots of unity. The corresponding generating series are written in closed form, as plethystic exponentials of simple rational functions. While our results are limited by the standard dimensional reduction techniques that we employ, they nevertheless allow us to conjecture formulae for more interesting cases, such as the elliptic Sklyanin algebras.

[1]  Ben Davison MOTIVIC DONALDSON–THOMAS THEORY AND THE ROLE OF ORIENTATION DATA , 2015, Glasgow Mathematical Journal.

[2]  Ben Davison,et al.  Motivic Donaldson-Thomas invariants for the one-loop quiver with potential , 2011, 1108.5956.

[3]  L. Borisov Class of the affine line is a zero divisor in the Grothendieck ring , 2014, 1412.6194.

[4]  K. Laet Geometry of representations of quantum spaces , 2014, 1405.1938.

[5]  K. Laet,et al.  The Geometry of Representations of 3-Dimensional Sklyanin Algebras , 2014, 1405.1158.

[6]  Shinnosuke Okawa,et al.  Noncommutative quadric surfaces and noncommutative conifolds , 2014, 1403.0713.

[7]  Sven Meinhardt Motivic DT-invariants of (-2)-curves , 2013 .

[8]  N. Iyudu Representation Spaces of the Jordan Plane , 2012, 1209.0746.

[9]  J. Bryan,et al.  Motivic Classes of Commuting Varieties via Power Structures , 2012, 1206.5864.

[10]  Chelsea M. Walton Representation theory of three-dimensional Sklyanin algebras , 2011, 1107.2953.

[11]  S. Mozgovoy,et al.  Motivic Donaldson-Thomas invariants of the conifold and the refined topological vertex , 2011, 1107.5017.

[12]  S. Mozgovoy WALL-CROSSING FORMULAS FOR FRAMED OBJECTS , 2011, 1104.4335.

[13]  Andrew Morrison Motivic invariants of quivers via dimensional reduction , 2011, 1103.3819.

[14]  K. Nagao Wall-crossing of the motivic Donaldson-Thomas invariants , 2011, 1103.2922.

[15]  Ben Davison Invariance of orientation data for ind-constructible Calabi-Yau $A_{\infty}$ categories under derived equivalence , 2010, 1006.5475.

[16]  K. Behrend Donaldson-Thomas type invariants via microlocal geometry , 2009 .

[17]  J. Bryan,et al.  Motivic degree zero Donaldson–Thomas invariants , 2009, 0909.5088.

[18]  Sergei Gukov,et al.  Refined, Motivic, and Quantum , 2009, 0904.1420.

[19]  Yan Soibelman,et al.  Stability structures, motivic Donaldson-Thomas invariants and cluster transformations , 2008, 0811.2435.

[20]  Yinan Song,et al.  A theory of generalized Donaldson–Thomas invariants , 2008, 0810.5645.

[21]  Balázs Szendrői,et al.  Non-commutative Donaldson–Thomas invariants and the conifold , 2008 .

[22]  Balázs Szendrői Non-commutative Donaldson-Thomas theory and the conifold , 2007, 0705.3419.

[23]  M. Bergh,et al.  Some Algebras Associated to Automorphisms of Elliptic Curves , 2007 .

[24]  Ragni Piene,et al.  The Legacy of Niels Henrik Abel , 2004 .

[25]  S. Gusein-Zade,et al.  A power structure over the Grothendieck ring of varieties , 2004 .

[26]  J. Denef,et al.  Geometry on Arc Spaces of Algebraic Varieties , 2000, math/0006050.

[27]  E. Looijenga Motivic measures , 2000, math/0006220.

[28]  Vishnu Jejjala,et al.  Marginal and relevant deformations of /N=4 field theories and non-commutative moduli spaces of vacua , 2000, hep-th/0005087.

[29]  M. Artin Geometry of quantum planes , 1992 .

[30]  M. Bergh,et al.  Modules over regular algebras of dimension 3 , 1991 .

[31]  William F. Schelter,et al.  Graded algebras of global dimension 3 , 1987 .

[32]  N. Fine,et al.  Pairs of commuting matrices over a finite field , 1960 .