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Harnessing Global Finance : Is there divergence in global banking regulation?Sørås, Peder January 2012 (has links)
Convergence theory has dominated the discussion of global financial governance. The perspective argues that the confrontation between the global market and state institutions leads to policy convergence. However, rather than accept this conclusion, this study has examined banking regulation in four countries, the United States, Canada, Britain, and Germany to test whether they converge. By comparing how these countries regulate banking in terms of policy interests, the study finds that there is indeed divergence between them in contrast to what convergence theory would predict.
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Convergence investigation of the direct stiffness method.Key, Samuel Witt, January 1966 (has links)
Thesis (Ph.D.)--University of Washington.
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On the Convergence Rate in a Theorem of KlesovChen, Tsung-Wei 24 June 2004 (has links)
egin{abstract}
hspace*{1cm} Let $X_{1}$@, $X_{2}$@,$cdots$@, $X_{n}$ be a sequence of
independent
indentically distributed random variables ( i@. i@. d@.) and
$S_{n}=X_{1}+X_{2}+...+X_{n}$@. Denote
$lambda(varepsilon)=displaystylesum_{n=1}^{infty}P(|S_{n}|geq
nvarepsilon)$@. O.I. Klesov proved that if $EX_{1}=0$,
$EX_{1}^{2}=sigma ^{2}
eq 0$, $E|X_{1}|^{3}<infty$, then
$displaystylelim_{varepsilondownarrow0}varepsilon^{frac{3}{2}}(lambda(varepsilon)-frac{sigma^{2}}{varepsilon^{2}})=0$.
In this thesis, it is shown that if $EX_{1}=0$,
$EX_{1}^{2}=sigma ^{2}
eq 0$, $E|X_{1}|^{2+delta}<infty$ for
some $displaystyledeltain(frac{1}{2},1]$, then
$displaystylelim_{varepsilondownarrow0}varepsilon^{frac{3}{2}}(lambda(varepsilon)-frac{sigma^{2}}{varepsilon^{2}})=0$.
end{abstract}
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On the convergence rate of complete convergenceTseng, Tzu-Hui 12 June 2003 (has links)
egin{abstract}
hspace{1cm}Let $X_{1}$, $X_{2}$, $cdots$, $X_{n}$ be a sequence
of independent indentically distributed random variables ( i. i.
d.) and $displaystyle S_{n}=X_{1}+X_{2} +cdots X_{n}$. Denote
$displaystylelambda(varepsilon)=sum^{infty}_{n=1}P{left|S_{n}
ight|geq
nvarepsilon}$, the convergence rate of
$displaystylelambda(varepsilon)$ is studied. O.I. Klesov proved
that if $E|X_{1}|^{3}$ exists, then $displaystyle
varepsilon^{frac{3}{2}}(lambda(varepsilon)-frac{sigma^{2}}{varepsilon^{2}})
ightarrow 0$.
In this thesis, we show that if $E|X_{1}|^{2+delta}<infty$ for
some $displaystyle
deltain(frac{sqrt{7}-1}{3},1]$, the result of O.I. Klesov
still holds.
end{abstract}
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On Uniform ConvergenceDrew, Dan Dale 02 1900 (has links)
In this paper, we will be concerned primarily with series of functions and a particular type of convergence which will be described. The purpose of this paper is to familiarize the reader with the concept of uniform convergence. In the main it is a compilation of material found in various references and revised to conform to standard notation.
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On the parametric curves for the design, performance optimization and characrirization of the LPDA antennaOnwuegbuna, LI, Jimoh, AA 01 December 2009 (has links)
Abstract: This paper attempts to overcome the limitations of the parametric curves that characterize
the performance of the Log Periodic Dipole Array Antenna (here after referred to as the LPDA). For
instance, the parametric curves in design handbooks e.g. ARRL antenna handbook and other relevant
literature e.g. Peixeiro do not contain those giving the relationship between the boom-length 'L' and
the number of dipole element 'N' for any given bandwidth, even when it is known that these two
parameters are the main cost determinants of a LPDA Antenna. The concept of convergence is
introduced to aid cost optimization of the LPDA Antenna in terms of number of dipole element 'N'.
Although 'N' is used as the minimization criterion, the criteria for establishing convergence
encompass all the main electrical characteristics of the LPDA antenna, such as VSWR, gain and
radiation patterns.
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Auxiliary conditions for the convergence of sequences of measurable functions /Alameddine, Ahmad Faouzi. January 1970 (has links)
Thesis (Ph. D.)--Oregon State University, 1970. / Typescript (photocopy). Includes bibliographical references (leaf 78). Also available on the World Wide Web.
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The relations among the modes of convergence of sequences of measurable functions /Cresswell, Donald Jay. January 1967 (has links)
Thesis (Ph. D.)--Oregon State University, 1967. / Typescript (photocopy). Includes bibliographical references (p. 207). Also available on the World Wide Web.
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Estimation of a probability density function with applications in statistical inferenceSchuster, Eugene Francis, 1941- January 1968 (has links)
No description available.
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CONVERGENCE PROPERTIES OF SPLINE FUNCTIONSSims, Stillman Eugene January 1969 (has links)
No description available.
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