Search results for "vector"

showing 10 items of 2660 documents

Operators in Rigged Hilbert spaces: some spectral properties

2014

A notion of resolvent set for an operator acting in a rigged Hilbert space $\D \subset \H\subset \D^\times$ is proposed. This set depends on a family of intermediate locally convex spaces living between $\D$ and $\D^\times$, called interspaces. Some properties of the resolvent set and of the corresponding multivalued resolvent function are derived and some examples are discussed.

Discrete mathematicsPure mathematicsResolvent set47L60 47L05Applied MathematicsRigged Hilbert spaces; Operators; Spectral theoryHilbert spaceFunction (mathematics)Resolvent formalismRigged Hilbert spaceFunctional Analysis (math.FA)Mathematics - Functional Analysissymbols.namesakeOperator (computer programming)Rigged Hilbert spaceSettore MAT/05 - Analisi MatematicaLocally convex topological vector spacesymbolsFOS: MathematicsOperatorSpectral theoryAnalysisResolventMathematics
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Quadratic variation of martingales in Riesz spaces

2014

We derive quadratic variation inequalities for discrete-time martingales, sub- and supermartingales in the measure-free setting of Riesz spaces. Our main result is a Riesz space analogue of Austinʼs sample function theorem, on convergence of the quadratic variation processes of martingales http://www.journals.elsevier.com/journal-of-mathematical-analysis-and-applications/ http://dx.doi.org/10.1016/j.jmaa.2013.08.037 National Research Foundation of South Africa (Grant specific unique reference number (UID) 85672) and by GNAMPA of Italy (U 2012/000574 20/07/2012 and U 2012/000388 09/05/2012)

Discrete mathematicsPure mathematicsRiesz potentialRiesz representation theoremApplied MathematicsmartingaleRiesz spaceRiesz spacevector latticeQuadratic variationquadratic variationM. Riesz extension theoremSettore MAT/05 - Analisi MatematicaAustin’s theorem Martingale Measure-free stochastic processes Quadratic variation Riesz space Vector latticemeasure-free stochastic processesAustinʼs theoremMartingale (probability theory)AnalysisMathematics
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VECTOR MEASURES WITH VARIATION IN A BANACH FUNCTION SPACE

2003

Let E be a Banach function space and X be an arbitrary Banach space. Denote by E(X) the Kothe-Bochner function space defined as the set of measurable functions f : Ω → X such that the nonnegative functions ‖f‖X : Ω → [0,∞) are in the lattice E. The notion of E-variation of a measure —which allows to recover the pvariation (for E = Lp), Φ-variation (for E = LΦ) and the general notion introduced by Gresky and Uhl— is introduced. The space of measures of bounded E-variation VE(X) is then studied. It is shown, among other things and with some restriction of absolute continuity of the norms, that (E(X))∗ = VE′ (X ∗), that VE(X) can be identified with space of cone absolutely summing operators fr…

Discrete mathematicsPure mathematicsSquare-integrable functionBergman spaceFunction spaceInfinite-dimensional vector functionBochner spaceLp spaceQuotient space (linear algebra)Complete metric spaceMathematicsFunction Spaces
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The Action of the Symplectic Group Associated with a Quadratic Extension of Fields

1999

Abstract Given a quadratic extension L/K of fields and a regular alternating space (V, f) of finite dimension over L, we classify K-subspaces of V which do not split into the orthogonal sum of two proper K-subspaces. This allows one to determine the orbits of the group SpL(V, f) in the set of K-subspaces of V.

Discrete mathematicsPure mathematicsSymplectic groupAlgebra and Number TheoryGroup (mathematics)Symplectic representationSymplectic vector spaceQuadratic equationDimension (vector space)Metaplectic groupSettore MAT/03 - GeometriaMoment mapMathematicsGeometry of classical groups Canonical forms reduction classificationJournal of Algebra
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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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Absolutely summing operators on C[0,1] as a tree space and the bounded approximation property

2010

Abstract Let X be a Banach space. For describing the space P ( C [ 0 , 1 ] , X ) of absolutely summing operators from C [ 0 , 1 ] to X in terms of the space X itself, we construct a tree space l 1 tree ( X ) on X. It consists of special trees in X which we call two-trunk trees. We prove that P ( C [ 0 , 1 ] , X ) is isometrically isomorphic to l 1 tree ( X ) . As an application, we characterize the bounded approximation property (BAP) and the weak BAP in terms of X ∗ -valued sequence spaces.

Discrete mathematicsSequenceTree (descriptive set theory)Approximation propertyBounded functionInfinite-dimensional vector functionBanach spaceSpace (mathematics)Operator spaceAnalysisMathematicsJournal of Functional Analysis
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Transformations by diagonal matrices in a normed space

1962

Discrete mathematicsStrictly convex spaceComputational MathematicsNormed algebraBs spaceApplied MathematicsVanish at infinityPseudometric spaceContinuous functions on a compact Hausdorff spaceDual normMathematicsNormed vector spaceNumerische Mathematik
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Sets of Efficiency in a Normed Space and Inner Product

1987

In a normed space X the distances to the points of a given set A being considered as the objective functions of a multicriteria optimization problem, we define four sets of efficiency (efficient, strictly efficient, weakly efficient and properly efficient points). Instead of studying properties of the sets of efficiency according to properties of the norm, we investigate an inverse problem: deduce properties of the norm of X from properties of the sets of efficiency, valid for every finite subset A of X.

Discrete mathematicsStrictly convex spaceConvex hullInner product spaceProduct (mathematics)Product topologyInverse problemMulti-objective optimizationNormed vector spaceMathematics
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Polynomial identities for the Jordan algebra of a degenerate symmetric bilinear form

2013

Let J(n) be the Jordan algebra of a degenerate symmetric bilinear form. In the first section we classify all possible G-gradings on J(n) where G is any group, while in the second part we restrict our attention to a degenerate symmetric bilinear form of rank n - 1, where n is the dimension of the vector space V defining J(n). We prove that in this case the algebra J(n) is PI-equivalent to the Jordan algebra of a nondegenerate bilinear form.

Discrete mathematicsSymmetric algebraNumerical AnalysisPure mathematicsAlgebra and Number TheoryJordan algebraRank (linear algebra)Symmetric bilinear formPolynomial identities gradings Jordan algebraOrthogonal complementBilinear formSettore MAT/02 - AlgebraDiscrete Mathematics and CombinatoricsGeometry and TopologyAlgebra over a fieldMathematicsVector spaceLinear Algebra and its Applications
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On i-topological spaces: generalization of the concept of a topological space via ideals

2006

[EN] The aim of this paper is to generalize the structure of a topological space, preserving its certain topological properties. The main idea is to consider the union and intersection of sets modulo “small” sets which are defined via ideals. Developing the concept of an i-topological space and studying structures with compatible ideals, we are concerned to clarify the necessary and sufficient conditions for a new space to be homeomorphic, in some certain sense, to a topological space.

Discrete mathematicsTopological manifoldPure mathematicsConnected spaceCompatible idealTopological algebralcsh:MathematicsGeneralizationlcsh:QA299.6-433lcsh:AnalysisTopological spacelcsh:QA1-939Topological vector spaceT1 spaceTrivial topologyGeometry and TopologyTopological spaceMathematicsZero-dimensional space
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