9,529 research outputs found
Division subspaces and integrable kernels
In this note we prove that the reproducing kernel of a Hilbert space
satisfying the division property has integrable form, is locally of trace
class, and the Hilbert space itself is a Hilbert space of holomorphic
functions.Comment: 11 page
EVALUATING THE IMPACTS OF AGRICULTURAL EXPORTS ON A REGIONAL ECONOMY
Agricultural exports are important to many regional economies, as is the case for agricultural exports wither produced in or shipped through Louisiana. A hybrid (revised and verified) IMPLAN model of the Louisiana economy is used to estimate the direct and indirect impact of agricultural exports. Original model estimates of foreign exports lacked holistic (overall) accuracy. However, other, more general uses of the model were unaffected by this lack of accuracy. While the contributions of agricultural exports to the state economy were substantial, impacts were concentrated in unprocessed products. Increasing the export of processed agricultural products should enhance economic activity.Agricultural exports, Holistic accuracy, IMPLAN, Input-output models, Processed exports, Community/Rural/Urban Development, International Relations/Trade,
A Refined Scaling Law for Spatially Coupled LDPC Codes Over the Binary Erasure Channel
We propose a refined scaling law to predict the finite-length performance in
the waterfall region of spatially coupled low-density parity-check codes over
the binary erasure channel. In particular, we introduce some improvements to
the scaling law proposed by Olmos and Urbanke that result in a better agreement
between the predicted and simulated frame error rate. We also show how the
scaling law can be extended to predict the bit error rate performance.Comment: Paper accepted to IEEE Information Theory Workshop (ITW) 201
Systematic Analysis of Majorization in Quantum Algorithms
Motivated by the need to uncover some underlying mathematical structure of
optimal quantum computation, we carry out a systematic analysis of a wide
variety of quantum algorithms from the majorization theory point of view. We
conclude that step-by-step majorization is found in the known instances of fast
and efficient algorithms, namely in the quantum Fourier transform, in Grover's
algorithm, in the hidden affine function problem, in searching by quantum
adiabatic evolution and in deterministic quantum walks in continuous time
solving a classically hard problem. On the other hand, the optimal quantum
algorithm for parity determination, which does not provide any computational
speed-up, does not show step-by-step majorization. Lack of both speed-up and
step-by-step majorization is also a feature of the adiabatic quantum algorithm
solving the 2-SAT ``ring of agrees'' problem. Furthermore, the quantum
algorithm for the hidden affine function problem does not make use of any
entanglement while it does obey majorization. All the above results give
support to a step-by-step Majorization Principle necessary for optimal quantum
computation.Comment: 15 pages, 14 figures, final versio
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