Search results for "Crete"

showing 10 items of 2495 documents

When can association graphs admit a causal interpretation?

1994

We discuss essentially linear structures which are adequately represented by association graphs called covariance graphs and concentration graphs. These do not explicitly indicate a process by which data could be generated in a stepwise fashion. Therefore, on their own, they do not suggest a causal interpretation. By contrast, each directed acyclic graph describes such a process and may offer a causal interpretation whenever this process is in agreement with substantive knowledge about causation among the variables under study. We derive conditions and procedures to decide for any given covariance graph or concentration graph whether all their pairwise independencies can be implied by some …

Discrete mathematicsComputer sciencePairwise comparisonCausationCovarianceDirected acyclic graphUndirected graphAlgorithmGraph
researchProduct

A Potential Field Function for Overlapping Point Set and Graph Cluster Visualization

2015

In this paper we address the problem of visualizing overlapping sets of points with a fixed positioning in a comprehensible way. A standard visualization technique is to enclose the point sets in isocontours generated by bounding a potential field function. The most commonly used functions are various approximations of the Gaussian distribution. Such an approach produces smooth and appealing shapes, however it may produce an incorrect point nesting in generated regions, e.g. some point is contained inside a foreign set region. We introduce a different potential field function that keeps the desired properties of Gaussian distribution, and in addition guarantees that every point belongs to a…

Discrete mathematicsComputer sciencebusiness.industryGaussianGraph of a functionMixed graphFunction (mathematics)Strength of a graphGraphSet (abstract data type)symbols.namesakesymbolsGraph (abstract data type)Point (geometry)Artificial intelligencebusinessAlgorithm
researchProduct

Degree of monotonicity in aggregation process

2010

In this paper we introduce a fuzzy order relation notion in the description of aggregation process. Namely, we use the fuzzy order relation to define the degree of monotonicity, which is equal to 1 for a monotone function with respect to a crisp order relation. In that case, integration of fuzzy order relation allows us to generalize the notion of monotonicity and we try to investigate the benefits of using fuzzy relations instead of a crisp relation. Further we illustrate this definition by examples and study the properties of aggregation functions which have a certain degree of monotonicity.

Discrete mathematicsComputingMethodologies_PATTERNRECOGNITIONDegree (graph theory)Relation (database)Construction industryProcess (engineering)Fuzzy setApplied mathematicsOrder (group theory)Monotonic functionFuzzy logicMathematicsInternational Conference on Fuzzy Systems
researchProduct

Unconditionally convergent multipliers and Bessel sequences

2016

Abstract We prove that every unconditionally summable sequence in a Hilbert space can be factorized as the product of a square summable scalar sequence and a Bessel sequence. Some consequences on the representation of unconditionally convergent multipliers are obtained, thus providing positive answers to a conjecture by Balazs and Stoeva in some particular cases.

Discrete mathematicsConjectureApplied Mathematics010102 general mathematicsScalar (mathematics)Mathematics::Classical Analysis and ODEsHilbert space01 natural sciencesFunctional Analysis (math.FA)Mathematics - Functional AnalysisMultiplier (Fourier analysis)030507 speech-language pathology & audiology03 medical and health sciencessymbols.namesakeBessel polynomialsFOS: MathematicssymbolsUnconditional convergence0101 mathematics0305 other medical scienceAnalysisBessel functionMathematicsJournal of Mathematical Analysis and Applications
researchProduct

First-order expressibility of languages with neutral letters or: The Crane Beach conjecture

2005

A language L over an alphabet A is said to have a neutral letter if there is a letter [email protected]?A such that inserting or deleting e's from any word in A^* does not change its membership or non-membership in L. The presence of a neutral letter affects the definability of a language in first-order logic. It was conjectured that it renders all numerical predicates apart from the order predicate useless, i.e., that if a language L with a neutral letter is not definable in first-order logic with linear order, then it is not definable in first-order logic with any set N of numerical predicates. Named after the location of its first, flawed, proof this conjecture is called the Crane Beach …

Discrete mathematicsConjectureComputer Networks and CommunicationsApplied MathematicsFirst orderNumerical predicatesPredicate (grammar)Theoretical Computer ScienceFirst-order logicIterated logarithmCombinatoricsComputational Theory and MathematicsRegular languageDatabase theoryCircuit complexityFirst-order logicCircuit uniformityMathematicsJournal of Computer and System Sciences
researchProduct

On a Conjecture on Bidimensional Words

2003

We prove that, given a double sequence w over the alphabet A (i.e. a mapping from Z2 to A), if there exists a pair (n0, m0) ∈ Z2 such that pw(n0, m0) < 1/100n0m0, then w has a periodicity vector, where pw is the complexity function in rectangles of w.

Discrete mathematicsConjectureGeneral Computer ScienceExistential quantificationTheoretical Computer ScienceCombinatoricsCombinatorics on wordsFormal languageComplexity functionPattern matchingAlphabetDouble sequenceComputer Science(all)Mathematics
researchProduct

The real cubic case of Mahler's conjecture

1961

Discrete mathematicsConjectureGeneral MathematicsMathematical analysisBeal's conjectureCollatz conjectureMathematicsMathematika
researchProduct

Real groups and Sylow 2-subgroups

2016

Abstract If G is a finite real group and P ∈ Syl 2 ( G ) , then P / P ′ is elementary abelian. This confirms a conjecture of Roderick Gow. In fact, we prove a much stronger result that implies Gow's conjecture.

Discrete mathematicsConjectureGroup (mathematics)General Mathematics010102 general mathematicsSylow theorems01 natural sciencesCombinatoricsLocally finite group0103 physical sciences010307 mathematical physics0101 mathematicsAbelian groupMathematicsAdvances in Mathematics
researchProduct

The branch set of a quasiregular mapping between metric manifolds

2016

Abstract In this note, we announce some new results on quantitative countable porosity of the branch set of a quasiregular mapping in very general metric spaces. As applications, we solve a recent conjecture of Fassler et al., an open problem of Heinonen–Rickman, and an open question of Heinonen–Semmes.

Discrete mathematicsConjectureMathematics::Complex VariablesOpen problem010102 general mathematicsMathematical analysisGeneral Medicine01 natural sciences010101 applied mathematicsSet (abstract data type)Metric spaceMetric (mathematics)Mathematics::Metric GeometryCountable set0101 mathematicsMathematicsComptes Rendus Mathematique
researchProduct

Recognizable picture languages and polyominoes

2007

We consider the problem of recognizability of some classes of polyominoes in the theory of picture languages. In particular we focus our attention oil the problem posed by Matz of finding a non-recognizable picture language for which his technique for proving the non-recognizability of picture languages fails. We face the problem by studying the family of L-convex polyominoes and some closed families that are similar to the recognizable family of all polyominoes but result to be non-recognizable. Furthermore we prove that the family of L-convex polyominoes satisfies the necessary condition given by Matz for the recognizability and we conjecture that the family of L-convex polyominoes is non…

Discrete mathematicsConjecturePolyominoSettore INF/01 - InformaticaPolyominoesFace (sociological concept)Picture languageFocus (linguistics)Mathematics
researchProduct