Residuation Theory aims to contribute to literature in the field of ordered algebraic structures, especially on the subject of residual mappings.
The book is divided into three chapters. Chapter 1 focuses on ordered sets; directed sets; semilattices; lattices; and complete lattices. Chapter 2 tackles Baer rings; Baer semigroups; Foulis semigroups; residual mappings; the notion of involution; and Boolean algebras. Chapter 3 covers residuated groupoids and semigroups; group homomorphic and isotone homomorphic Boolean images of ordered semigroups; Dubreil-Jacotin and Brouwer semigroups; and lolimorphisms.
The book is a self-contained and unified introduction to residual mappings and its related concepts. It is applicable as a textbook and reference book for mathematicians who plan to learn more about the subject.
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|Size: ||33.8 MB|
|Date published: || 2014|
|ISBN: ||9781483157146 (DRM-PDF)|
|Read Aloud: ||not allowed|