A Non-Hausdorff Completion (ePub)

This book introduces entirely new invariants never considered before, in homological algebra and commutative (and even non-commutative) algebra. The C-completion C(M), and higher C-completions, Cn(M), are defined for an arbitrary left module M over a topological ring A. Spectral sequences are defined that use these invariants. Given a left module over a topological ring A, under mild conditions the usual Hausdorff completion: M^ can be recovered from the C-completion C(M), by taking the quotient module by the closure of {0}.The new invariants and tools in this book are expected to be used in the study of p-adic cohomology in algebraic geometry; and also in the study of p-adic Banach spaces — by replacing the cumbersome "complete tensor product" of p-adic Banach spaces, with the more sophisticated "C-complete tensor product", discussed in this book.It is also not unlikely that the further study of these new invariants may well develop into a new branch of abstract mathematics - connected with commutative algebra, homological algebra, and algebraic topology. Request Inspection Copy Contents:Admissible Topological RingsThe C-completion of an Abstract Module over a Topological RingThe Case of an Admissible Topological RingThe Higher C-completionsThe Direct Sum and Direct Limit of C-complete Left A-modulesExt and Tor in the Category of C-complete Left A-modulesReadership: Graduate students and researchers in algebra and number theory, geometry and topology.Key Features:The material in this book is entirely new and original — there are no competing titles