Kavli Affiliate: Yukinobu Toda
| First 5 Authors: Tudor Pădurariu, Yukinobu Toda, , ,
| Summary:
Quasi-BPS categories appear as summands in semiorthogonal decompositions of
DT categories for Hilbert schemes of points in the three dimensional affine
space and in the categorical Hall algebra of the two dimensional affine space.
In this paper, we prove several properties of quasi-BPS categories analogous to
BPS sheaves in cohomological DT theory.
We first prove a categorical analogue of Davison’s support lemma, namely that
complexes in the quasi-BPS categories for coprime length and weight are
supported over the small diagonal in the symmetric product of the three
dimensional affine space. The categorical support lemma is used to determine
the torsion-free generator of the torus equivariant K-theory of the quasi-BPS
category of coprime length and weight.
We next construct a bialgebra structure on the torsion free equivariant
K-theory of quasi-BPS categories for a fixed ratio of length and weight. We
define the K-theoretic BPS space as the space of primitive elements with
respect to the coproduct. We show that all localized equivariant K-theoretic
BPS spaces are one dimensional, which is a K-theoretic analogue of the
computation of (numerical) BPS invariants of the three dimensional affine
space.
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