This paper contains a description of one connected component of the space of stability conditions on the bounded derived category of coherent sheaves on a complex algebraic K3 surface.
Let
G
G
be a finite group of automorphisms of a nonsingular three-dimensional complex variety
M
M
, whose canonical bundle
ω
M
\omega _M
is locally trivial as a
G
G
-sheaf. We prove that the Hilbert scheme
Y
=
G
Y = G
-
Hilb
M
\operatorname {Hilb}M
parametrising
G
G
-clusters in
M
M
is a crepant resolution of
X
=
M
/
G
X=M/G
and that there is a derived equivalence (Fourier–Mukai transform) between coherent sheaves on
Y
Y
and coherent 𝐺-sheaves
on
M
M
. This identifies the K theory of
Y
Y
with the equivariant K theory of
M
M
, and thus generalises the classical McKay correspondence. Some higher-dimensional extensions are possible.
Abstract. We prove that moduli spaces of meromorphic quadratic differentials with simple zeroes on compact Riemann surfaces can be identified with spaces of stability conditions on a class of CY 3 triangulated categories defined using quivers with potential associated to triangulated surfaces. We relate the finite-length trajectories of such quadratic differentials to the stable objects of the corresponding stability condition.
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