44,225 research outputs found
Screening of quark-monopole in N=4 plasma
We study a quark-monopole bound system moving in N=4 SYM plasma with a
constant velocity by the AdS/CFT correspondence. The screening length of this
system is calculated, and is smaller than that of the quark-antiquark bound
state.Comment: 17 pages, reference and minor correction adde
Sparse Solution of Underdetermined Linear Equations via Adaptively Iterative Thresholding
Finding the sparset solution of an underdetermined system of linear equations
has attracted considerable attention in recent years. Among a large
number of algorithms, iterative thresholding algorithms are recognized as one
of the most efficient and important classes of algorithms. This is mainly due
to their low computational complexities, especially for large scale
applications. The aim of this paper is to provide guarantees on the global
convergence of a wide class of iterative thresholding algorithms. Since the
thresholds of the considered algorithms are set adaptively at each iteration,
we call them adaptively iterative thresholding (AIT) algorithms. As the main
result, we show that as long as satisfies a certain coherence property, AIT
algorithms can find the correct support set within finite iterations, and then
converge to the original sparse solution exponentially fast once the correct
support set has been identified. Meanwhile, we also demonstrate that AIT
algorithms are robust to the algorithmic parameters. In addition, it should be
pointed out that most of the existing iterative thresholding algorithms such as
hard, soft, half and smoothly clipped absolute deviation (SCAD) algorithms are
included in the class of AIT algorithms studied in this paper.Comment: 33 pages, 1 figur
A spectral projection method for transmission eigenvalues
In this paper, we consider a nonlinear integral eigenvalue problem, which is
a reformulation of the transmission eigenvalue problem arising in the inverse
scattering theory. The boundary element method is employed for discretization,
which leads to a generalized matrix eigenvalue problem. We propose a novel
method based on the spectral projection. The method probes a given region on
the complex plane using contour integrals and decides if the region contains
eigenvalue(s) or not. It is particularly suitable to test if zero is an
eigenvalue of the generalized eigenvalue problem, which in turn implies that
the associated wavenumber is a transmission eigenvalue. Effectiveness and
efficiency of the new method are demonstrated by numerical examples.Comment: The paper has been accepted for publication in SCIENCE CHINA
Mathematic
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