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JAMA: The Journal of the American Medical Association, 1976
Whether it be an intellectual Dorothy Sayers, a clever Agatha Christie, the latest psychological Simenon—or for that matter, the article on page 1849 of this issue ofThe Journal—the ele ments of a good whodunit are much the same. For, like the best fictional mystery stories, the account of the epidemiological investigation by Rosenberg, Hazlet, and ...
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Whether it be an intellectual Dorothy Sayers, a clever Agatha Christie, the latest psychological Simenon—or for that matter, the article on page 1849 of this issue ofThe Journal—the ele ments of a good whodunit are much the same. For, like the best fictional mystery stories, the account of the epidemiological investigation by Rosenberg, Hazlet, and ...
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Acta Mathematica Scientia, 1998
An abelian group \(A\) is said to be Butler if it is a pure subgroup of a finite rank completely decomposable torsion-free group. For a type \(\tau\) the subgroup \(A(\tau)\) consists of all elements of \(A\) of types \(\geq\tau\) and \(A^*(\tau)\) is generated by the elements with the types \(>\tau\). For a Butler group the pure closure \(A^*(\tau)_*\)
Lee, Wuyen, Chang, Yuanrung
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An abelian group \(A\) is said to be Butler if it is a pure subgroup of a finite rank completely decomposable torsion-free group. For a type \(\tau\) the subgroup \(A(\tau)\) consists of all elements of \(A\) of types \(\geq\tau\) and \(A^*(\tau)\) is generated by the elements with the types \(>\tau\). For a Butler group the pure closure \(A^*(\tau)_*\)
Lee, Wuyen, Chang, Yuanrung
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On Butler's Unimodality Result
COMBINATORICA, 1998Let \(\lambda=(\lambda_i)_{i\in\omega}\) be a ``partition'', i.e., a decreasing sequence of non-negative integers \(\lambda_i\) which are 0 for almost all \(i\). Moreover let \(|\lambda|\) be the sum of these integers. Then \(\lambda\) can represent a finite abelian \(p\)-group \(A\) which is a direct sum of cyclic groups of order \(p^{\lambda_i ...
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2021
This essay addresses the notion of agency in Judith Butler’s work. Its central claim is that her political philosophy revolves around a specific understanding of agency, even a theory of agency, which has not as yet received due attention. The first part of the essay examines two main thought traditions in which agency became an operational notion ...
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This essay addresses the notion of agency in Judith Butler’s work. Its central claim is that her political philosophy revolves around a specific understanding of agency, even a theory of agency, which has not as yet received due attention. The first part of the essay examines two main thought traditions in which agency became an operational notion ...
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Czechoslovak Mathematical Journal, 2000
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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2019
Abstract This chapter discusses the views on self-interest and morality of Bishop Joseph Butler (1692–1752), often said to be one of the very greatest British moral philosophers of the eighteenth century. The chapter focuses particularly on Butler’s famous Fifteen Sermons.
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Abstract This chapter discusses the views on self-interest and morality of Bishop Joseph Butler (1692–1752), often said to be one of the very greatest British moral philosophers of the eighteenth century. The chapter focuses particularly on Butler’s famous Fifteen Sermons.
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1983
M. C. R. Butler [B] introduced a class R (called Butler groups) of torsion free Abelian groups of finite rank that is the closure of the class of subgroups of the rationals under finite direct sums, torsion free epimorphic images, and pure subgroups. (i.e., R is the smallest torsion free class that contains the rank-1 torsion free Abelian groups.)
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M. C. R. Butler [B] introduced a class R (called Butler groups) of torsion free Abelian groups of finite rank that is the closure of the class of subgroups of the rationals under finite direct sums, torsion free epimorphic images, and pure subgroups. (i.e., R is the smallest torsion free class that contains the rank-1 torsion free Abelian groups.)
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Linear transformations of the Butler–Volmer equation
Electrochemistry Communications, 2023Zoltan Lukács, Tamás Kristof
exaly