
Ebook Info
- Published: 2014
- Number of pages: 268 pages
- Format: PDF
- File Size: 21.08 MB
- Authors: Michael H. Freedman
Description
One of the great achievements of contemporary mathematics is the new understanding of four dimensions. Michael Freedman and Frank Quinn have been the principals in the geometric and topological development of this subject, proving the Poincar and Annulus conjectures respectively. Recognition for this work includes the award of the Fields Medal of the International Congress of Mathematicians to Freedman in 1986. In Topology of 4-Manifolds these authors have collaborated to give a complete and accessible account of the current state of knowledge in this field. The basic material has been considerably simplified from the original publications, and should be accessible to most graduate students. The advanced material goes well beyond the literature; nearly one-third of the book is new. This work is indispensable for any topologist whose work includes four dimensions. It is a valuable reference for geometers and physicists who need an awareness of the topological side of the field.Originally published in 1990.The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.
User’s Reviews
Reviews from Amazon users which were colected at the time this book was published on the website:
⭐Do you know what a Capped grope is? If so, this is the book for you! This is a really readable, though understandably advanced, book. It seems to contain everything a person could possibly want to know about embedding a disk in a 4-manifold. I’m far from an expert on 4-manifolds, but I haven’t seen much of this material presented anywhere else. If you want to become a master of 4-manifolds, you need this book like Luke Skywalker needed Yoda.My copy doesn’t have the cool orange cover so I feel a little sad. Hopefully you won’t get the brown one like me.
⭐This book is advertised as a July 2014 edition. In fact, it is a reprint of the 1990 edition.It was a bit disconcerting to discover this after the purchase.However, it should be useful I guess
⭐It is too bad this book is out of print, for it introduces the reader to a fascinating branch of topology and has the clearest proof of the 4-dimensional Poincare conjecture. In addition, the authors do not hesitate to employ diagrams as needed to illustrate the main points and to assist the reader in visualizing 4-dimensional objects. The authors give a fine discussion as to the reasons why four dimensions is harder to deal with topologically than dimensions five or greater, this being essentially due to the behavior of 2-dimensional disks: mapping 2-disks into 3-manifolds results (generically) with 1-dimensional self-intersections; in 4-dimensions the intersections are isolated points, and in 5 dimensions or more the 2-disks can be embedded. Interestingly, the authors choose not to employ the famous “Kirby calculus” in the proofs of the main results, despite the fact that it was used extensively in their earlier works. They break the book into two parts, the first one emphasizing embedding theorems and the second one the structure of manifolds. Those readers interested in the proof of the 4-dimensional Poincare conjecture will find it in chapter 7, as a consequence of the authors proof of the h-cobordism theorem, the latter being nontrivial. It is the absence of a smooth structure on the h-cobordism that makes it so difficult in dimension four. The existence of exotic structures on 4-manifolds is discussed in detail in chapter 8 and the authors endeavor to show why dimension 4 is unique compared to higher dimensions. The existence of exotic structures on 4-manifolds is definitely interesting, and has recently been shown to have importance in physics. But physicists who need an explicit example of one of these structures will not find one here, and I know of no such examples in the literature. Such an example would be interesting from the standpoint of the behavior of quantum field theories on such 4-manifolds, as one would like to know if this behavior would indeed be different than that on the manifold with the “standard structure”.
⭐he is great
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Free Download Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series) in PDF format
Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series) PDF Free Download
Download Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series) 2014 PDF Free
Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series) 2014 PDF Free Download
Download Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series) PDF
Free Download Ebook Topology of 4-Manifolds (PMS-39), Volume 39 (Princeton Mathematical Series)