Mixtures of nonatomic measures. III
K. P. S. Bhaskara Rao, B. V. Rao (1979)
Colloquium Mathematicae
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K. P. S. Bhaskara Rao, B. V. Rao (1979)
Colloquium Mathematicae
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Artur Bartoszewicz (1978)
Colloquium Mathematicae
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Beloslav Riečan (1974)
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K. P. S. Bhaskara Rao, B. V. Rao (1975)
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Jan K. Pachl (1979)
Colloquium Mathematicae
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K. Musiał (1973)
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Stanisław Szufla (2001)
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Mariusz Paradowski (2015)
International Journal of Applied Mathematics and Computer Science
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Over a century of research has resulted in a set of more than a hundred binary association measures. Many of them share similar properties. An overview of binary association measures is presented, focused on their order equivalences. Association measures are grouped according to their relations. Transformations between these measures are shown, both formally and visually. A generalization coefficient is proposed, based on joint probability and marginal probabilities. Combining association...
Jantas, Alicja (2015-11-10T12:04:38Z)
Acta Universitatis Lodziensis. Folia Mathematica
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Fidel José Fernández y Fernández-Arroyo, Pedro Jiménez Guerra (1990)
Revista Matemática de la Universidad Complutense de Madrid
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A necessary and sufficient condition for the existence of the projective limit of measures with values in a locally convex space is given. A similar theorem for measures with values in different locally convex spaces (under certain conditions) is given too (in this case, the projective limit is valued in the projective limit of these spaces). Finally, a result about the projective limit of vector measures is stated.
Robert Susmaga, Izabela Szczech (2015)
International Journal of Applied Mathematics and Computer Science
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The paper presents visualization techniques for interestingness measures. The process of measure visualization provides useful insights into different domain areas of the visualized measures and thus effectively assists their comprehension and selection for different knowledge discovery tasks. Assuming a common domain form of the visualized measures, a set of contingency tables, which consists of all possible tables having the same total number of observations, is constructed. These...
Monika Dekiert (1993)
Manuscripta mathematica
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Wu, Jang-Mei (1993)
Annales Academiae Scientiarum Fennicae. Series A I. Mathematica
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Dorothy Maharam (1977)
Publications mathématiques et informatique de Rennes
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Strichartz, Robert S., Taylor, Arthur, Zhang, Tong (1995)
Experimental Mathematics
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Bilel Selmi (2021)
Annales Universitatis Paedagogicae Cracoviensis. Studia Mathematica
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In this paper, we use a characterization of the mutual multifractal Hausdorff dimension in terms of auxiliary measures to investigate the projections of measures with small supports.
Matthew Badger, Raanan Schul (2017)
Analysis and Geometry in Metric Spaces
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A measure is 1-rectifiable if there is a countable union of finite length curves whose complement has zero measure. We characterize 1-rectifiable Radon measures μ in n-dimensional Euclidean space for all n ≥ 2 in terms of positivity of the lower density and finiteness of a geometric square function, which loosely speaking, records in an L2 gauge the extent to which μ admits approximate tangent lines, or has rapidly growing density ratios, along its support. In contrast with the classical...
Liviana Palmisano (2016)
Fundamenta Mathematicae
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Studies of the physical measures for Cherry flows were initiated in Saghin and Vargas (2013). While the non-positive divergence case was resolved, the positive divergence case still lacked a complete description. Some conjectures were put forward. In this paper we make a contribution in this direction. Namely, under mild technical assumptions we solve some conjectures stated in Saghin and Vargas (2013) by providing a description of the physical measures for Cherry flows in the positive...
Krakowiak Wiesław
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Introduction.............................................................5I. Preliminaries.........................................................6 1.1. Semigroups........................................7 1.2. Algebraic groups..................................7 1.3. Additive operators in Abelian groups and linear operators in linear spaces................................8 1.4. Abelian metrizable groups........................10 1.5. Locally compact Abelian groups...................13 1.6....