General Heart Construction on a Triangulated Category (II): Associated Homological Functor

Given a thick subcategory of a triangulated category, we define a colocalisation and a natural long exact sequence that involves the original category and its localisation and colocalisation at the subcategory. Similarly, we construct a natural long exact sequence containing the canonical map between a homological functor and its total derived functor with respect to a thick subcategory.

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On the Voevodsky motive of the moduli space of Higgs bundles on a curve

Selecta Mathematica ◽

10.1007/s00029-020-00610-5 ◽

2021 ◽

Vol 27 (1) ◽

Author(s):

Victoria Hoskins ◽

Simon Pepin Lehalleur

Keyword(s):

Moduli Space ◽

Moduli Spaces ◽

Characteristic Zero ◽

Rational Point ◽

Triangulated Category ◽

Higgs Bundles ◽

Projective Curve ◽

Smooth Projective Curve ◽

De Rham

AbstractWe study the motive of the moduli space of semistable Higgs bundles of coprime rank and degree on a smooth projective curve C over a field k under the assumption that C has a rational point. We show this motive is contained in the thick tensor subcategory of Voevodsky’s triangulated category of motives with rational coefficients generated by the motive of C. Moreover, over a field of characteristic zero, we prove a motivic non-abelian Hodge correspondence: the integral motives of the Higgs and de Rham moduli spaces are isomorphic.

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Recollements, comma categories and morphic enhancements

Proceedings of the Royal Society of Edinburgh Section A Mathematics ◽

10.1017/prm.2021.8 ◽

2021 ◽

pp. 1-25

Author(s):

Xiao-Wu Chen ◽

Jue Le

Keyword(s):

Module Category ◽

Triangulated Category ◽

Triangulated Categories ◽

Comma Category ◽

The Right ◽

Projective Lines ◽

Triangle Functor

For each recollement of triangulated categories, there is an epivalence between the middle category and the comma category associated with a triangle functor from the category on the right to the category on the left. For a morphic enhancement of a triangulated category $\mathcal {T}$ , there are three explicit ideals of the enhancing category, whose corresponding factor categories are all equivalent to the module category over $\mathcal {T}$ . Examples related to inflation categories and weighted projective lines are discussed.

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Homological functor of a torsion free crystallographic group of dimension five with a nonabelian point group

10.1063/1.4882560 ◽

2014 ◽

Author(s):

Tan Yee Ting ◽

Nor'ashiqin Mohd. Idrus ◽

Rohaidah Masri ◽

Nor Haniza Sarmin ◽

Hazzirah Izzati Mat Hassim

Keyword(s):

Point Group ◽

Crystallographic Group ◽

Homological Functor ◽

Torsion Free

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MODEL STRUCTURES ON TRIANGULATED CATEGORIES

Glasgow Mathematical Journal ◽

10.1017/s0017089514000299 ◽

2014 ◽

Vol 57 (2) ◽

pp. 263-284 ◽

Cited By ~ 5

Author(s):

XIAOYAN YANG

Keyword(s):

Proper Class ◽

Triangulated Category ◽

Triangulated Categories ◽

General Study ◽

Proper Class Of Triangles ◽

Cotorsion Pairs ◽

One To One ◽

The Relationship ◽

Model Structures

AbstractWe define model structures on a triangulated category with respect to some proper classes of triangles and give a general study of triangulated model structures. We look at the relationship between these model structures and cotorsion pairs with respect to a proper class of triangles on the triangulated category. In particular, we get Hovey's one-to-one correspondence between triangulated model structures and complete cotorsion pairs with respect to a proper class of triangles. Some applications are given.

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Geometric Weil representation in characteristic two

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s147474801100017x ◽

2011 ◽

Vol 11 (2) ◽

pp. 221-271 ◽

Cited By ~ 1

Author(s):

Alain Genestier ◽

Sergey Lysenko

Keyword(s):

Weil Representation ◽

Closed Field ◽

Triangulated Category ◽

Algebraically Closed Field ◽

Witt Vectors ◽

Suitable Sense ◽

Characteristic Two ◽

Greenberg Realization ◽

Geometric Analogue

AbstractLet k be an algebraically closed field of characteristic two. Let R be the ring of Witt vectors of length two over k. We construct a group stack Ĝ over k, the metaplectic extension of the Greenberg realization of $\operatorname{\mathbb{S}p}_{2n}(R)$. We also construct a geometric analogue of the Weil representation of Ĝ, this is a triangulated category on which Ĝ acts by functors. This triangulated category and the action are geometric in a suitable sense.

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On lambda operations on mixed motives

Journal of K-theory K-theory and its Applications to Algebra Geometry and Topology ◽

10.1017/is013005008jkt231 ◽

2013 ◽

Vol 12 (2) ◽

pp. 381-404 ◽

Cited By ~ 1

Author(s):

Shahram Biglari

Keyword(s):

Ring Structure ◽

Triangulated Category ◽

Grothendieck Ring ◽

Basic Properties ◽

Natural Notion ◽

Mixed Motives

AbstractWe study the natural λ-ring structure on the Grothendieck ring of the triangulated category of mixed motives. Basic properties of a natural notion of characteristic-like series are developed in the context of equivariant objects.

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Separable monoids in Dqc (X)

Journal für die reine und angewandte Mathematik (Crelles Journal) ◽

10.1515/crelle-2015-0039 ◽

2018 ◽

Vol 2018 (738) ◽

pp. 237-280 ◽

Cited By ~ 2

Author(s):

Amnon Neeman

Keyword(s):

Triangulated Category ◽

Noetherian Scheme ◽

Structure Sheaf ◽

Tensor Triangulated Category

AbstractSuppose{({\mathscr{T}},\otimes,\mathds{1})}is a tensor triangulated category. In a number of recent articles Balmer defines and explores the notion of “separable tt-rings” in{{\mathscr{T}}}(in this paper we will call them “separable monoids”). The main result of this article is that, if{{\mathscr{T}}}is the derived quasicoherent category of a noetherian schemeX, then the only separable monoids are the pushforwards by étale maps of smashing Bousfield localizations of the structure sheaf.

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On Grothendieck's local duality theorem

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100055870 ◽

1979 ◽

Vol 85 (3) ◽

pp. 431-437 ◽

Cited By ~ 3

Author(s):

M. H. Bijan-Zadeh ◽

R. Y. Sharp

Keyword(s):

Algebraic Geometry ◽

Commutative Algebra ◽

Noetherian Ring ◽

Duality Theorem ◽

Great Emphasis ◽

Triangulated Category ◽

Elementary Approach ◽

Commutative Noetherian Ring ◽

Local Duality ◽

Dualizing Complexes

In (11) and (12), a comparatively elementary approach to the use of dualizing complexes in commutative algebra has been developed. Dualizing complexes were introduced by Grothendieck and Hartshorne in (2) for use in algebraic geometry; the approach to dualizing complexes in (11) and (12) differs from that of Grothendieck and Hartshorne in that it avoids use of the concepts of triangulated category, derived category, and localization of categories, and instead places great emphasis on the concept of quasi-isomorphism of complexes of modules over a commutative Noetherian ring.

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FRAMED CORRESPONDENCES AND THE MILNOR–WITT -THEORY

Journal of the Institute of Mathematics of Jussieu ◽

10.1017/s1474748016000190 ◽

2016 ◽

Vol 17 (4) ◽

pp. 823-852 ◽

Cited By ~ 2

Author(s):

Alexander Neshitov

Keyword(s):

Characteristic Zero ◽

Triangulated Category ◽

Algebraic Varieties ◽

Base Field ◽

Witt Theory

Given a field $k$ of characteristic zero and $n\geqslant 0$, we prove that $H_{0}(\mathbb{Z}F(\unicode[STIX]{x1D6E5}_{k}^{\bullet },\mathbb{G}_{m}^{\wedge n}))=K_{n}^{MW}(k)$, where $\mathbb{Z}F_{\ast }(k)$ is the category of linear framed correspondences of algebraic $k$-varieties, introduced by Garkusha and Panin [The triangulated category of linear framed motives $DM_{fr}^{eff}(k)$, in preparation] (see [Garkusha and Panin, Framed motives of algebraic varieties (after V. Voevodsky), Preprint, 2014, arXiv:1409.4372], § 7 as well), and $K_{\ast }^{MW}(k)$ is the Milnor–Witt $K$-theory of the base field $k$.

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