13,279 research outputs found
Critical exponents of a three dimensional O(4) spin model
By Monte Carlo simulation we study the critical exponents governing the
transition of the three-dimensional classical O(4) Heisenberg model, which is
considered to be in the same universality class as the finite-temperature QCD
with massless two flavors. We use the single cluster algorithm and the
histogram reweighting technique to obtain observables at the critical
temperature. After estimating an accurate value of the inverse critical
temperature \Kc=0.9360(1), we make non-perturbative estimates for various
critical exponents by finite-size scaling analysis. They are in excellent
agreement with those obtained with the expansion method with
errors reduced to about halves of them.Comment: 25 pages with 8 PS figures, LaTeX, UTHEP-28
From Uncertainty Data to Robust Policies for Temporal Logic Planning
We consider the problem of synthesizing robust disturbance feedback policies
for systems performing complex tasks. We formulate the tasks as linear temporal
logic specifications and encode them into an optimization framework via
mixed-integer constraints. Both the system dynamics and the specifications are
known but affected by uncertainty. The distribution of the uncertainty is
unknown, however realizations can be obtained. We introduce a data-driven
approach where the constraints are fulfilled for a set of realizations and
provide probabilistic generalization guarantees as a function of the number of
considered realizations. We use separate chance constraints for the
satisfaction of the specification and operational constraints. This allows us
to quantify their violation probabilities independently. We compute disturbance
feedback policies as solutions of mixed-integer linear or quadratic
optimization problems. By using feedback we can exploit information of past
realizations and provide feasibility for a wider range of situations compared
to static input sequences. We demonstrate the proposed method on two robust
motion-planning case studies for autonomous driving
A Swendsen-Wang update algorithm for the Symanzik improved sigma model
We study a generalization of Swendsen-Wang algorithm suited for Potts models
with next-next-neighborhood interactions. Using the embedding technique
proposed by Wolff we test it on the Symanzik improved bidimensional non-linear
model. For some long range observables we find a little slowing down
exponent () that we interpret as an effect of the partial
frustration of the induced spin model.Comment: Self extracting archive fil
Magnetoelectric effects in an organo-metallic quantum magnet
We observe a bilinear magnetic field-induced electric polarization of 50 in single crystals of NiCl-4SC(NH) (DTN). DTN forms a
tetragonal structure that breaks inversion symmetry, with the highly polar
thiourea molecules all tilted in the same direction along the c-axis.
Application of a magnetic field between 2 and 12 T induces canted
antiferromagnetism of the Ni spins and the resulting magnetization closely
tracks the electric polarization. We speculate that the Ni magnetic forces
acting on the soft organic lattice can create significant distortions and
modify the angles of the thiourea molecules, thereby creating a magnetoelectric
effect. This is an example of how magnetoelectric effects can be constructed in
organo-metallic single crystals by combining magnetic ions with electrically
polar organic elements.Comment: 3 pages, 3 figure
Magnetism in Closed-shell Quantum Dots: Emergence of Magnetic Bipolarons
Similar to atoms and nuclei, semiconductor quantum dots exhibit formation of
shells. Predictions of magnetic behavior of the dots are often based on the
shell occupancies. Thus, closed-shell quantum dots are assumed to be inherently
nonmagnetic. Here, we propose a possibility of magnetism in such dots doped
with magnetic impurities. On the example of the system of two interacting
fermions, the simplest embodiment of the closed-shell structure, we demonstrate
the emergence of a novel broken-symmetry ground state that is neither
spin-singlet nor spin-triplet. We propose experimental tests of our predictions
and the magnetic-dot structures to perform them.Comment: 4 pages, 4 figures;
http://link.aps.org/doi/10.1103/PhysRevLett.106.177201; minor change
Tests of the continuum limit for the Principal Chiral Model and the prediction for \L_\MS
We investigate the continuum limit in Principal Chiral Models
concentrating in detail on the model and its covering group
SU(2)xSU(2). We compute the mass gap in terms of Lambda_MS and compare with the
prediction of Hollowood of m/\L_\MS = 3.8716. We use the finite-size scaling
method of L\"uscher et al. to deduce m/\L_\MS and find that for the
model the computed result of m/\L_\MS \sim 14 is in strong disagreement with
theory but that a similar analysis of the SU(2)xSU(2) yields excellent
agreement with theory. We conjecture that for violations of the
finite-size scaling assumption are severe forthe values of the correlation
length, , investigated and that our attempts to extrapolate the results to
zero lattice spacing, although plausible, are erroneous. Conversely, the
finite-size scaling violations in the SU(2)xSU(2) simulation are consistent
with perturbation theory and the computed function agrees well with the
3-loop approximation for couplings evaluated at scales , where
is measured in units of the lattice spacing, . We conjecture that
lattice vortex artifacts in the model are responsible for delaying the
onset of the continuum limit until much larger correlation lengths are achieved
notwithstanding the apparent onset of scaling. Results for the mass spectrum
for SO(N) m, N=8,10 are given whose comparison with theory gives plausible
support to our ideas.Comment: 27 pages , 1 Postscript-file, uuencode
The Tails of the Crossing Probability
The scaling of the tails of the probability of a system to percolate only in
the horizontal direction was investigated numerically for correlated
site-bond percolation model for .We have to demonstrate that the
tails of the crossing probability far from the critical point have shape
where is the correlation
length index, is the probability of a bond to be closed. At
criticality we observe crossover to another scaling . Here is a scaling index describing the
central part of the crossing probability.Comment: 20 pages, 7 figures, v3:one fitting procedure is changed, grammatical
change
Testing fixed points in the 2D O(3) non-linear sigma model
Using high statistic numerical results we investigate the properties of the
O(3) non-linear 2D sigma-model. Our main concern is the detection of an
hypothetical Kosterlitz-Thouless-like (KT) phase transition which would
contradict the asymptotic freedom scenario. Our results do not support such a
KT-like phase transition.Comment: Latex, 7 pgs, 4 eps-figures. Added more analysis on the
KT-transition. 4-loop beta function contains corrections from D.-S.Shin
(hep-lat/9810025). In a note-added we comment on the consequences of these
corrections on our previous reference [16
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