Continuous Lattices and Domains

Continuous Lattices and Domains
Title Continuous Lattices and Domains PDF eBook
Author G. Gierz
Publisher Cambridge University Press
Pages 640
Release 2003-03-06
Genre Mathematics
ISBN 9780521803380

Download Continuous Lattices and Domains Book in PDF, Epub and Kindle

Table of contents

A Compendium of Continuous Lattices

A Compendium of Continuous Lattices
Title A Compendium of Continuous Lattices PDF eBook
Author G. Gierz
Publisher Springer Science & Business Media
Pages 390
Release 2012-12-06
Genre Mathematics
ISBN 3642676782

Download A Compendium of Continuous Lattices Book in PDF, Epub and Kindle

A mathematics book with six authors is perhaps a rare enough occurrence to make a reader ask how such a collaboration came about. We begin, therefore, with a few words on how we were brought to the subject over a ten-year period, during part of which time we did not all know each other. We do not intend to write here the history of continuous lattices but rather to explain our own personal involvement. History in a more proper sense is provided by the bibliography and the notes following the sections of the book, as well as by many remarks in the text. A coherent discussion of the content and motivation of the whole study is reserved for the introduction. In October of 1969 Dana Scott was lead by problems of semantics for computer languages to consider more closely partially ordered structures of function spaces. The idea of using partial orderings to correspond to spaces of partially defined functions and functionals had appeared several times earlier in recursive function theory; however, there had not been very sustained interest in structures of continuous functionals. These were the ones Scott saw that he needed. His first insight was to see that - in more modern terminology - the category of algebraic lattices and the (so-called) Scott-continuous functions is cartesian closed.

Continuous Lattices

Continuous Lattices
Title Continuous Lattices PDF eBook
Author B. Banaschewski
Publisher Springer
Pages 428
Release 2006-11-14
Genre Mathematics
ISBN 3540387552

Download Continuous Lattices Book in PDF, Epub and Kindle

Continuous Lattices and Their Applications

Continuous Lattices and Their Applications
Title Continuous Lattices and Their Applications PDF eBook
Author Rudolf E. Hoffmann
Publisher CRC Press
Pages 392
Release 2020-12-17
Genre Computers
ISBN 1000111083

Download Continuous Lattices and Their Applications Book in PDF, Epub and Kindle

This book contains articles on the notion of a continuous lattice, which has its roots in Dana Scott's work on a mathematical theory of computation, presented at a conference on categorical and topological aspects of continuous lattices held in 1982.

The Shape of Congruence Lattices

The Shape of Congruence Lattices
Title The Shape of Congruence Lattices PDF eBook
Author Keith Kearnes
Publisher American Mathematical Soc.
Pages 183
Release 2013-02-26
Genre Mathematics
ISBN 0821883232

Download The Shape of Congruence Lattices Book in PDF, Epub and Kindle

This monograph is concerned with the relationships between Maltsev conditions, commutator theories and the shapes of congruence lattices in varieties of algebras. The authors develop the theories of the strong commutator, the rectangular commutator, the strong rectangular commutator, as well as a solvability theory for the nonmodular TC commutator. They prove that a residually small variety that satisfies a congruence identity is congruence modular.

Ordered Sets and Lattices II

Ordered Sets and Lattices II
Title Ordered Sets and Lattices II PDF eBook
Author
Publisher American Mathematical Soc.
Pages 262
Release
Genre Mathematics
ISBN 9780821895887

Download Ordered Sets and Lattices II Book in PDF, Epub and Kindle

This indispensable reference source contains a wealth of information on lattice theory. The book presents a survey of virtually everything published in the fields of partially ordered sets, semilattices, lattices, and Boolean algebras that was reviewed in Referativnyi Zhurnal Matematika from mid-1982 to the end of 1985. A continuation of a previous volume (the English translation of which was published by the AMS in 1989, as volume 141 in Translations - Series 2), this comprehensive work contains more than 2200 references. Many of the papers covered here were originally published in virtually inaccessible places. The compilation of the volume was directed by Milan Kolibiar of Comenius University at Bratislava and Lev A. Skornyakov of Moscow University. Of interest to mathematicians, as well as to philosophers and computer scientists in certain areas, this unique compendium is a must for any mathematical library.

Lattice Theory: Special Topics and Applications

Lattice Theory: Special Topics and Applications
Title Lattice Theory: Special Topics and Applications PDF eBook
Author George Grätzer
Publisher Springer
Pages 472
Release 2014-08-27
Genre Mathematics
ISBN 3319064134

Download Lattice Theory: Special Topics and Applications Book in PDF, Epub and Kindle

George Grätzer's Lattice Theory: Foundation is his third book on lattice theory (General Lattice Theory, 1978, second edition, 1998). In 2009, Grätzer considered updating the second edition to reflect some exciting and deep developments. He soon realized that to lay the foundation, to survey the contemporary field, to pose research problems, would require more than one volume and more than one person. So Lattice Theory: Foundation provided the foundation. Now we complete this project with Lattice Theory: Special Topics and Applications, written by a distinguished group of experts, to cover some of the vast areas not in Foundation. This first volume is divided into three parts. Part I. Topology and Lattices includes two chapters by Klaus Keimel, Jimmie Lawson and Ales Pultr, Jiri Sichler. Part II. Special Classes of Finite Lattices comprises four chapters by Gabor Czedli, George Grätzer and Joseph P. S. Kung. Part III. Congruence Lattices of Infinite Lattices and Beyond includes four chapters by Friedrich Wehrung and George Grätzer.