From objects to diagrams for ranges of functors

This work introduces tools, from the field of category theory, that make it possible to tackle until now unsolvable representation problems (determination of the range of a given functor). The basic idea is: if a functor lifts many objects, then it also lifts many (poset-indexed) diagrams. The book is centered on two statements: namely, CLL, and its main precursor, the Armature Lemma, which are results of category theory, with hard proofs,which appear here for the first time. Most of the book is aimed at applications outside category theory, and is thus written as a toolbox. The results of the book illustrate how certain representation problems have counterexamples ofdifferent cardinalities such as aleph zero, one, two, and explain why. CLL and the Armature Lemma have a wide application range, which we illustrate with examples in lattice theory, universal algebra, and ring theory. We also give pointers to solutions, made possible by our results, to previously intractable representation problems, with respect to various functors. INDICE: 1 Background. 2 Boolean Algebras Scaled with Respect to a Poset. 3The Condensate Lifting Lemma (CLL). 4 Larders from First-order Structures. 5 Congruence-Preserving Extensions. 6 Larders from von Neumann Regular Rings. 7 Discussion.

• ISBN: 978-3-642-21773-9
• Editorial: Springer Berlin Heidelberg
• Encuadernacion: Rústica
• Páginas: 160
• Fecha Publicación: 01/08/2011
• Nº Volúmenes: 1
• Idioma: Inglés