From: Marco Grandis <grandis@dima.unige.it>
To: categories@mta.ca
Subject: A book on Homological Algebra
Date: Mon, 25 Jun 2012 09:29:40 +0200 [thread overview]
Message-ID: <E1Sj9Pb-0005vM-UB@mlist.mta.ca> (raw)
The following book has been published at World Scientific;
below there is a copy of its presentation in the WS web page.
Best regards to colleagues and friends
Marco Grandis
_____________________________________________________________
HOMOLOGICAL ALGEBRA
The Interplay of Homology with Distributive Lattices and Orthodox
Semigroups
by Marco Grandis
World Scientific Publishing Co., 384pp
General information: http://www.worldscibooks.com/mathematics/
8483.html
Table of Contents (45k): http://www.worldscibooks.com/etextbook/
8483/8483_toc.pdf
Preface (37k): http://www.worldscibooks.com/etextbook/
8483/8483_preface.pdf
Introduction (123k): http://www.worldscibooks.com/etextbook/
8483/8483_intro.pdf
Chapter 1: Coherence and models in homological algebra (333k):
http://www.worldscibooks.com/etextbook/8483/8483_chap01.pdf
In this book we want to explore aspects of coherence in homological
algebra, that already appear in the classical situation of abelian
groups or abelian categories.
Lattices of subobjects are shown to play an important role in the
study of homological systems, from simple chain complexes to all the
structures that give rise to spectral sequences. A parallel role is
played by semigroups of endorelations.
These links rest on the fact that many such systems, but not all of
them, live in distributive sublattices of the modular lattices of
subobjects of the system.
The property of distributivity allows one to work with induced
morphisms in an automatically consistent way, as we prove in a
‘Coherence Theorem for homological algebra’. (On the contrary, a ‘non-
distributive’ homological structure like the bifiltered chain complex
can easily lead to inconsistency, if one explores the interaction of
its two spectral sequences farther than it is normally done.)
The same property of distributivity also permits representations of
homological structures by means of sets and lattices of subsets,
yielding a precise foundation for the heuristic tool of Zeeman
diagrams as universal models of spectral sequences.
We thus establish an effective method of working with spectral
sequences, called ‘crossword chasing’, that can often replace the
usual complicated algebraic tools and be of much help to readers that
want to apply spectral sequences in any field.
Contents:
Introduction
Coherence and Models in Homological Algebra
Puppe-Exact Categories
Involutive Categories
Categories of Relations as RE-Categories
Theories and Models
Homological Theories and Their Universal Models
Appendix A: Some Points of Category Theory
Appendix B: A Proof for the Universal Exact System
[For admin and other information see: http://www.mta.ca/~cat-dist/ ]
reply other threads:[~2012-06-25 7:29 UTC|newest]
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