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Displaying 21 – 40 of 448

A partial order where all monotone maps are definable

Martin Goldstern, Saharon Shelah (1997)

Fundamenta Mathematicae

It is consistent that there is a partial order (P,≤) of size $ℵ_{1}$ such that every monotone function f:P → P is first order definable in (P,≤).

A poset hierarchy

Mirna Džamonja, Katherine Thompson (2006)

Open Mathematics

This article extends a paper of Abraham and Bonnet which generalised the famous Hausdorff characterisation of the class of scattered linear orders. They gave an inductively defined hierarchy that characterised the class of scattered posets which do not have infinite incomparability antichains (i.e. have the FAC). We define a larger inductive hierarchy κℌ* which characterises the closure of the class of all κ-well-founded linear orders under inversions, lexicographic sums and FAC weakenings. This...

A proof and an extension of a theorem of G. Birkhoff.

S. Milic (1978)

Publications de l'Institut Mathématique [Elektronische Ressource]

A Proof And An Extension Of A Theorem Of G. Birkoff

Svetozar Milić (1978)

Publications de l'Institut Mathématique

A remark on growth relation.

Wituła, Roman, Słota, Damian (2007)

Novi Sad Journal of Mathematics

A remark on signed posets and signed graphs

Bohdan Zelinka (1988)

Czechoslovak Mathematical Journal

A simple proof of Suzumura's extension theorem for finite domains with applications.

Lahiri, Somdeb (2002)

Journal of Applied Mathematics and Decision Sciences

A Theorem on Directed Quasi-Ordered Sets and Some Remarks

Shang Zhi Wang, Bo Yu Li (1985)

Publications du Département de mathématiques (Lyon)

A weakly associative generalization of the variety of representable lattice ordered groups

Jiří Rachůnek (1998)

Acta Universitatis Palackianae Olomucensis. Facultas Rerum Naturalium. Mathematica

Absolute flatness and amalgams in pomonoids.

S.M. Fakhruddin (1986)

Semigroup forum

Algebraic and graph-theoretic properties of infinite $n$ -posets

Zoltán Ésik, Zoltán L. Németh (2005)

RAIRO - Theoretical Informatics and Applications - Informatique Théorique et Applications

A $Σ$ -labeled $n$ -poset is an (at most) countable set, labeled in the set $Σ$ , equipped with $n$ partial orders. The collection of all $Σ$ -labeled $n$ -posets is naturally equipped with $n$ binary product operations and $n$ $ω$ -ary product operations. Moreover, the $ω$ -ary product operations give rise to $n$ $...$

Algebraic and graph-theoretic properties of infinite n-posets

Zoltán Ésik, Zoltán L. Németh (2010)

RAIRO - Theoretical Informatics and Applications

A Σ-labeled n-poset is an (at most) countable set, labeled in the set Σ, equipped with n partial orders. The collection of all Σ-labeled n-posets is naturally equipped with n binary product operations and nω-ary product operations. Moreover, the ω-ary product operations give rise to nω-power operations. We show that those Σ-labeled n-posets that can be generated from the singletons by the binary and ω-ary product operations form the free algebra on Σ in a variety axiomatizable by an infinite collection...

All ordered sets having amenable lattice orders

Chawewan Ratanaprasert (2002)

Mathematica Slovaca

An approach to covering dimensions

Miroslav Katětov (1995)

Commentationes Mathematicae Universitatis Carolinae

Using certain ideas connected with the entropy theory, several kinds of dimensions are introduced for arbitrary topological spaces. Their properties are examined, in particular, for normal spaces and quasi-discrete ones. One of the considered dimensions coincides, on these spaces, with the Čech-Lebesgue dimension and the height dimension of posets, respectively.

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