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200 10$aNetworking dissent$b[electronic resource] $ecyber activists use the Internet to promote democracy in Burma /$fTiffany Danitz and Warren P. Strobel
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200 14$aThe Architecture of Rights $eModels and Theories /$fby David Frydrych
205   $a1st ed. 2021.
210  1$aCham :$cSpringer International Publishing :$cImprint: Palgrave Macmillan,$d2021.
215   $a1 online resource (312 pages)
311 08$a9783030760380 
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327   $aChapter 1: Introduction -- Chapter 2: Rights Modelling -- Chapters 3: Rights Correlativity -- Chapter 4: Rights Exercise and Enforcement -- Chapter 5: The Theories of Rights Debate -- Chapter 6: The Case Against the Theories -- Chapter 7: Legal Rights Enforcement -- Chapter 8: Imperfect Legal Rights -- Chapter 9: Claims and Invocations of Right -- Chapter 10: The Conceptual Contingency of Perimeters of Support.
330   $aWhat is a right? What, if anything, makes rights different from other features of the normative world, such as duties, standards, rules, or principles? Do all rights serve some ultimate purpose? In addition to raising these questions, philosophers and jurists have long been aware that different senses of 'a right' abound. To help make sense of this diversity, and to address the above questions, they developed two types of accounts of rights: models and theories. This book explicates rights modelling and theorising and scrutinises their methodological underpinnings. It then challenges this framework by showing why the theories ought to be abandoned. In addition to exploring structural concerns, the book also addresses the various ways that rights can be used. It clarifies important differences between rights exercise, enforcement, remedying, and vindication, and identifies forms of legal rights-claiming and rights-invoking outside of institutional contexts. David Frydrych is a lecturer at Monash University's Faculty of Law. His research concerns jurisprudence, rights, and trusts.
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200 10$aAlgebra $eAn Approach via Module Theory /$fby William A. Adkins, Steven H. Weintraub
205   $a1st ed. 1992.
210  1$aNew York, NY :$cSpringer New York :$cImprint: Springer,$d1992.
215   $a1 online resource (X, 526 p.) 
225 1 $aGraduate Texts in Mathematics,$x2197-5612 ;$v136
300   $aBibliographic Level Mode of Issuance: Monograph
311 08$a0-387-97839-9 
311 08$a1-4612-6948-2 
320   $aIncludes bibliographical references and indexes.
327   $a1 Groups -- 1.1 Definitions and Examples -- 1.2 Subgroups and Cosets -- 1.3 Normal Subgroups, Isomorphism Theorems, and Automorphism Groups -- 1.4 Permutation Representations and the Sylow Theorems -- 1.5 The Symmetric Group and Symmetry Groups -- 1.6 Direct and Semidirect Products -- 1.7 Groups of Low Order -- 1.8 Exercises -- 2 Rings -- 2.1 Definitions and Examples -- 2.2 Ideals, Quotient Rings, and Isomorphism Theorems -- 2.3 Quotient Fields and Localization -- 2.4 Polynomial Rings -- 2.5 Principal Ideal Domains and Euclidean Domains -- 2.6 Unique Factorization Domains -- 2.7 Exercises -- 3 Modules and Vector Spaces -- 3.1 Definitions and Examples -- 3.2 Submodules and Quotient Modules -- 3.3 Direct Sums, Exact Sequences, and Horn -- 3.4 Free Modules -- 3.5 Projective Modules -- 3.6 Free Modules over a PID -- 3.7 Finitely Generated Modules over PIDs -- 3.8 Complemented Submodules -- 3.9 Exercises -- 4 Linear Algebra -- 4.1 Matrix Algebra -- 4.2 Determinants and Linear Equations -- 4.3 Matrix Representation of Homomorphisms -- 4.4 Canonical Form Theory -- 4.5 Computational Examples -- 4.6 Inner Product Spaces and Normal Linear Transformations -- 4.7 Exercises -- 5 Matrices over PIDs -- 5.1 Equivalence and Similarity -- 5.2 Hermite Normal Form -- 5.3 Smith Normal Form -- 5.4 Computational Examples -- 5.5 A Rank Criterion for Similarity -- 5.6 Exercises -- 6 Bilinear and Quadratic Forms -- 6.1 Duality -- 6.2 Bilinear and Sesquilinear Forms -- 6.3 Quadratic Forms -- 6.4 Exercises -- 7 Topics in Module Theory -- 7.1 Simple and Semisimple Rings and Modules -- 7.2 Multilinear Algebra -- 7.3 Exercises -- 8 Group Representations -- 8.1 Examples and General Results -- 8.2 Representations of Abelian Groups -- 8.3 Decomposition of the Regular Representation -- 8.4 Characters -- 8.5 Induced Representations -- 8.6 Permutation Representations -- 8.7 Concluding Remarks -- 8.8 Exercises -- Index of Notation -- Index of Terminology.
330   $aThis book is designed as a text for a first-year graduate algebra course. As necessary background we would consider a good undergraduate linear algebra course. An undergraduate abstract algebra course, while helpful, is not necessary (and so an adventurous undergraduate might learn some algebra from this book). Perhaps the principal distinguishing feature of this book is its point of view. Many textbooks tend to be encyclopedic. We have tried to write one that is thematic, with a consistent point of view. The theme, as indicated by our title, is that of modules (though our intention has not been to write a textbook purely on module theory). We begin with some group and ring theory, to set the stage, and then, in the heart of the book, develop module theory. Having developed it, we present some of its applications: canonical forms for linear transformations, bilinear forms, and group representations. Why modules? The answer is that they are a basic unifying concept in mathematics. The reader is probably already familiar with the basic role that vector spaces play in mathematics, and modules are a generaliza­ tion of vector spaces. (To be precise, modules are to rings as vector spaces are to fields.
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