25,784 research outputs found
String Breaking in Four Dimensional Lattice QCD
Virtual quark pair screening leads to breaking of the string between
fundamental representation quarks in QCD. For unquenched four dimensional
lattice QCD, this (so far elusive) phenomenon is studied using the recently
developed truncated determinant algorithm (TDA). The dynamical configurations
were generated on an Athlon 650 MHz PC. Quark eigenmodes up to 420 MeV are
included exactly in these TDA studies performed at low quark mass on large
coarse (but O() improved) lattices. A study of Wilson line correlators in
Coulomb gauge extracted from an ensemble of 1000 two-flavor dynamical
configurations reveals evidence for flattening of the string tension at
distances R approximately 1 fm.Comment: 16 pages, 5 figures, Latex (deleted extraneous eps figure file
The Moonshine Module for Conway's Group
We exhibit an action of Conway's group---the automorphism group of the Leech
lattice---on a distinguished super vertex operator algebra, and we prove that
the associated graded trace functions are normalized principal moduli, all
having vanishing constant terms in their Fourier expansion. Thus we construct
the natural analogue of the Frenkel--Lepowsky--Meurman moonshine module for
Conway's group.
The super vertex operator algebra we consider admits a natural
characterization, in direct analogy with that conjectured to hold for the
moonshine module vertex operator algebra. It also admits a unique
canonically-twisted module, and the action of the Conway group naturally
extends. We prove a special case of generalized moonshine for the Conway group,
by showing that the graded trace functions arising from its action on the
canonically-twisted module are constant in the case of Leech lattice
automorphisms with fixed points, and are principal moduli for genus zero groups
otherwise.Comment: 54 pages including 11 pages of tables; minor revisions in v2,
submitte
Derived Equivalences of K3 Surfaces and Twined Elliptic Genera
We use the unique canonically-twisted module over a certain distinguished
super vertex operator algebra---the moonshine module for Conway's group---to
attach a weak Jacobi form of weight zero and index one to any symplectic
derived equivalence of a projective complex K3 surface that fixes a stability
condition in the distinguished space identified by Bridgeland. According to
work of Huybrechts, following Gaberdiel--Hohenegger--Volpato, any such derived
equivalence determines a conjugacy class in Conway's group, the automorphism
group of the Leech lattice. Conway's group acts naturally on the module we
consider.
In physics the data of a projective complex K3 surface together with a
suitable stability condition determines a supersymmetric non-linear sigma
model, and supersymmetry preserving automorphisms of such an object may be used
to define twinings of the K3 elliptic genus. Our construction recovers the K3
sigma model twining genera precisely in all available examples. In particular,
the identity symmetry recovers the usual K3 elliptic genus, and this signals a
connection to Mathieu moonshine. A generalization of our construction recovers
a number of the Jacobi forms arising in umbral moonshine.
We demonstrate a concrete connection to supersymmetric non-linear K3 sigma
models by establishing an isomorphism between the twisted module we consider
and the vector space underlying a particular sigma model attached to a certain
distinguished K3 surface.Comment: 62 pages including 7 pages of tables; updated references and minor
editing in v.2; to appear in Research in the Mathematical Science
Modular Forms on the Double Half-Plane
We formulate a notion of modular form on the double half-plane for
half-integral weights and explain its relationship to the usual notion of
modular form. The construction we provide is compatible with certain physical
considerations due to the second author.Comment: 17 pages: Minor corrections in text (due to a helpful referee),
updated affiliations. Accepted for publication in the International Journal
for Number Theory (IJNT
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