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Information Geometry: Near Randomness and Near Independence

✍ Scribed by Arwini, Khadiga A.;Dodson, Christopher T. J.;Morel, J.-M;Takens, F.;Teissier, B

Publisher
Springer-Verlag Berlin Heidelberg
Year
2008
Tongue
English
Leaves
263
Series
Lecture Notes in Mathematics 1953
Category
Library
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✦ Table of Contents

Mathematical Statistics and Information Theory.- to Riemannian Geometry.- Information Geometry.- Information Geometry of Bivariate Families.- Neighbourhoods of Poisson Randomness, Independence, and Uniformity.- Cosmological Voids and Galactic Clustering.- Amino Acid Clustering.- Cryptographic Attacks and Signal Clustering.- Stochastic Fibre Networks.- Stochastic Porous Media and Hydrology.- Quantum Chaology.

✦ Subjects

applied statistics;differentiaal geometrie;differentiaalmeetkunde;differential geometry;Differential geometry. Global analysis;engineering;Engineering sciences. Technology;Fluid mechanics;fysica;genetica;Genetics;Geometry, Differential;industriΓ«le statistieken;Information theory;kansrekening;materialen;materials;Mathematical statistics;mathematics;Mathematics (General);mechanica;mechanics;Operational research. Game theory;physics;populatiedynamica;populatiegenetica;population dynamics;population

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Information geometry: Near randomness an
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<p><P>This volume will be useful to practising scientists and students working in the application of statistical models to real materials or to processes with perturbations of a Poisson process, a uniform process, or a state of independence for a bivariate process. We use information geometry to pro

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✍ Khadiga A. Arwini, Christopher T. J. Dodson (auth.) πŸ“‚ Library πŸ“… 2008 πŸ› Springer-Verlag Berlin Heidelberg 🌐 English

<p><P>This volume will be useful to practising scientists and students working in the application of statistical models to real materials or to processes with perturbations of a Poisson process, a uniform process, or a state of independence for a bivariate process. We use information geometry to pro

Information Geometry: Near Randomness an
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✍ Arwini, Khadiga A.; Dodson, C. T. J.; Doig, A. J.; Felipussi, S.; Sampson, W. W. πŸ“‚ Library πŸ“… 2008 πŸ› Springer 🌐 English

<P>This volume uses information geometry to give a common differential geometric framework for a wide range of illustrative applications including amino acid sequence spacings, cryptology studies, clustering of communications and galaxies, and cosmological voids.</P>

Information Geometry: Near Randomness an
πŸ“ Information Geometry: Near Randomness and Near Independence
✍ Khadiga A. Arwini, Christopher T. J. Dodson (auth.) πŸ“‚ Library πŸ“… 2008 πŸ› Springer 🌐 English

<p><P>This volume will be useful to practising scientists and students working in the application of statistical models to real materials or to processes with perturbations of a Poisson process, a uniform process, or a state of independence for a bivariate process. We use information geometry to pro

Information Geometry: Near Randomness an
πŸ“ Information Geometry: Near Randomness and Near Independence
✍ Khadiga A. Arwini, Christopher T. J. Dodson (auth.) πŸ“‚ Library πŸ“… 2008 πŸ› Springer-Verlag Berlin Heidelberg 🌐 English

<p><P>This volume will be useful to practising scientists and students working in the application of statistical models to real materials or to processes with perturbations of a Poisson process, a uniform process, or a state of independence for a bivariate process. We use information geometry to pro