7 edition of **Homotopy invariant algebraic structures on topological spaces** found in the catalog.

- 243 Want to read
- 3 Currently reading

Published
**1973**
by Springer in Berlin, Heidelberg, New York
.

Written in English

- Homotopy theory.,
- Loop spaces.,
- Categories (Mathematics)

**Edition Notes**

Bibliography: p. 254-257.

Statement | [by] J. M. Boardman [and] R. M. Vogt. |

Series | Lecture notes in mathematics, 347, Lecture notes in mathematics (Springer-Verlag) ;, 347. |

Contributions | Vogt, Rainer, joint author. |

Classifications | |
---|---|

LC Classifications | QA3 .L28 no. 347, QA612.7 .L28 no. 347 |

The Physical Object | |

Pagination | x, 257 p. |

Number of Pages | 257 |

ID Numbers | |

Open Library | OL5420224M |

ISBN 10 | 0387064796 |

LC Control Number | 73013427 |

Many books on algebraic topology give invariants to show some spaces are not homotopy equivalent, but one also needs methods of proving directly that certain spaces are homotopy equivalent, and the gluing rule can be a convenient tool for this, as examples in the book show. Abstract In [fdn2018.com] we proved that strongly homotopy algebras are homotopy invariant concepts in the category of chain complexes. The paper is a continuation of our program to translate the famous book "M. Boardman, R. Vogt: Homotopy Invariant Algebraic Structures on Topological Spaces" to algebra. Bibtex entry for this abstract.

Algebraic Topology - Homotopy and Homology. In the early s his research concentrated on obstruction theory in connection with holomorphic bundles on projective spaces. It is a good course which leads the reader systematically to the point at which he can begin to tackle problems in algebraic topology. This book remains one of. Any property of a topological space that is invariant under homeomorphisms. and later to still other algebraic structures such as, for example, the Betti groups or homology groups of different dimensions Topological invariant. Encyclopedia of Mathematics.

Boardman introduced the stable homotopy category in His notes on this subject were never formally published, but Rainer Vogt gave a course on this subject in Aarhus in course notes; He coauthored with Vogt the famous book. Homotopy invariant algebraic structures on topological spaces, Springer Lecture Notes in Math (). Homotopy equivalence is important because in algebraic topology many concepts are homotopy invariant, that is, they respect the relation of homotopy equivalence. For example, if X and Y are homotopy equivalent spaces, then: X is path-connected if .

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Homotopy Invariant Algebraic Structures on Topological Spaces. Authors; J. Boardman; R. Vogt; Book. Citations; 6 Topological-algebraic theories. Boardman, R. Vogt. Pages Algebraic Algebraic Structures Algebraische Struktur Homotopie Homotopy Invariant Morphism Spaces Topological Spaces Topologischer Raum algebra.

fdn2018.com: Homotopy Invariant Algebraic Structures on Topological Spaces (Lecture Notes in Mathematics) (): J. Boardman, R. Vogt: Books. Homotopy Invariant Algebraic Structures on Topological Spaces It seems that you're in USA. We have a dedicated site for USA Homotopy Invariant Algebraic Structures on Topological Spaces.

Authors: Boardman, J. M., Vogt, R. M Topological-algebraic theories. Pages The Paperback of the Homotopy Invariant Algebraic Structures on Topological Spaces by J. Boardman, R. Vogt | at Barnes & Noble. FREE Shipping on B&N Outlet Membership Educators Gift Cards Stores & Events Help.

Jul 22, · Buy Homotopy theory: an introduction to algebraic topology, Volume 64 These groups roughly will represent properties invariant under homotopy for the space for which they are calculated.

The determinative property of this functoriality is that commutative diagrams in the first category must map to commutative diagrams in the second or /5(2). Homotopy Invariant Algebraic Structures on Topological Spaces.

Homotopy homomorphisms. In: Homotopy Invariant Algebraic Structures on Topological Spaces. Lecture Notes in Mathematics, vol Print ISBN ; Online ISBN ; eBook Packages Springer Book Archive; Buy this book on publisher's site; Reprints. Aug 27, · Homotopy Invariant Algebraic Structures on Topological Spaces.

Homotopy Invariant Algebraic Structures on Topological Spaces pp | Cite as. Homotopy colimits. Homotopy colimits. In: Homotopy Invariant Algebraic Structures on Topological Spaces. Lecture Notes in Mathematics, vol Springer, Berlin, Heidelberg.

First Online Aug 27, · Boardman J.M., Vogt R.M. () Structures on based spaces. In: Homotopy Invariant Algebraic Structures on Topological Spaces. Lecture Notes in Mathematics, vol Author: J.

Boardman, R. Vogt. The paper is a continuation of our program to translate the famous book "M. Boardman, R. Vogt: Homotopy Invariant Algebraic Structures on Topological Spaces" Author: Martin Markl.

Something about the definition of homotopy in algebraic topology (and in particular in the study of the fundamental group) always puzzled me. Most books on the fundamental group often begin with the basic notion of a homotopy of curves (or more generally, continuous functions between topological spaces) and describe it intuitively as "a.

Book Title:Homotopy Invariant Algebraic Structures on Topological Spaces (Lecture Notes in Mathematics) (Volume 0) Author(s):J.

Boardman; R. Vogt () Click on the link below to start the download Homotopy Invariant Algebraic Structures on Topological Spaces (Lecture Notes in Mathematics) (Volume 0). Algebraic topology is the branch of topology where algebraic methods are used to solve topological problems. First, let's recall the fundamental problem of topology; given topological spaces and, to determine whether they are fdn2018.com that two spaces are homeomorphic if and only if there exists a homeomorphism, that is, an open continuous bijection, between them.

He coauthored with Boardman the famous book Homotopy invariant algebraic structures on topological spaces, Springer Lecture Notes in Math (). This book introduced the notion of weak Kan complex that was later popularized by André Joyal under the name quasi-category as a natural basis for the higher category theory of (∞,1)-categories.

Buy A Physicist's Introduction to Algebraic Structures: Vector Spaces, Groups, Topological Spaces and More on fdn2018.com FREE SHIPPING on qualified ordersAuthor: Palash B. Pal. ISBN: OCLC Number: Description: x, pages 24 cm. Contents: Motivation and historical survey --Topological-algebraic theories --The bar construction for theories --Homotopy homomorphisms --Structures on based spaces --Iterated loop spaces and actions on classifying spaces --Homotopy colimits.

The paper is a continuation of our program to translate the famous book "M. Boardman, R. Vogt: Homotopy Invariant Algebraic Structures on Topological Spaces" Cited by: Algebraic topology is a branch of mathematics that uses tools from algebra to study topological spaces.

The basic goal is to find algebraic invariants that classify topological spaces up to homeomorphism, though usually most classify up to homotopy equivalence. The most important of these invariants are homotopy groups, homology, and cohomology. This book develops abstract homotopy theory from the categorical perspective with a particular focus on examples.

Part I discusses two competing perspectives by which one typically first encounters homotopy (co)limits: either as derived functors definable when the appropriate diagram categories admit a compatible model structure, or through particular formulae that give the right notion in Cited by: Sep 03, · He is probably best-known to Café readers for his work on homotopy-algebraic structures, especially his seminal book with Michael Boardman, Homotopy Invariant Algebraic Structures on Topological Spaces.

The Homotopy Theory of (∞,1)-Categories; The Homotopy Theory of (∞,1)-Categories. The Homotopy Theory of (∞,1)-Categories J.M., and Vogt, R.M., Homotopy Invariant Algebraic Structures on Topological Spaces, Lecture Notes in Equivalences between homotopy theories of diagrams, Algebraic Topology and Algebraic K-Theory, Annals of Cited by: 3.

So singular homology is in fact defined on the homotopy category of topological spaces. But the usual definition of singular homology is on the category of topological spaces, and you can show that it is homotopy-invariant only after having defined it on the category of topological spaces.In their famous book Homotopy invariant algebraic structures on topological spaces J.

Michael Boardman and Rainer Vogt called them quasi-categories. A quasi-category is a simplicial set satisfying the weak Kan condition, so quasi-categories are also called weak Kan complexes.

Daniel Quillen.Homotopy Invariant Algebraic Structures on Topological Spaces pp | Cite as. Topological-algebraic theories. Authors Topological-algebraic theories.

In: Homotopy Invariant Algebraic Structures on Topological Spaces. Lecture Notes in Mathematics, vol Springer, Berlin, Heidelberg Author: J. M. Boardman, R. M. Vogt.