Results 251 to 260 of about 435,466 (279)
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American Journal of Medical Genetics, 1988
AbstractThirty‐five subjects with perfect pitch, representing 19 families, were studied with a Perfect Pitch Questionnaire, which provided information on note‐recognition capacity and musical exposure and training, as well as demographic characteristics. Perfect pitch was found to predominate in females and was detected at a very early age.
Joseph Profita +3 more
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AbstractThirty‐five subjects with perfect pitch, representing 19 families, were studied with a Perfect Pitch Questionnaire, which provided information on note‐recognition capacity and musical exposure and training, as well as demographic characteristics. Perfect pitch was found to predominate in females and was detected at a very early age.
Joseph Profita +3 more
openaire +2 more sources
Journal of Graph Theory, 2014
AbstractThe clique number of a digraph D is the size of the largest bidirectionally complete subdigraph of D. D is perfect if, for any induced subdigraph H of D, the dichromatic number defined by Neumann‐Lara (The dichromatic number of a digraph, J. Combin. Theory Ser. B 33 (1982), 265–270) equals the clique number .
Andres, Stephan Dominique +1 more
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AbstractThe clique number of a digraph D is the size of the largest bidirectionally complete subdigraph of D. D is perfect if, for any induced subdigraph H of D, the dichromatic number defined by Neumann‐Lara (The dichromatic number of a digraph, J. Combin. Theory Ser. B 33 (1982), 265–270) equals the clique number .
Andres, Stephan Dominique +1 more
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Acta Mathematica Hungarica, 1998
The author generalizes results of \textit{E. A. Mares} [Math. Z. 82, 347-360 (1963; Zbl 0131.27401)] and \textit{R. Ware} [Trans. Am. Math. Soc. 155, 233-256 (1971; Zbl 0215.09101)], namely he extends the concept of perfectness to modules which are not necessarily projective. Let \(M\in\text{mod-}R\), where \(R\) is an associative ring with \(1\neq 0\)
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The author generalizes results of \textit{E. A. Mares} [Math. Z. 82, 347-360 (1963; Zbl 0131.27401)] and \textit{R. Ware} [Trans. Am. Math. Soc. 155, 233-256 (1971; Zbl 0215.09101)], namely he extends the concept of perfectness to modules which are not necessarily projective. Let \(M\in\text{mod-}R\), where \(R\) is an associative ring with \(1\neq 0\)
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Nursing Standard, 2016
This app helps nurses to improve the organisation of wards and put patients at the centre of care.
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This app helps nurses to improve the organisation of wards and put patients at the centre of care.
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IEEE Transactions on Information Theory, 1993
Summary: Given positive integers \(r\), \(s\), \(u\), and \(v\), an \((r, s; u, v)\) perfect map is defined to be a periodic \(r\times s\) binary array in which every \(u\times v\) binary array appears exactly once as a periodic subarray. Perfect maps are the natural extension of the de Bruijn sequences to two dimensions.
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Summary: Given positive integers \(r\), \(s\), \(u\), and \(v\), an \((r, s; u, v)\) perfect map is defined to be a periodic \(r\times s\) binary array in which every \(u\times v\) binary array appears exactly once as a periodic subarray. Perfect maps are the natural extension of the de Bruijn sequences to two dimensions.
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Linguistic Variation, 2011
The focus of this paper is the syntax of the so-called perfect doubling construction as it occurs in dialects of Dutch, namely cases of compound tenses featuring an additional, participial have (or be). We examine the properties of the construction on the basis of recent fieldwork research, and propose an analysis, whose starting point is the ...
Koeneman, O., Lekakou, M., Barbiers, S.
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The focus of this paper is the syntax of the so-called perfect doubling construction as it occurs in dialects of Dutch, namely cases of compound tenses featuring an additional, participial have (or be). We examine the properties of the construction on the basis of recent fieldwork research, and propose an analysis, whose starting point is the ...
Koeneman, O., Lekakou, M., Barbiers, S.
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, 1987 In his 1987 entry on ‘Perfect Competition’ in The New Palgrave, the author reviewed the question of the perfectness of perfect competition, and gave four alternative formalisations rooted in the so-called Arrow-Debreu-Mckenzie model. That entry is now updated for the second edition to include work done on the subject during the last twenty years.
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Maimonides on Perfecting Perfection
Harvard Theological Review, 2017This article addresses two critical questions concerning Maimonides's views on human perfection at the end of hisGuide of the Perplexed. The first is: For those who have reached the highest category of perfection—intellectual perfection, apprehension of the divine, the divine science—what prescription does Maimonides offer for perfecting that ...
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