Search results for "Mathematics::General Topology"

showing 10 items of 107 documents

"Table 4" of "Transverse momentum of J / psi produced in p Cu, p U, O-16 Cu, O-16 U and S-32 U collisions at 200-GeV per nucleon."

1991

CONTINUUM MUONS ORIGINATE MAINLY FROM VECTOR MESON DECAYS, SEMI-LEPTONIC DECAYS OF D DBAR PAIRS AND FROM DRELL-YAN MECHANISM.

Di-Muon ProductionNuclear TheoryHigh Energy Physics::PhenomenologyMathematics::General TopologyO16 CU --> MU- MU+ (NEUTRALS) XMuon productionJ/PsiInclusiveSingle Differential Cross SectionNUCLEUS NUCLEUS --> (NEUTRALS) MU+ MU- XHigh Energy Physics::ExperimentDSIG/DPTPsiNuclear ExperimentTransverse Momentum DependenceDrell Yan
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A note on rank 2 diagonals

2020

<p>We solve two questions regarding spaces with a (G<sub>δ</sub>)-diagonal of rank 2. One is a question of Basile, Bella and Ridderbos about weakly Lindelöf spaces with a G<sub>δ</sub>-diagonal of rank 2 and the other is a question of Arhangel’skii and Bella asking whether every space with a diagonal of rank 2 and cellularity continuum has cardinality at most continuum.</p>

DiagonalCardinal invariantsMathematics::General TopologyWeakly Lindelöflcsh:AnalysisSpace (mathematics)01 natural sciencesCombinatoricsBELLACardinalitydual propertiesCardinality boundsFOS: MathematicsRank (graph theory)Continuum (set theory)0101 mathematicsDual propertiesMathematics - General TopologyMathematicsweakly LindelofGδ- diagonallcsh:Mathematics010102 general mathematicsGeneral Topology (math.GN)neighbourhood assignmentGδ-diagonallcsh:QA299.6-433lcsh:QA1-939gδ-diagonal010101 applied mathematicscardinality boundsMathematics::LogicNeighbourhood assignmentSettore MAT/03 - GeometriaGeometry and Topologyweakly lindelöf
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On the construction of lusternik-schnirelmann critical values with application to bifurcation problems

1987

An iterative method to construct Lusternik-Schnirelmann critical values is presented. Examples of its use to obtain numerical solutions to nonlinear eigenvalue problems and their bifurcation branches are given

Differential equationIterative methodApplied MathematicsMathematical analysisMathematics::General TopologyBifurcation diagramMathematics::Algebraic TopologyNonlinear systemBifurcation theoryTranscritical bifurcationAnalysisEigenvalues and eigenvectorsBifurcationMathematicsApplicable Analysis
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Infinite games and chain conditions

2015

We apply the theory of infinite two-person games to two well-known problems in topology: Suslin's Problem and Arhangel'skii's problem on $G_\delta$ covers of compact spaces. More specifically, we prove results of which the following two are special cases: 1) every linearly ordered topological space satisfying the game-theoretic version of the countable chain condition is separable and 2) in every compact space satisfying the game-theoretic version of the weak Lindel\"of property, every cover by $G_\delta$ sets has a continuum-sized subcollection whose union is $G_\delta$-dense.

Discrete mathematicsAlgebra and Number TheoryProperty (philosophy)010102 general mathematicsGeneral Topology (math.GN)Mathematics::General Topology010103 numerical & computational mathematicsTopological space01 natural sciencesSeparable spaceCompact spaceChain (algebraic topology)Cover (topology)Countable chain conditionFOS: Mathematicstopological gamesselection principles0101 mathematicscardinal inequalitiesChain conditionsTopology (chemistry)MathematicsMathematics - General Topology
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Set-Valued Generalizations of Baire′s Category Theorem

1995

Abstract We prove some generalizations of Baire′s category theorem for chains of iterates of multifunctions defined on Cech-complete spaces. In particular, we extend Lennard′s results stated for functions on complete metric spaces.

Discrete mathematicsApplied MathematicsMathematics::General TopologyBaire spaceBaire measureComplete metric spaceS categoryMetric spaceIterated functionMathematics::Category TheoryBaire category theoremOpen mapping theorem (functional analysis)AnalysisMathematicsJournal of Mathematical Analysis and Applications
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On the cardinality of almost discretely Lindelof spaces

2016

A space is said to be almost discretely Lindelof if every discrete subset can be covered by a Lindelof subspace. Juhasz et al. (Weakly linearly Lindelof monotonically normal spaces are Lindelof, preprint, arXiv:1610.04506 ) asked whether every almost discretely Lindelof first-countable Hausdorff space has cardinality at most continuum. We prove that this is the case under $$2^{<{\mathfrak {c}}}={\mathfrak {c}}$$ (which is a consequence of Martin’s Axiom, for example) and for Urysohn spaces in ZFC, thus improving a result by Juhasz et al. (First-countable and almost discretely Lindelof $$T_3$$ spaces have cardinality at most continuum, preprint, arXiv:1612.06651 ). We conclude with a few rel…

Discrete mathematicsCardinal inequality Lindelof space Arhangel’skii Theorem elementary submodel left-separated discrete set free sequence.General Mathematics010102 general mathematicsHausdorff spaceGeneral Topology (math.GN)Mathematics::General TopologyMonotonic functionSpace (mathematics)01 natural sciences010101 applied mathematicsMathematics::LogicCardinalityLindelöf spaceFOS: MathematicsSettore MAT/03 - GeometriaContinuum (set theory)0101 mathematicsSubspace topologyAxiomMathematics - General TopologyMathematics
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Periodic Groups Covered by Transitive Subgroups of Finitary Permutations or by Irreducible Subgroups of Finitary Transformations

1999

Let X be either the class of all transitive groups of finitary permutations, or the class of all periodic irreducible finitary linear groups. We show that almost primitive X-groups are countably recognizable, while totally imprimitive X-groups are in general not countably recognizable. In addition we derive a structure theorem for groups all of whose countable subsets are contained in totally imprimitive X-subgroups. It turns out that totally imprimitive p-groups in the class X are countably recognizable.

Discrete mathematicsClass (set theory)Transitive relationMathematics::Operator AlgebrasApplied MathematicsGeneral MathematicsMathematics::General TopologyUltraproductCombinatoricsMathematics::LogicCountable setFinitaryStructured program theoremMathematicsTransactions of the American Mathematical Society
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Convergence-theoretic characterizations of compactness

2002

AbstractFundamental variants of compactness are characterized in terms of concretely reflective convergence subcategories: topologies, pretopologies, paratopologies, hypotopologies and pseudotopologies. Hyperquotient maps (perfect, quasi-perfect, adherent and closed) and quotient maps (quotient, hereditarily quotient, countably biquotient, biquotient, and almost open) are characterized in terms of various degrees of compactness of their fiber relations, and of sundry relaxations of inverse continuity.

Discrete mathematicsCompactnessFiber (mathematics)PretopologyInverseMathematics::General TopologyPseudotopologyPerfect mapQuotient mapPerfect mapCompact spaceConvergence (routing)Geometry and TopologyConvergenceEquivalence classQuotientMathematicsTopology and its Applications
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BLD -mappings in $W^{2,2}$ are locally invertible

2000

We prove that mappings of bounded length distortion are local homeomorphisms if they have L 2 -integrable weak second derivatives.

Discrete mathematicsDistortion (mathematics)Invertible matrixIntegrable systemlawGeneral MathematicsBounded functionMathematics::General TopologySecond derivativeMathematicslaw.inventionMathematische Annalen
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Sobriety and spatiality in categories of lattice-valued algebras

2012

The paper provides an analogue of the famous equivalence between the categories of sober topological spaces and spatial locales for the framework of (L,M)-fuzzy topology of Kubiak and Sostak (and partly to that of Guido). To be more general, we replace locales with localic lattice-valued algebras in the sense of Di Nola and Gerla and use the respective generalized topological setting. As a result, it appears that the shift from crisp algebras to lattice-valued algebras weakens (resp. strengthens) considerably the classical (including the point-set lattice-theoretic setting of Rodabaugh) notion of sobriety (resp. spatiality).

Discrete mathematicsInterior algebraSobrietyArtificial IntelligenceLogicMathematics::General TopologyGeneral topologyTopological spaceEquivalence (formal languages)MathematicsFuzzy Sets and Systems
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