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Your search keyword '"55P45"' showing total 22 results
Start Over Descriptor "55P45" Topic geometry and topology
22 results on '"55P45"'

1. On phantom maps into co-H–spaces

Author

James Schwass

Subjects
Pure mathematics, Coalgebra, Homotopy, 010102 general mathematics, Type (model theory), Space (mathematics), 01 natural sciences, Suspension (topology), Imaging phantom, Nilpotent, phantom maps, Tensor (intrinsic definition), 0103 physical sciences, FOS: Mathematics, Algebraic Topology (math.AT), 55S37, 55P45, Mathematics - Algebraic Topology, 010307 mathematical physics, Geometry and Topology, 55P45, 0101 mathematics, 55S37, Mathematics, co-H–spaces
Abstract

We study the existence of essential phantom maps into co-H-spaces, motivated by Iriye's observation that every suspension space $Y$ of finite type with $H_i(Y;\QQ)\neq 0$ for some $i>1$ is the target of essential phantom maps. We show that Iriye's observation can be extended to the collection of nilpotent, finite type co-H-spaces. This work hinges on an enhanced understanding of the connections between homotopy decompositions of looped co-H-spaces and coalgebra decompositions of tensor algebras due to Grbi\`{c}, Theriault, and Wu., Comment: A conjecture left open in an earlier version of this manuscript has been resolved in this updated version

Published
2017

2. Erratum for 'An elementary construction of Anick’s fibration'

Author

Brayton Gray and Stephen Theriault

Subjects
Pure mathematics, Homotopy, Fibration, Combinatorics, 55P40, 55Q51, Simply connected space, 55Q52, Anick's spaces, 55P45, Geometry and Topology, 55P35, $H$–fibration, Mathematics
Abstract

2S2nC1 n ! S 1 E 2 !2S2nC1 is the .p /th power map. This construction was carried out for any p > 3 and r > 1. We also proved in [3, Theorem 4.3] that there is an H –space structure on T2n 1 such that (1) is an H –fibration. The proof of 4.3 involved induction over the skeleton of T2n 1 and cycled through 14 steps ..a/; : : : ; .n//. The argument given for the proof of [3, Theorem 4.3(l)] contained an incorrect statement and is not valid. The purpose of this note is to supply a correct proof for 4.3(l). We will abbreviate T2n 1 as T and write T m for the m skeleton of T . Recall that W a is the collection of all spaces that are of the homotopy type of a simply connected locally finite wedge of mod p Moore spaces for a s b .

Published
2013
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3. Fibrewise rational H-spaces

Author

Gregory Lupton and Samuel B. Smith

Subjects
Class (set theory), Pure mathematics, Hopf Theorem, Leray–Samelson Theorem, Rationalization (economics), Mathematics::Algebraic Topology, gauge group, 55R70, 55P62, Sullivan minimal model, FOS: Mathematics, Algebraic Topology (math.AT), fiberwise homotopy, 55P45, Mathematics - Algebraic Topology, Geometry and Topology, adjoint bundle, H-space, Mathematics::Symplectic Geometry, Mathematics
Abstract

We prove fibrewise versions of classical theorems of Hopf and Leray-Samelson. Our results imply the fibrewise H-triviality after rationalization of a certain class of fibrewise H-spaces. They apply, in particular, to universal adjoint bundles. From this, we may retrieve a result of Crabb and Sutherland [Proc. London Math. Soc. (2000), 747-768], which is used there as a crucial step in establishing their main finiteness result., Comment: 21 pages

Published
2012
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4. CONTINUOUS TRACE C*-ALGEBRAS, GAUGE GROUPS AND RATIONALIZATION

Author

John R. Klein, Claude Schochet, and Samuel B. Smith

Subjects
46J05, Pure mathematics, Classifying space, Mathematics::General Mathematics, Mathematics::Number Theory, High Energy Physics::Lattice, Clifford bundle, 54C35, Line bundle, Normal bundle, FOS: Mathematics, Algebraic Topology (math.AT), 55P15, Fiber bundle, Mathematics - Algebraic Topology, Mathematics, 46L85, 55P62, 55P45, K-Theory and Homology (math.KT), Tautological line bundle, Principal bundle, Frame bundle, Algebra, Mathematics - K-Theory and Homology, Geometry and Topology, Analysis
Abstract

Let \zeta be an n-dimensional complex matrix bundle over a compact metric space X and let A_\zeta denote the C*-algebra of sections of this bundle. We determine the rational homotopy type as an H-space of UA_\zeta, the group of unitaries of A_\zeta. The answer turns out to be independent of the bundle \zeta and depends only upon n and the rational cohomology of X. We prove analogous results for the gauge group and the projective gauge group of a principal bundle over a compact metric space X., Comment: Final version. To appear in J. of Topology and Analysis. Garbled text in abstract removed

Published
2009
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5. Connectivity of motivic $H$–spaces

Author

Utsav Choudhury

Subjects
Pure mathematics, homotopy pullback, 14F42, Mathematics::Algebraic Geometry, $\mathbb{A}^1$–homotopy theory, $H$–spaces, Sheaf, Component (group theory), Geometry and Topology, 55P45, Invariant (mathematics), 18E35, Mathematics
Abstract

In this note we prove that the [math] –connected component sheaf [math] of an [math] –group [math] is [math] –invariant.

Published
2014

6. Excision for deformation K-theory of free products

Author

Daniel A. Ramras

Subjects
Pure mathematics, Functor, Group (mathematics), Discrete group, Homotopy, 19D23, 55P45, K-Theory and Homology (math.KT), Spectrum (topology), deformation $K$–theory, Trivial group, Topological category, 19D23, group completion, Free product, Mathematics::Category Theory, Mathematics - K-Theory and Homology, FOS: Mathematics, excision, Algebraic Topology (math.AT), Geometry and Topology, 55P45, Mathematics - Algebraic Topology, Mathematics
Abstract

Associated to a discrete group $G$, one has the topological category of finite dimensional (unitary) $G$-representations and (unitary) isomorphisms. Block sums provide this category with a permutative structure, and the associated $K$-theory spectrum is Carlsson's deformation $K$-theory of G. The goal of this paper is to examine the behavior of this functor on free products. Our main theorem shows the square of spectra associated to $G*H$ (considered as an amalgamated product over the trivial group) is homotopy cartesian. The proof uses a general result regarding group completions of homotopy commutative topological monoids, which may be of some independent interest., 32 pages, 1 figure. Final version: The title has changed, and the paper has been substantially revised to improve clarity

Published
2007

7. An elementary construction of Anick's fibration

Author

Brayton Gray and Stephen Theriault

Subjects
Pure mathematics, Sequence, Moore space (topology), Degree (graph theory), EHP sequence, Structure (category theory), Fibration, Suspension (topology), Spectrum (topology), Mathematics::Algebraic Topology, double suspension, 55P45, 55P40, 55P35, H-space, 55P40, FOS: Mathematics, Algebraic Topology (math.AT), Geometry and Topology, 55P45, Mathematics - Algebraic Topology, 55P35, Anick's fibration, Moore space, Mathematics
Abstract

Cohen, Moore, and Neisendorfer's work on the odd primary homotopy theory of spheres and Moore spaces, as well as the first author's work on the secondary suspension, predicted the existence of a p-local fibration S^2n-1 --> T --> ��S^2n+1 whose connecting map is degree p^r. In a long and complex monograph, Anick constructed such a fibration for p>= 5 and r>= 1. Using new methods we give a much more conceptual construction which is also valid for p=3 and r>= 1. We go on to establish several properties of the space T., 30 pages

Published
2007
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8. Retractions of {$H$}-spaces

Author

Yutaka Hemmi

Subjects
Discrete mathematics, Pure mathematics, Algebra and Number Theory, Homotopy lifting property, Homotopy, Suspension (topology), Mathematics::Algebraic Topology, Regular homotopy, n-connected, Homotopy sphere, Mathematics::Category Theory, Loop space, FOS: Mathematics, Algebraic Topology (math.AT), Multiplication, Geometry and Topology, Mathematics - Algebraic Topology, 55P45, Analysis, Mathematics, 55P45 (Primary) 55R35 (Secondary)
Abstract

Stasheff showed that if a map between H-spaces is an H-map, then the suspension of the map is extendable to a map between cprojective planes of the H-spaces. Stahseff also proved the converse under the assumption that the multiplication of the target space of the map is homotopy associative. We show by giving an example that the assumption of homotopy associativity of the multiplication of the target space is necessary to show the converse. We also show an analogous fact for maps between higher homotopy associative H-spaces., 6 pages

Published
2005

9. Self-homotopy equivalences of $\rm SO(4)$

Author

Kohhei Yamaguchi

Subjects
Pure mathematics, Algebra and Number Theory, 55P10, Homotopy, Geometry and Topology, 55P45, Analysis, Mathematics, 55Q05
Published
2000

10. On maps into a co-$H$-space

Author

Marek Golasiński and John R. Klein

Subjects
H-space, Pure mathematics, Algebra and Number Theory, 55P45, Geometry and Topology, 18C15, Analysis, Mathematics
Published
1998
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12. Homotopy coalgebras and $k$-fold suspensions

Author

Marek Golasiński and Martin Arkowitz

Subjects
Pure mathematics, 55P40, Algebra and Number Theory, Fold (higher-order function), Homotopy, 55P15, Geometry and Topology, 55P45, Topology, 18C15, Analysis, Mathematics
Published
1997

13. Homotopy commutativity of the loop space of a finite CW-complex

Author

Hideyuki Kachi

Subjects
Pure mathematics, Algebra and Number Theory, Homotopy lifting property, Homotopy, Eilenberg–MacLane space, Aspherical space, Topology, Suspension (topology), Regular homotopy, n-connected, Loop space, 55P45, Geometry and Topology, 55P35, Analysis, Mathematics
Published
1990
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14. Splitting off rational parts in homotopy types

Author

Norio Iwase and Nobuyuki Oda

Subjects
Homotopy groups of spheres, Homotopy group, Pure mathematics, Fundamental group, Homotopy category, Eilenberg–MacLane space, 55P45, 55P62, Whitehead theorem, G-space, Elementary abelian group, Mathematics::Algebraic Topology, Algebra, n-connected, Mathematics::K-Theory and Homology, T-space, FOS: Mathematics, Algebraic Topology (math.AT), Mathematics - Algebraic Topology, Geometry and Topology, Rational splitting, Hopf space, Mathematics
Abstract

It is known algebraically that any abelian group is a direct sum of a divisible group and a reduced group (See Theorem 21.3 of \cite{Fuchs:abelian-group}). In this paper, conditions to split off rational parts in homotopy types from a given space are studied in terms of a variant of Hurewicz map, say $\bar{\rho} : [S_{\Q}^{n},X] \to H_n(X;\Z)$ and generalized Gottlieb groups. This yields decomposition theorems on rational homotopy types of Hopf spaces, $T$-spaces and Gottlieb spaces, which has been known in various situations, especially for spaces with finiteness conditions., Comment: 6 pages

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