1,869 research outputs found
Effects of mode-mode and isospin-isospin correlations on domain formation of disoriented chiral condensates
The effects of mode-mode and isospin-isospin correlations on nonequilibrium
chiral dynamics are investigated by using the method of the time dependent
variational approach with squeezed states as trial states. Our numerical
simulations show that large domains of the disoriented chiral condensate (DCC)
are formed due to the combined effect of the mode-mode and isospin-isospin
correlations. Moreover, it is found that, when the mode-mode correlation is
included, the DCC domain formation is accompanied by the amplification of the
quantum fluctuation, which implies the squeezing of the state. However, neither
the DCC domain formation nor the amplification of the quantum fluctuation is
observed if only the isospin-isospin correlation is included. This suggests
that the mode-mode coupling plays a key role in the DCC domain formation.Comment: 10 pages, 11 figures; Correction of an error in Fig.
Scale Transformations on the Noncommutative Plane and the Seiberg-Witten Map
We write down three kinds of scale transformations {\tt i-iii)} on the
noncommutative plane. {\tt i)} is the analogue of standard dilations on the
plane, {\tt ii)} is a re-scaling of the noncommutative parameter , and
{\tt iii)} is a combination of the previous two, whereby the defining relations
for the noncommutative plane are preserved. The action of the three
transformations is defined on gauge fields evaluated at fixed coordinates and
.
The transformations are obtained only up to terms which transform covariantly
under gauge transformations. We give possible constraints on these terms. We
show how the transformations {\tt i)} and {\tt ii)} depend on the choice of
star product, and show the relation of {\tt ii)} to Seiberg-Witten
transformations. Because {\tt iii)} preserves the fundamental commutation
relations it is a symmetry of the algebra. One has the possibility of
implementing it as a symmetry of the dynamics, as well, in noncommutative field
theories where is not fixed.Comment: 20 page
Secondary phi meson peak as an indicator of QCD phase transition in ultrarelativistic heavy ion collisions
In a previous paper, we have shown that a double phi peak structure appears
in the dilepton invariant mass spectrum if a first order QCD phase transition
occurs in ultrarelativistic heavy ion collisions. Furthermore, the transition
temperature can be determined from the transverse momentum distribution of the
low mass phi peak. In this work, we extend the study to the case that a smooth
crossover occurs in the quark-gluon plasma to the hadronic matter transition.
We find that the double phi peak structure still exists in the dilepton
spectrum and thus remains a viable signal for the formation of the quark-gluon
plasma in ultrarelativistic heavy ion collisions.Comment: 8 pages, 9 uuencoded postscript figures included, Latex, LBL-3572
Wilson-like real-space renormalization group and low-energy effective spectrum of the XXZ chain in the critical regime
We present a novel real-space renormalization group(RG) for the
one-dimensional XXZ model in the critical regime, reconsidering the role of the
cut-off parameter in Wilson's RG for the Kondo impurity problem. We then
demonstrate the RG calculation for the XXZ chain with the free boundary.
Comparing the hierarchical structure of the obtained low-energy spectrum with
the Bethe ansatz result, we find that the proper scaling dimension is
reproduced as a fixed point of the RG transformation.Comment: 4 pages, 6 figures, typos corrected, final versio
Supertubes in Matrix model and DBI action
We show the equivalence between the supertube solutions with an arbitrary
cross section in two different actions, the DBI action for the D2-brane and the
matrix model action for the D0-branes. More precisely, the equivalence between
the supertubes in the D2-brane picture and the D0-brane picture is shown in the
boundary state formalism which is valid for all order in \alpha'. This is an
application of the method using the infinitely many D0-branes and
anti-D0-branes which was used to show other equivalence relations between two
seemingly different D-brane systems, including the D-brane realization of the
ADHM construction of instanton. We also apply this method to the superfunnel
type solutions successfully.Comment: 24 pages, references added, version to appear in JHE
Nonabelian Gauge Theories on Noncommutative Spaces
In this paper, we describe a method for obtaining the nonabelian
Seiberg-Witten map for any gauge group and to any order in theta. The equations
defining the Seiberg-Witten map are expressed using a coboundary operator, so
that they can be solved by constructing a corresponding homotopy operator. The
ambiguities, of both the gauge and covariant type, which arise in this map are
manifest in our formalism.Comment: 14 pages, latex, Talk presented at 2001: A Spacetime Odyssey -
Michigan Center for Theoretical Physics, some typos correcte
Nonequilibrium chiral dynamics by the time dependent variational approach with squeezed states
We investigate the inhomogeneous chiral dynamics of the O(4) linear sigma
model in 1+1 dimensions using the time dependent variational approach in the
space spanned by the squeezed states. We compare two cases, with and without
the Gaussian approximation for the Green's functions. We show that mode-mode
correlation plays a decisive role in the out-of-equilibrium quantum dynamics of
domain formation and squeezing of states.Comment: 5 pages, 4 figures. RevTex, version to appear in Phys. Rev. C. Rapid
Communicatio
Noncommutativity and Tachyon Condensation
We study the fuzzy or noncommutative Dp-branes in terms of infinitely many
unstable D0-branes, from which we can construct any Dp-branes. We show that the
tachyon condensation of the unstable D0-branes induces the noncommutativity. In
the infinite tachyon condensation limit, most of the unstable D0-branes
disappear and remaining D0-branes are actually the BPS D0-branes with the
correct noncommutative coordinates. For the fuzzy S^2 case, we explicitly show
only the D0-branes corresponding to the lowest Landau level survive in the
limit. We also show that a boundary state for a Dp-brane satisfying the
Dirichlet boundary condition on a curved submanifold embedded in the flat space
is not localized on the submanifold. This implies that the Dp-brane on it is
ambiguous at the string scale and solves the problem for a spherical D2-brane
with a unit flux on the world volume which should be equivalent to one
D0-brane. We also discuss the diffeomorphism in the D0-brane picture.Comment: 30 pages, references added, minor corrections and clarifications,
version to appear in JHE
Boundary susceptibility in the spin-1/2 chain: Curie like behavior without magnetic impurities
We investigate the low-temperature thermodynamics of the spin-1/2 Heisenberg
chain with open ends. On the basis of boundary conformal field theory arguments
and numerical density matrix renormalization group calculations, it is
established that in the isotropic case the impurity susceptibility exhibits a
Curie-like divergent behavior as the temperature decreases, even in the absence
of magnetic impurities. A similar singular temperature dependence is also found
in the boundary contributions of the specific heat coefficient. In the
anisotropic case, for , these boundary quantities still show
singular temperature dependence obeying a power law with an anomalous
dimension. Experimental consequences will be discussed.Comment: 5 pages, 1 figure, final versio
Influence of source evolution on particle correlations
Modification of the particles in the course of the source evolution is
considered. Influence of this effect on multiplicities and correlations of the
particles is displayed, including an enhancement of the production rates and
identical particle correlations and also back-to-back particle-antiparticle
correlations.Comment: 9 page
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