8 edition of **Techniques of semigroup theory** found in the catalog.

- 395 Want to read
- 3 Currently reading

Published
**1992** by Oxford University Press in Oxford [England], New York .

Written in English

- Semigroups.

**Edition Notes**

Includes bibliographical references (p. [237]-249) and index.

Statement | Peter M. Higgins. |

Series | Oxford science publications |

Classifications | |
---|---|

LC Classifications | QA171 .H56 1991 |

The Physical Object | |

Pagination | x, 258 p. : |

Number of Pages | 258 |

ID Numbers | |

Open Library | OL1546625M |

ISBN 10 | 0198535775 |

LC Control Number | 91025928 |

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This book introduces recently developed ideas and techniques in semigroup theory to provide a handy reference guide previously unavailable in a single volume. The opening chapter provides sufficient background to enable the reader to follow any of the subsequent chapters, and would by itself be suitable for a first course in semigroup : Peter M.

Higgins. This book introduces recently developed ideas and techniques in semigroup theory, providing a handy reference guide previously unavailable in a single volume.

The opening chapter provides sufficient background to enable the reader to follow any of the subsequent chapters, and would by itself be suitable for a first course in semigroup by: Techniques of semigroup theory.

[Peter M Higgins] Recently developed techniques in semigroup theory are introduced in a single self-contained volume. The book is written with clarity, the proofs and arguments are usually presented in a brief and elegant way, and even familiar things are often viewed from a fresh perspective.

This book introduces recently developed ideas and techniques in semigroup theory to provide a handy reference guide previously unavailable in a single volume.

The opening chapter provides sufficient background to enable the reader to follow any of the subsequent chapters, and would by itself be suitable for a first course in semigroup : Peter M. Higgins. This book introduces recently developed ideas and techniques in semigroup theory, providing a handy reference guide previously unavailable in a single volume.

The opening chapter provides sufficient background to enable the reader to follow Author: Peter M. Higgins. Book Review; Published: December Techniques of semigroup theory.

by Peter M. Higgins Oxford University Press, Oxford-New York-Tokyo, x+ pp. ISBN$Cited by: 1. This book introduces recently developed ideas and techniques in semigroup theory, providing a handy reference guide previously unavailable in a single volume.

The opening chapter provides sufficient background to enable the reader to follow any of the subsequent chapters, and would by itself be suitable for a first course in semigroup theory. By Peter M. Higgins: pp., £4000, ISBN 0 19 5 (Oxford Science Publications, ).Author: John Fountain.

Semigroup theory can be used to study some problems in the field of partial differential y speaking, the semigroup approach is to regard a time-dependent partial differential equation as an ordinary differential equation on a function space.

For example, consider the following initial/boundary value problem for the heat equation on the spatial interval (0, 1) ⊂ R and times t. This book is an indispensable source for anyone with an interest in semigroup theory or whose research overlaps with this increasingly important and active field of mathematics.

It clearly emphasizes pure semigroup theory, in particular the various classes of regular semigroups. More than exercises, accompanied by relevant references to the literature, give pointers to areas of the subject. Techniques of Semigroup Theory (Oxford Science Publications) by Peter M.

Higgins () Hardcover – January 1, See all 2 formats and editions Hide other formats and editions. Price New from Used from Hardcover "Please retry" $ $ $ Hardcover, $ $ $ Hardcover $ Manufacturer: Oxford University Press. the basic definitions in semigroup theory; The lecturer will provide a structured week-by-week programme of self-study and lectures, based mainly on Howie’s book, but with references to other material as appropriate.

There will be three timetabled hours per week. HIGGINS, Peter M. Techniques of semigroup theory. A new theory is developed providing a unifying approach to finite semigroup theory via quantization Many important techniques and results are clearly exposited in book form for the first time, thereby updating and modernizing the semigroup theory literature and placing all the most important results into context.

[1] P. Grillet, Semigroups, An Introduction to the Structure Theory, Marcel Dekker, Inc., New York, The following book is slightly more advanced, but contains some interesting material [2] P.

Higgins, Techniques of Semigroup Theory, World Scientific, You may also try. Wikimedia Commons has media related to Semigroup theory. This category includes topics on semigroups, and also on monoids, a special case in which the semigroup has an identity element.

Subcategories. This category has only the following subcategory. Additional Sources for Math Book Reviews; About MAA Reviews; Mathematical Communication; Information for Libraries; Author Resources; Advertise with MAA; Meetings.

MAA MathFest. Register Now; Registration Rates and Other Fees; Exhibitors and Sponsors; Abstracts; Mathematical Sessions. Invited Addresses; Invited Paper Sessions; Contributed Paper. Pritchard A.J. () Introduction to semigroup theory.

In: Curtain R.F., Bensoussan A., Lions J.L. (eds) Analysis and Optimization of Systems: State and Frequency Domain Approaches for Infinite-Dimensional Systems.

Lecture Notes in Control and Information Sciences, vol Springer, Berlin, Heidelberg. First Online 02 December Cited by: This book introduces the reader to the necessary technical background to study C*-algebras arising from actions of groups or semigroups; The text focuses on recent examples and techniques developed in K-Theory; It contains an introduction to Baum-Connes methods as well as a concise description of the Mackey-Rieffel-Green machine for crossed.

This book is an indispensable source for anyone with an interest in semigroup theory or whose research overlaps with this increasingly important and active field of mathematics. It clearly emphasizes "pure" semigroup theory, in particular the various classes of regular semigroups.

More than exercises, accompanied by relevant references to the literature, give pointers to areas of the 5/5(1). With this well-written and well-organised book I think the author has ensured that "Howie" will continue to be a byword for semigroup books * Edinburgh Mathematical Society * This book will still have its outstanding place as a general introduction to semigroup theory offering both an updated overview of the subject and a suitable entree for the graduate student * Monatshefte fur /5(5).

PREFACE So far as we know, the term "semigroup" first appeared in mathematical literature on page 8 of J.-A. de Siguier's book, filaments de la Theorie des Groupes Abstraits (Paris, ), and the first paper about semigroups was a brief one by L.

Dickson in File Size: 5MB. Semihypergroup Theory is the first book devoted to the semihypergroup theory and it includes basic results concerning semigroup theory and algebraic hyperstructures, which represent the most general algebraic context in which reality can be modelled.

Hyperstructures represent a natural extension of classical algebraic structures and they were introduced in by the French mathematician Marty. The Munn semigroup Anti-uniform semilattices Bisimple inverse semigroups Simple inverse semigroups Representations of inverse semigroups.E-unitary inverse semigroups Free inverse monoids Exercises Notes Contents Other classes of regular semigroups Locally inverse semigroups Additional features: (1) For newcomers, an appendix on elementary finite semigroup theory; (2) Extensive bibliography and index.

The q-theory of Finite Semigroups presents important techniques and results, many for the first time in book form, and thereby updates and modernizes the literature of semigroup theory. Introduction Semigroup Theory. You Searched For: Title: introduction semigroup theory.

Edit Your Search. Book is in Used-Good condition. Pages and cover are clean and intact. Used items may not include supplementary materials such as CDs or access codes. May show signs of minor shelf wear and contain limited notes and highlighting.

Group theory and semigroup theory have developed in somewhat diﬀerent directions in the past several decades. While Cayley’s theorem enables us to view groups as groups of permutations of some set, the analogous result in semigroup theory represents semigroups as semigroups of File Size: KB.

P.M. Higgins, Techniques of semigroup theory, Oxford University Press, [Goes to the advanced topics rather fast.

Contains up-to-date proofs for free inverse semigroups, topics on biordered sets, Isbell’s zig-zags, and some combinatorics of transformation semigroups.] J.M.

Howie, An introduction to semigroup theory, Academic Press, File Size: KB. Franz X. Gmeineder Introduction to Semigroup Theory 17/ 1st act: Intro Intermezzo 2nd act: Properties of Generators Intermezzo 3rd act: Hille-Yosida’s Theorem The Hilla - Yosida Theorem Theorem An operator A is the in nitesimal generator of a C 0-contraction semigroup if and only if A is densely de ned and closed, (0;1) ˆˆ(A) and.

The chapter concludes with an introduction to linear semigroup theory, as an alternate approach to constructing solutions of time-dependent problems. Techniques of Functional Analysis for Differential and Integral Equations describes a variety of powerful and modern tools from mathematical analysis, for graduate study and further research.

we recognize that we have a semigroup, instead of studying the IVP directly, we can study it via the semigroup and its applicable theory. The theory of linear semigroups is very well developed [1]. For example, linear semigroup theory actually provides necessary and suﬃcient conditions to determine the well-posedness of a problem [3].

Additional features: (1) For newcomers, an appendix on elementary finite semigroup theory; (2) Extensive bibliography and index. The q-theory of Finite Semigroups presents important techniques and results, many for the first time in book form, and thereby updates. This book gives an account of the necessary background for group algebras and crossed products for actions of a group or a semigroup on a space and reports on some very recently developed techniques with applications to particular examples.

Much of the material is available here for the first time in. Many recent results in finite semigroup theory make use of profinite methods, that is, they rely on the study of certain infinite, compact semigroups which arise as projective limits of finite Author: Pascal Weil.

The q-theory of Finite Semigroups presents important techniques and results, many for the first time in book form, and thereby updates and modernizes the literature of semigroup theory.\/span>\"@ en\/a> ; \u00A0\u00A0\u00A0\n schema:description\/a> \" Preface -- Introduction -- 1.

Foundations for Finite Semigroup Theory -- 2. The q-operator -- 3. PDF | Semihypergroup Theory is the first book devoted to the semihypergroup theory and it includes basic results concerning semigroup theory and | Find, read and cite all the research you need.

The analytical theory of one-parameter semi-groups deals with the ex-1 ponential function in inﬁnite dimensional function spaces.

It is a natural generalization of the theorem of Stone on one-parameter groups of uni-tary operators in a Hilbert space. In these lectures, we Cited by: 6. This work offers concise coverage of the structure theory of semigroups. It examines constructions and descriptions of semigroups and emphasizes finite, commutative, regular and inverse semigroups.

Many structure theorems on regular and commutative semigroups are introduced.;College or university bo. In mathematics, a partial function is a binary relation over two sets that associates to every element of the first set at most one element of the second set.

It generalizes the concept of a function by not requiring every element of the first set to be associated to at least one element of the second set. Consequently, the domain of definition of a partial function can be a proper subset of. Semigroup Theory; Access options Buy single article.

Instant access to the full article PDF. US$ Price includes VAT for USA. Subscribe to journal. Immediate online access to all issues from Subscription will auto renew annually. US$ This is Author: B.M. Schein. Techniques of Semigroup Theory (Oxford Science Publications) by Peter M. Higgins (): Peter M.

Higgins: Books - or: Peter M. Higgins. Motivated by applications to control theory and to the theory of partial differential equations (PDE's), the authors examine the exponential stability and analyticity of C0-semigroups associated with various dissipative systems.

They present a unique, systematic approach in which they prove exponent.This comprehensive, encyclopedic text in four parts aims to give the reader &#; from the graduate student to the researcher/practitioner &#; a detailed understanding of modern finite semigroup theory, focusing in particular on advanced topics on the cutting edge of research.

The Price: $WHY STUDY SEMIGROUPS? John M. Howie Lecture given to the New Zealand Mathematical Colloquium (Received June ) 1. Introduction Before tackling the question in my title I should perhaps begin by saying what a semigroup is. A non-empty set S endowed with a single binary operation. is called a semigroup if, for all x, y, z in S,Author: Why Study Semigroups, John M.

Howie.