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OverviewThis book presents a guide to the extensive literature on the topic of semirings and includes a complete bibliography. It serves as a complement to the existing monographs and a point of reference to researchers and students on this topic. The literature on semirings has evolved over many years, in a variety of languages, by authors representing different schools of mathematics and working in various related fields. Recently, semiring theory has experienced rapid development, although publications are widely scattered. This survey also covers those newly emerged areas of semiring applications that have not received sufficient treatment in widely accessible monographs, as well as many lesser-known or 'forgotten' works. The author has been collecting the bibliographic data for this book since 1985. Over the years, it has proved very useful for specialists. For example, J.S. Golan wrote he owed '...a special debt to Kazimierz Glazek, whose bibliography proved to be an invaluable guide to the bewildering maze of literature on semirings'. U. Hebisch and H.J. Weinert also mentioned his collection of literature had been of great assistance to them. Now updated to include publications up to the beginning of 2002, this work is available to a wide readership. Full Product DetailsAuthor: K. GlazekPublisher: Springer-Verlag New York Inc. Imprint: Springer-Verlag New York Inc. Edition: 2002 ed. Dimensions: Width: 15.60cm , Height: 2.30cm , Length: 23.40cm Weight: 1.640kg ISBN: 9781402007170ISBN 10: 1402007175 Pages: 392 Publication Date: 30 June 2002 Audience: College/higher education , Professional and scholarly , Undergraduate , Postgraduate, Research & Scholarly Format: Hardback Publisher's Status: Active Availability: In Print  This item will be ordered in for you from one of our suppliers. Upon receipt, we will promptly dispatch it out to you. For in store availability, please contact us. Table of ContentsI: Short Guide to the Literature on Semirings.- 1 Preliminaries.- 2 The Algebraic Theory of Semirings.- 3 Linear Algebra Over Semirings.- 4 Ordered Structures and Semirings.- 5 Selected Applications of Semirings.- II: Bibliography.- 𝔸.- 𝔹.- ?.- 𝔻.- 𝔼.- 𝔽.- 𝔾.- ?.- 𝕀.- 𝕁.- 𝕂.- 𝕃.- 𝕄.- ?.- 𝕆.- ?.- ?.- ?.- 𝕊.- 𝕋.- 𝕌.- 𝕍.- 𝕎.- 𝕏.- 𝕐.- ?.ReviewsFrom the reviews: <p> The book deals with semirings (S, +, .) in the most inclusive sense a ] . part one of the book presents on nearly 90 pages a short guide through the literature of different branches of semiring theory a ] . In part two follows a (nearly) complete bibliography of semirings on about 290 pages. Finally, an excellent index is included which helps the reader to find very quickly the topic of interest and the relevant literature on it. (Udo Hebisch, Zentralblatt MATH, Vol. 1072 (23), 2005) From the reviews: The book deals with semirings (S, +, .) in the most inclusive sense ... . part one of the book presents on nearly 90 pages a short guide through the literature of different branches of semiring theory ... . In part two follows a (nearly) complete bibliography of semirings on about 290 pages. Finally, an excellent index is included which helps the reader to find very quickly the topic of interest and the relevant literature on it. (Udo Hebisch, Zentralblatt MATH, Vol. 1072 (23), 2005) From the reviews: The book deals with semirings (S, +, .) in the most inclusive sense ! . part one of the book presents on nearly 90 pages a short guide through the literature of different branches of semiring theory ! . In part two follows a (nearly) complete bibliography of semirings on about 290 pages. Finally, an excellent index is included which helps the reader to find very quickly the topic of interest and the relevant literature on it. (Udo Hebisch, Zentralblatt MATH, Vol. 1072 (23), 2005) From the reviews: The book deals with semirings (S, +, .) in the most inclusive sense ... . part one of the book presents on nearly 90 pages a short guide through the literature of different branches of semiring theory ... . In part two follows a (nearly) complete bibliography of semirings on about 290 pages. Finally, an excellent index is included which helps the reader to find very quickly the topic of interest and the relevant literature on it. (Udo Hebisch, Zentralblatt MATH, Vol. 1072 (23), 2005) Author InformationTab Content 6Author Website:Countries AvailableAll regions |
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