Schwartz, Niels.
Semi-algebraic Function Rings and Reflectors of Partially Ordered Rings [electronic resource] / by Niels Schwartz, James J. Madden. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1999. - XIII, 279 p. online resource. - Lecture Notes in Mathematics, 1712 0075-8434 ; . - Lecture Notes in Mathematics, 1712 .
Preordered and partially ordered rings -- Reflective subcategories -- Totally ordered and real closed fields -- Real spectra of preordered rings -- Epimorphisms of reduced porings -- Functions and representable porings -- Semi-algebraic functions -- Comparing reflectors -- Constructing reflectors -- H-closed epireflectors -- Quotient-closed reflectors -- The real closure reflector -- Arities of reflectors and approximations by H-closed reflectors -- Epimorphic extensions of reduced porings -- Essential monoreflectors -- Reflections of totally ordered fields -- von Neumann regular f-rings -- Totally ordered domains -- Reduced f-rings -- Rings of continuous piecewise polynomial functions -- Rings of continuous piecewise rational functions -- Discontinuous semi-algebraic functions -- The lattice of H-closed monoreflectors.
The book lays algebraic foundations for real geometry through a systematic investigation of partially ordered rings of semi-algebraic functions. Real spectra serve as primary geometric objects, the maps between them are determined by rings of functions associated with the spectra. The many different possible choices for these rings of functions are studied via reflections of partially ordered rings. Readers should feel comfortable using basic algebraic and categorical concepts. As motivational background some familiarity with real geometry will be helpful. The book aims at researchers and graduate students with an interest in real algebra and geometry, ordered algebraic structures, topology and rings of continuous functions.
9783540482840
10.1007/BFb0093968 doi
Mathematics.
Geometry, algebraic.
Algebra.
Mathematics.
Algebraic Geometry.
Non-associative Rings and Algebras.
QA564-609
516.35
Semi-algebraic Function Rings and Reflectors of Partially Ordered Rings [electronic resource] / by Niels Schwartz, James J. Madden. - Berlin, Heidelberg : Springer Berlin Heidelberg, 1999. - XIII, 279 p. online resource. - Lecture Notes in Mathematics, 1712 0075-8434 ; . - Lecture Notes in Mathematics, 1712 .
Preordered and partially ordered rings -- Reflective subcategories -- Totally ordered and real closed fields -- Real spectra of preordered rings -- Epimorphisms of reduced porings -- Functions and representable porings -- Semi-algebraic functions -- Comparing reflectors -- Constructing reflectors -- H-closed epireflectors -- Quotient-closed reflectors -- The real closure reflector -- Arities of reflectors and approximations by H-closed reflectors -- Epimorphic extensions of reduced porings -- Essential monoreflectors -- Reflections of totally ordered fields -- von Neumann regular f-rings -- Totally ordered domains -- Reduced f-rings -- Rings of continuous piecewise polynomial functions -- Rings of continuous piecewise rational functions -- Discontinuous semi-algebraic functions -- The lattice of H-closed monoreflectors.
The book lays algebraic foundations for real geometry through a systematic investigation of partially ordered rings of semi-algebraic functions. Real spectra serve as primary geometric objects, the maps between them are determined by rings of functions associated with the spectra. The many different possible choices for these rings of functions are studied via reflections of partially ordered rings. Readers should feel comfortable using basic algebraic and categorical concepts. As motivational background some familiarity with real geometry will be helpful. The book aims at researchers and graduate students with an interest in real algebra and geometry, ordered algebraic structures, topology and rings of continuous functions.
9783540482840
10.1007/BFb0093968 doi
Mathematics.
Geometry, algebraic.
Algebra.
Mathematics.
Algebraic Geometry.
Non-associative Rings and Algebras.
QA564-609
516.35