Algebraic K-Theory of ∞-Operads

AbstractThe theory of dendroidal sets has been developed to serve as a combinatorial model for homotopy coherent operads, see [MW07, CM13b]. An ∞-operad is a dendroidal setDsatisfying certain lifting conditions.In this paper we give a definition of K-groupsKn(D) for a dendroidal setD. These groups generalize the K-theory of symmetric monoidal (resp. permutative) categories and algebraic K-theory of rings. We establish some useful properties like invariance under the appropriate equivalences and long exact sequences which allow us to compute these groups in some examples. Using results from [Heu11b] and [BN12] we show that theK-theory groups ofDcan be realized as homotopy groups of a K-theory spectrum.

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Path homology theory of edge-colored graphs

Open Mathematics ◽

10.1515/math-2021-0049 ◽

2021 ◽

Vol 19 (1) ◽

pp. 706-723

Author(s):

Yuri V. Muranov ◽

Anna Szczepkowska

Keyword(s):

Spectral Sequence ◽

Edge Coloring ◽

Homology Theory ◽

Homotopy Category ◽

Homology Groups ◽

Colored Graphs ◽

Natural Filtration ◽

Definition Of ◽

Exact Sequences

Abstract In this paper, we introduce the category and the homotopy category of edge-colored digraphs and construct the functorial homology theory on the foundation of the path homology theory provided by Grigoryan, Muranov, and Shing-Tung Yau. We give the construction of the path homology theory for edge-colored graphs that follows immediately from the consideration of natural functor from the category of graphs to the subcategory of symmetrical digraphs. We describe the natural filtration of path homology groups of any digraph equipped with edge coloring, provide the definition of the corresponding spectral sequence, and obtain commutative diagrams and braids of exact sequences.

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p-Hyperbolicity of homotopy groups via K-theory

Mathematische Zeitschrift ◽

10.1007/s00209-021-02917-1 ◽

2022 ◽

Author(s):

Guy Boyde

Keyword(s):

Homotopy Groups ◽

K Theory

AbstractWe show that $$S^n \vee S^m$$ S n ∨ S m is $${\mathbb {Z}}/p^r$$ Z / p r -hyperbolic for all primes p and all $$r \in {\mathbb {Z}}^+$$ r ∈ Z + , provided $$n,m \ge 2$$ n , m ≥ 2 , and consequently that various spaces containing $$S^n \vee S^m$$ S n ∨ S m as a p-local retract are $${\mathbb {Z}}/p^r$$ Z / p r -hyperbolic. We then give a K-theory criterion for a suspension $$\Sigma X$$ Σ X to be p-hyperbolic, and use it to deduce that the suspension of a complex Grassmannian $$\Sigma Gr_{k,n}$$ Σ G r k , n is p-hyperbolic for all odd primes p when $$n \ge 3$$ n ≥ 3 and $$0<k<n$$ 0 < k < n . We obtain similar results for some related spaces.

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K-Theory and the Jones Polynomial

Reviews in Mathematical Physics ◽

10.1142/s0129055x18400020 ◽

2018 ◽

Vol 30 (06) ◽

pp. 1840002

Author(s):

Michael F. Atiyah ◽

Carlos Zapata-Carratala

Keyword(s):

Jones Polynomial ◽

New Approach ◽

K Theory ◽

Definition Of

In this paper, we present a new approach to the definition of the Jones polynomial using equivariant K-theory. Dedicated to Ludwig Faddeev

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l′-Isolated Maps and Localizations

Canadian Journal of Mathematics ◽

10.4153/cjm-1983-013-9 ◽

1983 ◽

Vol 35 (2) ◽

pp. 193-217

Author(s):

Sara Hurvitz

Keyword(s):

Finite Number ◽

Free Algebra ◽

Nilpotent Groups ◽

Homotopy Groups ◽

Homology Groups ◽

Rational Cohomology ◽

Locally Nilpotent Groups ◽

Definition Of ◽

Simply Connected ◽

Path Connected

Let P be the set of primes, l ⊆ P a subset and l′ = P – l Recall that an H0-space is a space the rational cohomology of which is a free algebra.Cassidy and Hilton defined and investigated l′-isolated homomorphisms between locally nilpotent groups. Zabrodsky [8] showed that if X and Y are simply connected H0-spaces either with a finite number of homotopy groups or with a finite number of homology groups, then every rational equivalence f : X → Y can be decomposed into an l-equivalence and an l′-equivalence.In this paper we define and investigate l′-isolated maps between pointed spaces, which are of the homotopy type of path-connected nilpotent CW-complexes. Our definition of an l′-isolated map is analogous to the definition of an l′-isolated homomorphism. As every homomorphism can be decomposed into an l-isomorphism and an l′-isolated homomorphism, every map can be decomposed into an l-equivalence and an l′-isolated map.

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Non-abelian exterior products of groups and exact sequences in the homology of groups

Glasgow Mathematical Journal ◽

10.1017/s0017089500006637 ◽

1987 ◽

Vol 29 (1) ◽

pp. 13-19 ◽

Cited By ~ 19

Author(s):

G. J. Ellis

Keyword(s):

Exact Sequence ◽

Short Exact Sequence ◽

Type Theorem ◽

Exterior Product ◽

Products Of Groups ◽

Hopf Formula ◽

Definition Of ◽

Image Position ◽

Exact Sequences

Various authors have obtained an eight term exact sequence in homologyfrom a short exact sequence of groups,the term V varying from author to author (see [7] and [2]; see also [5] for the simpler case where N is central in G, and [6] for the case where N is central and N ⊂ [G, G]). The most satisfying version of the sequence is obtained by Brown and Loday [2] (full details of [2] are in [3]) as a corollary to their van Kampen type theorem for squares of spaces: they give the term V as the kernel of a map G ∧ N → N from a “non-abelian exterior product” of G and N to the group N (the definition of G ∧ N, first published in [2], is recalled below). The two short exact sequencesandwhere F is free, together with the fact that H2(F) = 0 and H3(F) = 0, imply isomorphisms..The isomorphism (2) is essentially the description of H2(G) proved algebraically in [11]. As noted in [2], the isomorphism (3) is the analogue for H3(G) of the Hopf formula for H2(G).

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A Combinatorial Definition of Homotopy Groups

Annals of Mathematics ◽

10.2307/1970006 ◽

1958 ◽

Vol 67 (2) ◽

pp. 282 ◽

Cited By ~ 71

Author(s):

Daniel M. Kan

Keyword(s):

Homotopy Groups ◽

Definition Of

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Classification of extensions of certain C * -algebras by their six term exact sequences in K -theory

Mathematische Annalen ◽

10.1007/s002080050067 ◽

1997 ◽

Vol 308 (1) ◽

pp. 93-117 ◽

Cited By ~ 24

Author(s):

Mikael Rørdam

Keyword(s):

C Algebras ◽

K Theory ◽

Exact Sequences

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Category with a natural cone

Open Mathematics ◽

10.1007/s11533-005-0002-5 ◽

2006 ◽

Vol 4 (1) ◽

pp. 5-33

Author(s):

Francisco Díaz ◽

Sergio Rodríguez-Machín

Keyword(s):

Homotopy Theory ◽

Homotopy Groups ◽

Axiomatic Theory ◽

Exact Sequences

AbstractGenerally, in homotopy theory a cylinder object (or, its dual, a path object) is used to define homotopy between morphisms, and a cone object is used to build exact sequences of homotopy groups. Here, an axiomatic theory based on a cone functor is given. Suspension objects are associated to based objects and cofibrations, obtaining homotopy groups referred to an object and relative to a cofibration, respectively. Exact sequences of these groups are built. Algebraic and particular examples are given. We point out that the main results of this paper were already stated in [3], and the purpose of this article is to give full details of the foregoing.

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