246,593 research outputs found
Gamma Ray Burst Prompt Emission Variability in Synchrotron and Synchrotron Self-Compton Lightcurves
Gamma Ray Burst prompt emission is believed to originate from electrons
accelerated in a highly relativistic outflow. "Internal shocks" due to
collisions between shells ejected by the central engine is a leading candidate
for electron acceleration. While synchrotron radiation is generally invoked to
interpret prompt gamma-ray emission within the internal shock model,
synchrotron self-Compton (SSC) is also considered as a possible candidate of
radiation mechanism. In this case, one would expect a synchrotron emission
component at low energies, and the naked-eye GRB 080319B has been considered as
such an example. In the view that the gamma-ray lightcurve of GRB 080319B is
much more variable than its optical counterpart, in this paper we study the
relative variability between the synchrotron and SSC components. We develop a
"top-down" formalism by using observed quantities to infer physical parameters,
and subsequently to study the temporal structure of synchrotron and SSC
components of a GRB. We complement the formalism with a "bottom-up" approach
where the synchrotron and SSC lightcurves are calculated through a Monte-Carlo
simulations of the internal shock model. Both approaches lead to the same
conclusion. Small variations in the synchrotron lightcurve can be only
moderately amplified in the SSC lightcurve. The SSC model therefore cannot
adequately interpret the gamma-ray emission properties of GRB 080319B.Comment: 13 pages, 4 figures, accepted for publication in MNRA
Mutual Interlacing and Eulerian-like Polynomials for Weyl Groups
We use the method of mutual interlacing to prove two conjectures on the
real-rootedness of Eulerian-like polynomials: Brenti's conjecture on
-Eulerian polynomials for Weyl groups of type , and Dilks, Petersen, and
Stembridge's conjecture on affine Eulerian polynomials for irreducible finite
Weyl groups.
For the former, we obtain a refinement of Brenti's -Eulerian polynomials
of type , and then show that these refined Eulerian polynomials satisfy
certain recurrence relation. By using the Routh--Hurwitz theory and the
recurrence relation, we prove that these polynomials form a mutually
interlacing sequence for any positive , and hence prove Brenti's conjecture.
For , our result reduces to the real-rootedness of the Eulerian
polynomials of type , which were originally conjectured by Brenti and
recently proved by Savage and Visontai.
For the latter, we introduce a family of polynomials based on Savage and
Visontai's refinement of Eulerian polynomials of type . We show that these
new polynomials satisfy the same recurrence relation as Savage and Visontai's
refined Eulerian polynomials. As a result, we get the real-rootedness of the
affine Eulerian polynomials of type . Combining the previous results for
other types, we completely prove Dilks, Petersen, and Stembridge's conjecture,
which states that, for every irreducible finite Weyl group, the affine descent
polynomial has only real zeros.Comment: 28 page
Uncertainty Relation for a Quantum Open System
We derive the uncertainty relation for a quantum open system comprised of a
Brownian particle interacting with a bath of quantum oscillators at finite
temperature. We examine how the quantum and thermal fluctuations of the
environment contribute to the uncertainty in the canonical variables of the
system. We show that upon contact with the bath (assumed ohmic in this paper)
the system evolves from a quantum-dominated state to a thermal-dominated state
in a time which is the same as the decoherence time in similar models in the
discussion of quantum to classical transition. This offers some insight into
the physical mechanisms involved in the environment-induced decoherence
process. We obtain closed analytic expressions for this generalized uncertainty
relation under the conditions of high temperature and weak damping separately.
We also consider under these conditions an arbitrarily-squeezed initial state
and show how the squeeze parameter enters in the generalized uncertainty
relation. Using these results we examine the transition of the system from a
quantum pure state to a nonequilibrium quantum statistical state and to an
equilibrium quantum statistical state. The three stages are marked by the
decoherence time and the relaxation time respectively. With these observations
we explicate the physical conditions when the two basic postulates of quantum
statistical mechanics become valid. We also comment on the inappropriateness in
the usage of the word classicality in many decoherence studies of quantum to
classical transition.Comment: 36 pages,Tex,umdpp93-162,(submitted to Phys. Rev. A
Topological Quantum Field Theory and Seiberg-Witten Monopoles
A topological quantum field theory is introduced which reproduces the
Seiberg-Witten invariants of four-manifolds. Dimensional reduction of this
topological field theory leads to a new one in three dimensions. Its partition
function yields a three-manifold invariant, which can be regarded as the
Seiberg-Witten version of Casson's invariant. A Geometrical interpretation of
the three dimensional quantum field theory is also given.Comment: 15 pages, Latex file, no figure
A Rate-Splitting Based Bound-Approaching Transmission Scheme for the Two-User Symmetric Gaussian Interference Channel with Common Messages
This paper is concerned with a rate-splitting based transmission strategy for the two-user symmetric Gaussian interference channel that contains common messages only. Each transmitter encodes its common message into multiple layers by multiple codebooks that drawn from one separate code book, and transmits the superposition of the messages corresponding to these layers; each receiver decodes the messages from all layers of the two users successively. Two schemes are proposed for decoding order and optimal power allocation among layers respectively. With the proposed decoding order scheme, the sum-rate can be increased by rate-splitting, especially at the optimal number of rate-splitting, using average power allocation in moderate and weak interference regime. With the two proposed schemes at the receiver and the transmitter respectively, the sum-rate achieves the inner bound of HK without time-sharing. Numerical results show that the proposed optimal power allocation scheme with the proposed decoding order can achieve significant improvement of the performance over equal power allocation, and achieve the sum-rate within two bits per channel use (bits/channel use) of the sum capacity
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