A category-theoretic characterization of almost measurable cardinals

Michael Lieberman

doi:10.1090/proc/15076

Tameness, powerful images, and large cardinals

Journal of Mathematical Logic ◽

10.1142/s0219061320500245 ◽

2020 ◽

Vol 21 (01) ◽

pp. 2050024

Author(s):

Will Boney ◽

Michael Lieberman

Keyword(s):

Large Cardinals ◽

Classification Theory ◽

Closure Properties ◽

Weakly Compact ◽

Accessible Categories ◽

Elementary Classes ◽

Comprehensive Level ◽

Theoretic Characterization ◽

Measurable Cardinals

We provide comprehensive, level-by-level characterizations of large cardinals, in the range from weakly compact to strongly compact, by closure properties of powerful images of accessible functors. In the process, we show that these properties are also equivalent to various forms of tameness for abstract elementary classes. This systematizes and extends results of [W. Boney and S. Unger, Large cardinal axioms from tameness in AECs, Proc. Amer. Math. Soc. 145(10) (2017) 4517–4532; A. Brooke-Taylor and J. Rosický, Accessible images revisited, Proc. AMS 145(3) (2016) 1317–1327; M. Lieberman, A category-theoretic characterization of almost measurable cardinals (Submitted, 2018), http://arxiv.org/abs/1809.06963; M. Lieberman and J. Rosický, Classification theory for accessible categories. J. Symbolic Logic 81(1) (2016) 1647–1648].

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A lattice-theoretic characterization of pure subgroups of Abelian groups

Ricerche di Matematica ◽

10.1007/s11587-021-00580-6 ◽

2021 ◽

Author(s):

M. Ferrara ◽

M. Trombetti

Keyword(s):

Abelian Group ◽

Abelian Groups ◽

Subgroup Lattice ◽

General Definition ◽

Short Paper ◽

Theoretic Characterization ◽

Definition Of

AbstractLet G be an abelian group. The aim of this short paper is to describe a way to identify pure subgroups H of G by looking only at how the subgroup lattice $$\mathcal {L}(H)$$ L ( H ) embeds in $$\mathcal {L}(G)$$ L ( G ) . It is worth noticing that all results are carried out in a local nilpotent context for a general definition of purity.

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Information-theoretic characterization of eye-tracking signals with relation to cognitive tasks

Chaos An Interdisciplinary Journal of Nonlinear Science ◽

10.1063/5.0042104 ◽

2021 ◽

Vol 31 (3) ◽

pp. 033107

Author(s):

F. R. Iaconis ◽

A. A. Jiménez Gandica ◽

J. A. Del Punta ◽

C. A. Delrieux ◽

G. Gasaneo

Keyword(s):

Eye Tracking ◽

Cognitive Tasks ◽

Information Theoretic ◽

Theoretic Characterization

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A graph theoretic characterization of perfect attackability and detection in Distributed Control Systems

2016 American Control Conference (ACC) ◽

10.1109/acc.2016.7525076 ◽

2016 ◽

Cited By ~ 2

Author(s):

Sean Weerakkody ◽

Xiaofei Liu ◽

Sang H. Son ◽

Bruno Sinopoli

Keyword(s):

Control Systems ◽

Distributed Control ◽

Distributed Control Systems ◽

Graph Theoretic ◽

Theoretic Characterization

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A Module-theoretic Characterization of Algebraic Hypersurfaces

Canadian Mathematical Bulletin ◽

10.4153/cmb-2016-099-6 ◽

2018 ◽

Vol 61 (1) ◽

pp. 166-173

Author(s):

Cleto B. Miranda-Neto

Keyword(s):

Algebraic Variety ◽

Characteristic Zero ◽

Vector Fields ◽

Exterior Power ◽

Algebraic Hypersurfaces ◽

Theoretic Characterization

AbstractIn this note we prove the following surprising characterization: if X ⊂ is an (embedded, non-empty, proper) algebraic variety deûned over a field k of characteristic zero, then X is a hypersurface if and only if the module of logarithmic vector fields of X is a reflexive -module. As a consequence of this result, we derive that if is a free -module, which is shown to be equivalent to the freeness of the t-th exterior power of for some (in fact, any) t ≤ n, then necessarily X is a Saito free divisor.

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GALOIS THEORY OF THE CANONICAL THETA STRUCTURE

International Journal of Number Theory ◽

10.1142/s1793042111003934 ◽

2011 ◽

Vol 07 (01) ◽

pp. 173-202

Author(s):

ROBERT CARLS

Keyword(s):

Galois Theory ◽

Theoretical Foundation ◽

Abelian Varieties ◽

Geometric Mean ◽

Null Point ◽

Point Counting ◽

Characteristic 2 ◽

Theoretic Characterization ◽

Generalized Arithmetic

In this article, we give a Galois-theoretic characterization of the canonical theta structure. The Galois property of the canonical theta structure translates into certain p-adic theta relations which are satisfied by the canonical theta null point of the canonical lift. As an application, we prove some 2-adic theta identities which describe the set of canonical theta null points of the canonical lifts of ordinary abelian varieties in characteristic 2. The latter theta relations are suitable for explicit canonical lifting. Using the theory of canonical theta null points, we are able to give a theoretical foundation to Mestre's point counting algorithm which is based on the computation of the generalized arithmetic geometric mean sequence.

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