Relations Related to Betweenness: Their Structure and Automorphisms

Relations Related to Betweenness: Their Structure and Automorphisms
Title Relations Related to Betweenness: Their Structure and Automorphisms PDF eBook
Author Samson Adepoju Adeleke
Publisher American Mathematical Soc.
Pages 141
Release 1998
Genre Mathematics
ISBN 0821806238

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This volume is about tree-like structures, namely semilinear ordering, general betweenness relations, C-relations and D-relations. It contains a systematic study of betweenness and introduces C- and D- relations to describe the behaviour of points at infinity (leaves or ends or directions of trees). The focus is on structure theorems and on automorphism groups, with applications to the theory of infinite permutation groups.

Relations Related to Betweenness

Relations Related to Betweenness
Title Relations Related to Betweenness PDF eBook
Author Samson Adepoju Adeleke
Publisher American Mathematical Soc.
Pages 144
Release 1998-01-01
Genre Mathematics
ISBN 9780821863466

Download Relations Related to Betweenness Book in PDF, Epub and Kindle

This volume is about tree-like structures, namely semilinear ordering, general betweenness relations, C-relations and D-relations. It contains a systematic study of betweenness and introduces C- and D-relations to describe the behavior of points at infinity ("leaves" or "ends" or "directions") of trees. The focus is on structure theorems and on automorphism groups, with applications to the theory of infinite permutation groups.

The Structure of $k$-$CS$- Transitive Cycle-Free Partial Orders

The Structure of $k$-$CS$- Transitive Cycle-Free Partial Orders
Title The Structure of $k$-$CS$- Transitive Cycle-Free Partial Orders PDF eBook
Author Richard Warren
Publisher American Mathematical Soc.
Pages 183
Release 1997
Genre Mathematics
ISBN 082180622X

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The class of cycle-free partial orders (CFPOs) is defined, and the CFPOs fulfilling a natural transitivity assumption, called k-connected set transitivity (k-CS-transitivity), are analysed in some detail. Classification in many of the interesting cases is given. This work generlizes Droste's classification of the countable k-transitive trees (k>1). In a CFPO, the structure can be branch downwards as well as upwards, and can do so repeatedely (though it neverr returns to the starting point by a cycle). Mostly it is assumed that k>2 and that all maximal chains are finite. The main classification splits into the sporadic and skeletal cases. The former is complete in all cardinalities. The latter is performed only in the countable case. The classification is considerably more complicated than for trees, and skeletal CFPOs exhibit rich, elaborate and rather surprising behaviour.

The Defect Relation of Meromorphic Maps on Parabolic Manifolds

The Defect Relation of Meromorphic Maps on Parabolic Manifolds
Title The Defect Relation of Meromorphic Maps on Parabolic Manifolds PDF eBook
Author George Lawrence Ashline
Publisher American Mathematical Soc.
Pages 95
Release 1999
Genre Mathematics
ISBN 0821810693

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This book is intended for graduate students and research mathematicians working in several complex variables and analytic spaces.

Treelike Structures Arising from Continua and Convergence Groups

Treelike Structures Arising from Continua and Convergence Groups
Title Treelike Structures Arising from Continua and Convergence Groups PDF eBook
Author Brian Hayward Bowditch
Publisher American Mathematical Soc.
Pages 101
Release 1999
Genre Mathematics
ISBN 0821810030

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This book is intended for graduate students and research mathematicians working in group theory and generalizations

Flat Extensions of Positive Moment Matrices: Recursively Generated Relations

Flat Extensions of Positive Moment Matrices: Recursively Generated Relations
Title Flat Extensions of Positive Moment Matrices: Recursively Generated Relations PDF eBook
Author Raúl E. Curto
Publisher American Mathematical Soc.
Pages 73
Release 1998
Genre Mathematics
ISBN 0821808699

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In this book, the authors develop new computational tests for existence and uniqueness of representing measures $\mu$ in the Truncated Complex Moment Problem: $\gamma {ij}=\int \bar zizj\, d\mu$ $(0\le i+j\le 2n)$. Conditions for the existence of finitely atomic representing measures are expressed in terms of positivity and extension properties of the moment matrix $M(n)(\gamma )$ associated with $\gamma \equiv \gamma {(2n)}$: $\gamma {00}, \dots ,\gamma {0,2n},\dots ,\gamma {2n,0}$, $\gamma {00}>0$. This study includes new conditions for flat (i.e., rank-preserving) extensions $M(n+1)$ of $M(n)\ge 0$; each such extension corresponds to a distinct rank $M(n)$-atomic representing measure, and each such measure is minimal among representing measures in terms of the cardinality of its support. For a natural class of moment matrices satisfying the tests of recursive generation, recursive consistency, and normal consistency, the existence problem for minimal representing measures is reduced to the solubility of small systems of multivariable algebraic equations. In a variety of applications, including cases of the quartic moment problem ($n=2$), the text includes explicit contructions of minimal representing measures via the theory of flat extensions. Additional computational texts are used to prove non-existence of representing measures or the non-existence of minimal representing measures. These tests are used to illustrate, in very concrete terms, new phenomena, associated with higher-dimensional moment problems that do not appear in the classical one-dimensional moment problem.

Algebraic Structure of Pseudocompact Groups

Algebraic Structure of Pseudocompact Groups
Title Algebraic Structure of Pseudocompact Groups PDF eBook
Author Dikran N. Dikranjan
Publisher American Mathematical Soc.
Pages 101
Release 1998
Genre Mathematics
ISBN 0821806297

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The fundamental property of compact spaces - that continuous functions defined on compact spaces are bounded - served as a motivation for E. Hewitt to introduce the notion of a pseudocompact space. The class of pseudocompact spaces proved to be of fundamental importance in set-theoretic topology and its applications. This clear and self-contained exposition offers a comprehensive treatment of the question, When does a group admit an introduction of a pseudocompact Hausdorff topology that makes group operations continuous? Equivalently, what is the algebraic structure of a pseudocompact Hausdorff group? The authors have adopted a unifying approach that covers all known results and leads to new ones, Results in the book are free of any additional set-theoretic assumptions.