Search results for "Von Neumann algebra"

showing 10 items of 15 documents

L 2-topological invariants of 3-manifolds

1995

We give results on theL2-Betti numbers and Novikov-Shubin invariants of compact manifolds, especially 3-manifolds. We first study the Betti numbers and Novikov-Shubin invariants of a chain complex of Hilbert modules over a finite von Neumann algebra. We establish inequalities among the Novikov-Shubin invariants of the terms in a short exact sequence of chain complexes. Our algebraic results, along with some analytic results on geometric 3-manifolds, are used to compute theL2-Betti numbers of compact 3-manifolds which satisfy a weak form of the geometrization conjecture, and to compute or estimate their Novikov-Shubin invariants.

Discrete mathematicsExact sequenceMathematics::Operator AlgebrasBetti numberGeneral MathematicsMathematics::Spectral TheoryMathematics::Algebraic TopologyManifoldsymbols.namesakeChain (algebraic topology)Von Neumann algebraGromov–Witten invariantsymbolsAlgebraic numberGeometrization conjectureMathematicsInventiones Mathematicae
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Quantum extensions of semigroups generated by Bessel processes

1996

We construct a quantum extension of the Markov semigroup of the classical Bessel process of orderv≥1 to the noncommutative von Neumann algebra s(L2(0, +∞)) of bounded operators onL2(0, +∞).

Discrete mathematicsPure mathematicsBessel processMathematics::Operator AlgebrasSemigroupGeneral MathematicsNoncommutative geometryQuantum dynamical semigroupsymbols.namesakeQuantum probabilityVon Neumann algebraBounded functionsymbolsBessel functionMathematicsMathematical Notes
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On Composition Ideals of Multilinear Mappings and Homogeneous Polynomials

2007

Given an operator ideal I, we study the multi-ideal I ο L and the polynomial ideal I ο P). The connection with the linearizations of these mappings on projective symmetric tensor products is investigated in detail. Applications to the ideals of strictly singular and absolutely summing linear operators are obtained.

Discrete mathematicsPure mathematicsPolynomialMultilinear mapIdeal (set theory)Mathematics::Commutative AlgebraGeneral MathematicsComposition (combinatorics)Connection (mathematics)symbols.namesakeVon Neumann algebraHomogeneoussymbolsSymmetric tensorMathematicsPublications of the Research Institute for Mathematical Sciences
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Sharp estimates for eigenfunctions of a Neumann problem

2009

In this paper we provide some bounds for the eigenfunctions of the Laplacian with homogeneous Neumann boundary conditions in a bounded domain Ω of R^n. To this aim we use the so-called symmetrization techniques and the obtained estimates are asymptotically sharp, at least in the bidimensional case, when the isoperimetric constant relative to Ω goes to 0.

Neumann eigenvaluesApplied MathematicsMathematical analysisSymmetrizationMathematics::Spectral TheoryNeumann seriessymbols.namesakeVon Neumann algebraSettore MAT/05 - Analisi MatematicaBounded functionNeumann boundary conditionsymbolsSymmetrizationAbelian von Neumann algebraIsoperimetric inequalityAffiliated operatorAnalysisMathematics
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Dynamics of mean-field spin models from basic results in abstract differential equations

1992

The infinite-volume limit of the dynamics of (generalized) mean-field spin models is obtained through a direct analysis of the equations of motion, in a large class of representations of the spin algebra. The resulting dynamics fits into a general framework for systems with long-range interaction: variables at infinity appear in the time evolution of local variables and spontaneous symmetry breaking with an energy gap follows from this mechanism. The independence of the construction of the approximation scheme in finite volume is proven. © 1992 Plenum Publishing Corporation.

Physicsdifferential equations in C* and von Neumann algebraFinite volume methodPartial differential equationMathematical modelDifferential equationSpontaneous symmetry breakingEquations of motionStatistical and Nonlinear PhysicsMean field theorySymmetry breakingSettore MAT/07 - Fisica MatematicaMathematical PhysicsMathematical physicsJournal of Statistical Physics
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A note on faithful traces on a von Neumann algebra

2009

In this short note we give some techniques for constructing, starting from a {\it sufficient} family $\mc F$ of semifinite or finite traces on a von Neumann algebra $\M$, a new trace which is faithful.

Pure mathematics$C^*$-moduleTrace (linear algebra)Mathematics::Operator AlgebrasGeneral MathematicsFOS: Physical sciencesMathematical Physics (math-ph)Algebrasymbols.namesakeVon Neumann's theoremVon Neumann algebraSettore MAT/05 - Analisi MatematicasymbolsAbelian von Neumann algebraAlgebra over a fieldAffiliated operatorSettore MAT/07 - Fisica MatematicaMathematical PhysicsVon Neumann architectureMathematics
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Quasi *-algebras of measurable operators

2009

Non-commutative $L^p$-spaces are shown to constitute examples of a class of Banach quasi *-algebras called CQ*-algebras. For $p\geq 2$ they are also proved to possess a {\em sufficient} family of bounded positive sesquilinear forms satisfying certain invariance properties. CQ *-algebras of measurable operators over a finite von Neumann algebra are also constructed and it is proven that any abstract CQ*-algebra $(\X,\Ao)$ possessing a sufficient family of bounded positive tracial sesquilinear forms can be represented as a CQ*-algebra of this type.

Pure mathematicsClass (set theory)Mathematics::Operator AlgebrasGeneral MathematicsNon-commutative integrationPartial algebras of operatorsFOS: Physical sciencesMathematical Physics (math-ph)Type (model theory)symbols.namesakeVon Neumann algebraSettore MAT/05 - Analisi MatematicaBounded functionsymbolsBanach C*-moduleSettore MAT/07 - Fisica MatematicaMathematical PhysicsMathematics
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Tomita—Takesaki Theory in Partial O*-Algebras

2002

This chapter is devoted to the development of the Tomita-Takesaki theory in partial O*-algebras. In Section 5.1, we introduce and investigate the notion of cyclic generalized vectors for a partial O*-algebra, generalizing that of cyclic vectors, and its commutants. Section 5.2 introduces the notion of a cyclic and separating system (M, λ, λ c ), which consists of a partial O*-algebra M, a cyclic generalized vector λ for M and the commutant λ c of λ. A cyclic and separating system (M, λ, λ c ) determines the cyclic and separating system ((M w ′ )′, λ cc , (λ cc ) c ) of the von Neumann algebra (M w ′ )′, and this makes it possible to develop the Tornita-Takesaki theory. Then λ can be extende…

Section (fiber bundle)Physicssymbols.namesakePure mathematicsVon Neumann algebraGroup (mathematics)Polar decompositionsymbolsTomita–Takesaki theoryAutomorphismCentralizer and normalizerLinear span
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A note on semifinite von Neumann algebras

2009

In this note we give some techniques for constructing a faithful semi finite trace on a semifinite von Neumann algebra.

Settore MAT/05 - Analisi Matematicasemifinite von Neumann algebras
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MR3299506 Reviewed Rădulescu, Florin(I-ROME2) On unbounded, non-trivial Hochschild cohomology in finite von Neumann algebras and higher order Berezin…

2015

If (At)t>1 is a family of finite von Neumann algebras with a Chapman-Kolmogorov set of linear maps (symbol system) (Φs,t), and if αt:A→A are isomorphisms in a finite family of von Neumann algebras, the corresponding Hochschild cocycles are related to an obstruction to the deformation of the set of linear maps (Φs,t) in the corresponding Chapman-Kolmogorov system (Φs,t)˜ of completely positive maps. In this set-up, the author introduces an invariant (c,Z) for a finite von Neumann algebra M, consisting of a 2-Hochschild cohomology cocycle c and a coboundary unbounded operator Z for c. With some assumptions on c and Z=α+X+iY (α>0, Y is antisymmetric), the existence of an unbounded derivation δ…

Settore MAT/05 - Analisi Matematicavon Neumann algebra Berezin deformation
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