1,825 research outputs found
Fermi Detection of the Pulsar Wind Nebula HESS J1640-465
We present observations of HESS J1640-465 with the Fermi-LAT. The source is
detected with high confidence as an emitter of high-energy gamma-rays. The
spectrum lacks any evidence for the characteristic cutoff associated with
emission from pulsars, indicating that the emission arises primarily from the
pulsar wind nebula. Broadband modeling implies an evolved nebula with a low
magnetic field resulting in a high gamma-ray to X-ray flux ratio. The Fermi
emission exceeds predictions of the broadband model, and has a steeper
spectrum, possibly resulting from a distinct excess of low energy electrons
similar to what is inferred for both the Vela X and Crab pulsar wind nebulae.Comment: 6 pages, 5 figures, accepted for publication in Ap
Classical nonlinear response of a chaotic system: Langevin dynamics and spectral decomposition
We consider the classical response of a strongly chaotic Hamiltonian system.
The spectrum of such a system consists of discrete complex Ruelle-Pollicott
(RP) resonances which manifest themselves in the behavior of the correlation
and response functions. We interpret the RP resonances as the eigenstates and
eigenvalues of the Fokker-Planck operator obtained by adding an infinitesimal
noise term to the first-order Liouville operator. We demonstrate how the
deterministic expression for the linear response is reproduced in the limit of
vanishing noise. For the second-order response we establish an equivalence of
the spectral decomposition with infinitesimal noise and the long-time
asymptotic expansion for the deterministic case.Comment: 16 pages, 1 figur
Pulsar Wind Nebulae in the SKA era
Neutron stars lose the bulk of their rotational energy in the form of a
pulsar wind: an ultra-relativistic outflow of predominantly electrons and
positrons. This pulsar wind significantly impacts the environment and possible
binary companion of the neutron star, and studying the resultant pulsar wind
nebulae is critical for understanding the formation of neutron stars and
millisecond pulsars, the physics of the neutron star magnetosphere, the
acceleration of leptons up to PeV energies, and how these particles impact the
interstellar medium. With the SKA1 and the SKA2, it could be possible to study
literally hundreds of PWNe in detail, critical for understanding the many open
questions in the topics listed above.Comment: Comments: 10 pages, 3 figures, to be published in: "Advancing
Astrophysics with the Square Kilometre Array", Proceedings of Science,
PoS(AASKA14
On bi-Hamiltonian deformations of exact pencils of hydrodynamic type
In this paper we are interested in non trivial bi-Hamiltonian deformations of
the Poisson pencil \omega_{\lambda}=\omega_2+\lambda
\omega_1=u\delta'(x-y)+\f{1}{2}u_x\delta(x-y)+\lambda\delta'(x-y).
Deformations are generated by a sequence of vector fields ,
where each is homogenous of degree with respect to a grading
induced by rescaling. Constructing recursively the vector fields one
obtains two types of relations involving their unknown coefficients: one set of
linear relations and an other one which involves quadratic relations. We prove
that the set of linear relations has a geometric meaning: using
Miura-quasitriviality the set of linear relations expresses the tangency of the
vector fields to the symplectic leaves of and this tangency
condition is equivalent to the exactness of the pencil .
Moreover, extending the results of [17], we construct the non trivial
deformations of the Poisson pencil , up to the eighth order
in the deformation parameter, showing therefore that deformations are
unobstructed and that both Poisson structures are polynomial in the derivatives
of up to that order.Comment: 34 pages, revised version. Proof of Theorem 16 completely rewritten
due to an error in the first versio
Dimer Expansion Study of the Bilayer Square Lattice Frustrated Quantum Heisenberg Antiferromagnet
The ground state of the square lattice bilayer quantum antiferromagnet with
nearest () and next-nearest () neighbour intralayer interaction is
studied by means of the dimer expansion method up to the 6-th order in the
interlayer exchange coupling . The phase boundary between the spin-gap
phase and the magnetically ordered phase is determined from the poles of the
biased Pad\'e approximants for the susceptibility and the inverse energy gap
assuming the universality class of the 3-dimensional classical Heisenberg
model. For weak frustration, the critical interlayer coupling decreases
linearly with . The spin-gap phase persists down to
(single layer limit) for 0.45 \simleq \alpha \simleq 0.65. The crossover of
the short range order within the disordered phase is also discussed.Comment: 4 pages, 6 figures, One reference adde
Evolution Equation for Generalized Parton Distributions
The extension of the method [arXiv:hep-ph/0503109] for solving the leading
order evolution equation for Generalized Parton Distributions (GPDs) is
presented. We obtain the solution of the evolution equation both for the flavor
nonsinglet quark GPD and singlet quark and gluon GPDs. The properties of the
solution and, in particular, the asymptotic form of GPDs in the small x and \xi
region are discussed.Comment: REVTeX4, 34 pages, 3 figure
First-order quantum phase transition in the orthogonal-dimer spin chain
We investigate the low-energy properties of the orthogonal-dimer spin chain
characterized by a frustrated dimer-plaquette structure. When the competing
antiferromagnetic couplings are varied, the first-order quantum phase
transition occurs between the dimer and the plaquette phases, which is
accompanied by nontrivial features due to frustration: besides the
discontinuity in the lowest excitation gap at the transition point, a sharp
level-crossing occurs for the spectrum in the plaquette phase. We further
reveal that the plateau in the magnetization curve at 1/4 of the full moment
dramatically changes its character in the vicinity of the critical point. It is
argued that the first-order phase transition in this system captures some
essential properties found in the two-dimensional orthogonal-dimer model
proposed for .Comment: 7 pages, submitted to Phys. Rev.
Meta-Plaquette Expansion for the Triplet Excitation Spectrum in CaVO
We study antiferromagnetic, Heisenberg models with nearest and second
neighbor interactions on the one-fifth depleted square lattice which describes
the spin degrees of freedom in the spin-gap system CaVO. The
meta-plaquette expansion for the triplet excitation spectrum is extended to
fifth order, and the results are compared with experimental data on
CaVO. We attempt to locate the phase boundary between magnetically
ordered and gapped phases.Comment: 4 figure
Supermanifolds, symplectic geometry and curvature
We present a survey of some results and questions related to the notion of
scalar curvature in the setting of symplectic supermanifolds.Comment: Dedicated to Jaime Mu\~noz-Masqu\'e on occasion of his 65th birthda
On the geometry of a class of N-qubit entanglement monotones
A family of N-qubit entanglement monotones invariant under stochastic local
operations and classical communication (SLOCC) is defined. This class of
entanglement monotones includes the well-known examples of the concurrence, the
three-tangle, and some of the four, five and N-qubit SLOCC invariants
introduced recently. The construction of these invariants is based on bipartite
partitions of the Hilbert space in the form with . Such partitions can be given
a nice geometrical interpretation in terms of Grassmannians Gr(L,l) of l-planes
in that can be realized as the zero locus of quadratic polinomials
in the complex projective space of suitable dimension via the Plucker
embedding. The invariants are neatly expressed in terms of the Plucker
coordinates of the Grassmannian.Comment: 7 pages RevTex, Submitted to Physical Review
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