Search results for "FLE"

showing 10 items of 3517 documents

Shrinking and boundedly complete Schauder frames in Fréchet spaces

2014

We study Schauder frames in Fréchet spaces and their duals, as well as perturbation results. We define shrinking and boundedly complete Schauder frames on a locally convex space, study the duality of these two concepts and their relation with the reflexivity of the space. We characterize when an unconditional Schauder frame is shrinking or boundedly complete in terms of properties of the space. Several examples of concrete Schauder frames in function spaces are also presented.

Discrete mathematicsMathematics::Functional AnalysisPure mathematicsShrinkingReflexivitySchauder basisFunction space(LB)-spacesApplied MathematicsMathematics::Analysis of PDEsConvex setMathematics::General TopologyFréchet spacesSchauder basisAtomic decompositionSchauder fixed point theoremSchauder frameLocally convex spacesLocally convex topological vector spaceBoundedly completeDual polyhedronAtomic decompositionMATEMATICA APLICADAAnalysisMathematics
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Uniformly nonsquare Banach spaces have the fixed point property for nonexpansive mappings

2006

Abstract It is shown that if the modulus Γ X of nearly uniform smoothness of a reflexive Banach space satisfies Γ X ′ ( 0 ) 1 , then every bounded closed convex subset of X has the fixed point property for nonexpansive mappings. In particular, uniformly nonsquare Banach spaces have this property since they are properly included in this class of spaces. This answers a long-standing question in the theory.

Discrete mathematicsMathematics::Functional AnalysisPure mathematicsUniformly nonsquare spacesApproximation propertyEberlein–Šmulian theoremBanach spaceNonexpansive mappingsUniformly convex spaceBanach manifoldFixed-point propertyNearly uniform smoothnessFixed pointsReflexive spaceLp spaceAnalysisMathematicsJournal of Functional Analysis
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A loopless algorithm for generating the permutations of a multiset

2003

AbstractMany combinatorial structures can be constructed from simpler components. For example, a permutation can be constructed from cycles, or a Motzkin word from a Dyck word and a combination. In this paper we present a constructor for combinatorial structures, called shuffle on trajectories (defined previously in a non-combinatorial context), and we show how this constructor enables us to obtain a new loopless generating algorithm for multiset permutations from similar results for simpler objects.

Discrete mathematicsMultisetMathematics::CombinatoricsGeneral Computer ScienceMultiset permutationsLoopless algorithmStructure (category theory)Context (language use)Gray codesTheoretical Computer ScienceCombinatoricsGray codePermutationLoopless generating algorithmsShuffle combinatorial objectsBinomial coefficientWord (computer architecture)Computer Science::Formal Languages and Automata TheoryMathematicsMathematicsofComputing_DISCRETEMATHEMATICSComputer Science(all)Theoretical Computer Science
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Weak regularity and consecutive topologizations and regularizations of pretopologies

2009

Abstract L. Foged proved that a weakly regular topology on a countable set is regular. In terms of convergence theory, this means that the topological reflection Tξ of a regular pretopology ξ on a countable set is regular. It is proved that this still holds if ξ is a regular σ -compact pretopology. On the other hand, it is proved that for each n ω there is a (regular) pretopology ρ (on a set of cardinality c ) such that ( RT ) k ρ > ( RT ) n ρ for each k n and ( RT ) n ρ is a Hausdorff compact topology, where R is the reflector to regular pretopologies. It is also shown that there exists a regular pretopology of Hausdorff RT -order ⩾ ω 0 . Moreover, all these pretopologies have the property…

Discrete mathematicsPretopologyHausdorff spaceMathematics::General TopologyRegularization (mathematics)CombinatoricsReflection (mathematics)CardinalityMathematics::Category TheoryTopologizationRegularizationOrder (group theory)Countable setGeometry and TopologyMathematicsWeak baseMAD familyTopology and its Applications
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Best proximity points: Convergence and existence theorems for p-cyclic mappings

2010

Abstract We introduce a new class of mappings, called p -cyclic φ -contractions, which contains the p -cyclic contraction mappings as a subclass. Then, convergence and existence results of best proximity points for p -cyclic φ -contraction mappings are obtained. Moreover, we prove results of the existence of best proximity points in a reflexive Banach space. These results are generalizations of the results of Al-Thagafi and Shahzad (2009) [8] .

Discrete mathematicsPure mathematicsCyclic contractionSettore MAT/05 - Analisi MatematicaApplied Mathematicsp-cyclic contraction mappings p-cyclic \phi-contraction mappings best proximity points reflexive Banach spacesBanach spaceExistence theoremAnalysisMathematics
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The Bishop–Phelps–Bollobás theorem for operators

2008

AbstractWe prove the Bishop–Phelps–Bollobás theorem for operators from an arbitrary Banach space X into a Banach space Y whenever the range space has property β of Lindenstrauss. We also characterize those Banach spaces Y for which the Bishop–Phelps–Bollobás theorem holds for operators from ℓ1 into Y. Several examples of classes of such spaces are provided. For instance, the Bishop–Phelps–Bollobás theorem holds when the range space is finite-dimensional, an L1(μ)-space for a σ-finite measure μ, a C(K)-space for a compact Hausdorff space K, or a uniformly convex Banach space.

Discrete mathematicsPure mathematicsMathematics::Functional AnalysisApproximation propertyEberlein–Šmulian theoremBanach spaceNorm attainingBishop–Phelps theoremUniform boundedness principleUniform convexityInterpolation spaceOperatorClosed graph theoremReflexive spaceBishop–Phelps theoremAnalysisMathematicsJournal of Functional Analysis
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On the Zero-Set of Real Polynomials in Non-Separable Banach Spaces

2007

We show constructively that every homogeneous polynomial that is weakly continuous on the bounded subsets of a real Banach space whose dual is not weak ∗ separable admits a closed linear subspace whose dual is not weak ∗ -separable either where the polynomial vanishes. We also prove that the same can be said for vectorvalued polynomials. Finally, we study the validity of this result for continuous 2homogeneous polynomials.

Discrete mathematicsPure mathematicsPolynomialDifference polynomialsGeneral MathematicsBounded functionHomogeneous polynomialBanach spaceReflexive spaceLinear subspaceMathematicsSeparable spacePublications of the Research Institute for Mathematical Sciences
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On the stability of the Bohl — Brouwer — Schauder Theorem

1996

Discrete mathematicsSchauder fixed point theoremDual spaceApplied MathematicsLocally convex topological vector spaceFixed pointKakutani fixed-point theoremReflexive spaceAnalysisComplete metric spaceTopological vector spaceMathematicsNonlinear Analysis: Theory, Methods & Applications
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A note on the closed graph theorem

1977

Discrete mathematicsUniform boundedness principleDual spaceGeneral MathematicsBanach spaceClosed graph theoremLp spaceReflexive spaceQuotient space (linear algebra)Complete metric spaceMathematicsArchiv der Mathematik
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Weakly continuous mappings on Banach spaces

1983

Abstract It is shown that every n -homogeneous continuous polynomial on a Banach space E which is weakly continuous on the unit ball of E is weakly uniformly continuous on the unit ball of E . Applications of the result to spaces of polynomials and holomorphic mappings on E are given.

Discrete mathematicsUniform continuityPure mathematicsBanach spaceInterpolation spaceUniformly convex spaceBanach manifoldInfinite-dimensional holomorphyReflexive spaceLp spaceAnalysisMathematicsJournal of Functional Analysis
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