4,309 research outputs found
Measurement of t¯t cross-section in single leptonand fully hadronic channels at the LHC
The most precise measurements of top quark pairs (t¯t) production cross-section in proton-proton collisions at a centre-of-mass energy √s = 7TeV at the LHC are described for the single lepton and fully hadronic decay channels
A perturbative approach to non-linearities in the information carried by a two layer neural network
We evaluate the mutual information between the input and the output of a two
layer network in the case of a noisy and non-linear analogue channel. In the
case where the non-linearity is small with respect to the variability in the
noise, we derive an exact expression for the contribution to the mutual
information given by the non-linear term in first order of perturbation theory.
Finally we show how the calculation can be simplified by means of a
diagrammatic expansion. Our results suggest that the use of perturbation
theories applied to neural systems might give an insight on the contribution of
non-linearities to the information transmission and in general to the neuronal
dynamics.Comment: Accepted as a preprint of ICTP, Triest
Synchronization centrality and explosive synchronization in complex networks
Synchronization of networked oscillators is known to depend fundamentally on
the interplay between the dynamics of the graph's units and the microscopic
arrangement of the network's structure. For non identical elements, the lack of
quantitative tools has hampered so far a systematic study of the mechanisms
behind such a collective behavior. We here propose an effective network whose
topological properties reflect the interplay between the topology and dynamics
of the original network. On that basis, we are able to introduce the
"synchronization centrality", a measure which quantifies the role and
importance of each network's node in the synchronization process. In
particular, we use such a measure to assess the propensity of a graph to
synchronize explosively, thus indicating a unified framework for most of the
different models proposed so far for such an irreversible transition. Taking
advantage of the predicting power of this measure, we furthermore discuss a
strategy to induce the explosive behavior in a generic network, by acting only
upon a small fraction of its nodes
Explosive synchronization in weighted complex networks
The emergence of dynamical abrupt transitions in the macroscopic state of a
system is currently a subject of the utmost interest. Given a set of phase
oscillators networking with a generic wiring of connections and displaying a
generic frequency distribution, we show how combining dynamical local
information on frequency mismatches and global information on the graph
topology suggests a judicious and yet practical weighting procedure which is
able to induce and enhance explosive, irreversible, transitions to
synchronization. We report extensive numerical and analytical evidence of the
validity and scalability of such a procedure for different initial frequency
distributions, for both homogeneous and heterogeneous networks, as well as for
both linear and non linear weighting functions. We furthermore report on the
possibility of parametrically controlling the width and extent of the
hysteretic region of coexistence of the unsynchronized and synchronized states
Modelling the location of self-employed workers in urban areas
In this article, we develop an urban model for self-employment where leisure and effort at work are complementary. Our model shows that unemployment tends to be concentrated far from business districts, in contrast to employment and self-employment. The self-employed tend to live closer to workplaces than do the employed, as commuting affects productivity and thus earnings. We use the American Time Use Survey to test the model and find that employment and self-employment are negatively related to commuting, in comparison to unemployment, while self-employment is associated with shorter commutes, giving support to the theoretical background
Stability of the replica symmetric solution for the information conveyed by by a neural network
The information that a pattern of firing in the output layer of a feedforward
network of threshold-linear neurons conveys about the network's inputs is
considered. A replica-symmetric solution is found to be stable for all but
small amounts of noise. The region of instability depends on the contribution
of the threshold and the sparseness: for distributed pattern distributions, the
unstable region extends to higher noise variances than for very sparse
distributions, for which it is almost nonexistant.Comment: 19 pages, LaTeX, 5 figures. Also available at
http://www.mrc-bbc.ox.ac.uk/~schultz/papers.html . Submitted to Phys. Rev. E
Minor change
- …