399 research outputs found
Right inverses of L\'{e}vy processes
We call a right-continuous increasing process a partial right inverse
(PRI) of a given L\'{e}vy process if for at least all in
some random interval of positive length. In this paper, we give a
necessary and sufficient condition for the existence of a PRI in terms of the
L\'{e}vy triplet.Comment: Published in at http://dx.doi.org/10.1214/09-AOP515 the Annals of
Probability (http://www.imstat.org/aop/) by the Institute of Mathematical
Statistics (http://www.imstat.org
Partial decode-forward for quantum relay channels
A relay channel is one in which a Source and Destination use an intermediate
Relay station in order to improve communication rates. We propose the study of
relay channels with classical inputs and quantum outputs and prove that a
"partial decode and forward" strategy is achievable. We divide the channel uses
into many blocks and build codes in a randomized, block-Markov manner within
each block. The Relay performs a standard Holevo-Schumacher-Westmoreland
quantum measurement on each block in order to decode part of the Source's
message and then forwards this partial message in the next block. The
Destination performs a novel "sliding-window" quantum measurement on two
adjacent blocks in order to decode the Source's message. This strategy achieves
non-trivial rates for classical communication over a quantum relay channel.Comment: 7 pages, submission to the 2012 International Symposium on
Information Theory (ISIT 2012), Boston, MA, US
Distributional properties of exponential functionals of Levy processes
We study the distribution of the exponential functional
I(\xi,\eta)=\int_0^{\infty} \exp(\xi_{t-}) \d \eta_t, where and
are independent L\'evy processes. In the general setting using the theories of
Markov processes and Schwartz distributions we prove that the law of this
exponential functional satisfies an integral equation, which generalizes
Proposition 2.1 in Carmona et al "On the distribution and asymptotic results
for exponential functionals of Levy processes". In the special case when
is a Brownian motion with drift we show that this integral equation leads to an
important functional equation for the Mellin transform of , which
proves to be a very useful tool for studying the distributional properties of
this random variable. For general L\'evy process ( being Brownian
motion with drift) we prove that the exponential functional has a smooth
density on , but surprisingly the second derivative at zero
may fail to exist. Under the additional assumption that has some positive
exponential moments we establish an asymptotic behaviour of \p(I(\xi,\eta)>x)
as , and under similar assumptions on the negative exponential
moments of we obtain a precise asympotic expansion of the density of
as . Under further assumptions on the L\'evy process
one is able to prove much stronger results about the density of the
exponential functional and we illustrate some of the ideas and techniques for
the case when has hyper-exponential jumps.Comment: In this version we added a remark after Theorem 1 about extra
conditions required for validity of equation (2.3
Joint source-channel coding for a quantum multiple access channel
Suppose that two senders each obtain one share of the output of a classical,
bivariate, correlated information source. They would like to transmit the
correlated source to a receiver using a quantum multiple access channel. In
prior work, Cover, El Gamal, and Salehi provided a combined source-channel
coding strategy for a classical multiple access channel which outperforms the
simpler "separation" strategy where separate codebooks are used for the source
coding and the channel coding tasks. In the present paper, we prove that a
coding strategy similar to the Cover-El Gamal-Salehi strategy and a
corresponding quantum simultaneous decoder allow for the reliable transmission
of a source over a quantum multiple access channel, as long as a set of
information inequalities involving the Holevo quantity hold.Comment: 21 pages, v2: minor changes, accepted into Journal of Physics
Classical codes for quantum broadcast channels
We discuss two techniques for transmitting classical information over quantum broadcast channels. The first technique is a quantum generalization of the superposition coding scheme for the classical broadcast channel. We use a quantum simultaneous nonunique decoder and obtain a simpler proof of the rate region recently published by Yard et al. in independent work. Our second result is a quantum Marton coding scheme, which gives the best known achievable rate region for quantum broadcast channels. Both results exploit recent advances in quantum simultaneous decoding developed in the context of quantum interference channels. © 2012 IEEE
Estimate of Tilt Instability of Mesa-Beam and Gaussian-Beam Modes for Advanced LIGO
Sidles and Sigg have shown that advanced LIGO interferometers will encounter
a serious tilt instability, in which symmetric tilts of the mirrors of an arm
cavity cause the cavity's light beam to slide sideways, so its radiation
pressure exerts a torque that increases the tilt. Sidles and Sigg showed that
the strength T of this torque is 26.2 times greater for advanced LIGO's
baseline cavities -- nearly flat spherical mirrors which support Gaussian beams
(``FG'' cavities), than for nearly concentric spherical mirrors which support
Gaussian beams with the same diffraction losses as the baseline case -- ``CG''
cavities: T^{FG}/T^{CG} = 26.2. This has motivated a proposal to change the
baseline design to nearly concentric, spherical mirrors. In order to reduce
thermoelastic noise in advanced LIGO, O'Shaughnessy and Thorne have proposed
replacing the spherical mirrors and their Gaussian beams by ``Mexican-Hat''
(MH) shaped mirrors which support flat-topped, ``mesa'' shaped beams. In this
paper we compute the tilt-instability torque for advanced-LIGO cavities with
nearly flat MH mirrors and mesa beams (``FM'' cavities) and nearly concentric
MH mirrors and mesa beams (``CM'' cavities), with the same diffraction losses
as in the baseline FG case. We find that the relative sizes of the restoring
torques are T^{CM}/T^{CG} = 0.91, T^{FM}/T^{CG} = 96, T^{FM}/T^{FG} = 3.67.
Thus, the nearly concentric MH mirrors have a weaker tilt instability than any
other configuration. Their thermoelastic noise is the same as for nearly flat
MH mirrors, and is much lower than for spherical mirrors.Comment: 10 pages, 3 figures, 4 table
Classical codes for quantum broadcast channels
We present two approaches for transmitting classical information over quantum
broadcast channels. The first technique is a quantum generalization of the
superposition coding scheme for the classical broadcast channel. We use a
quantum simultaneous nonunique decoder and obtain a proof of the rate region
stated in [Yard et al., IEEE Trans. Inf. Theory 57 (10), 2011]. Our second
result is a quantum generalization of the Marton coding scheme. The error
analysis for the quantum Marton region makes use of ideas in our earlier work
and an idea recently presented by Radhakrishnan et al. in arXiv:1410.3248. Both
results exploit recent advances in quantum simultaneous decoding developed in
the context of quantum interference channels.Comment: v4: 20 pages, final version to appear in IEEE Transactions on
Information Theor
ANALYSIS OF ATHLETES’ STATIC-DYNAMIC STABILITY
INTRODUCTION: The ability to maintain balance and static-kinetic stability is particularly important for athletes. The balance function realizes a stable connection between the individual and the environment, resulting in “spatial” stabilization. This means that the environment is perceived as “stable,” that man lives, moves or stays in a stable surrounding. That is why this fact is of particular importance in the training process of figure skaters, gymnasts and other athletes. Different tests are made for their selection and for assessment of the training process. This paper presents a method for computer processing of results from craniocorporographic examinations (CCG) of athletes at standard and sensitized Romberg’s standing test and Unterberger-Fukuda stepping test. The aim is to compare the sensitivity and reliability of those tests
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