Search results for "Semigroup"

showing 6 items of 96 documents

Operator martingale decomposition and the Radon-Nikodym property in Banach spaces

2010

Abstract We consider submartingales and uniform amarts of maps acting between a Banach lattice and a Banach lattice or a Banach space. In this measure-free setting of martingale theory, it is known that a Banach space Y has the Radon–Nikodým property if and only if every uniformly norm bounded martingale defined on the Chaney–Schaefer l-tensor product E ⊗ ˜ l Y , where E is a suitable Banach lattice, is norm convergent. We present applications of this result. Firstly, an analogues characterization for Banach lattices Y with the Radon–Nikodým property is given in terms of a suitable set of submartingales (supermartingales) on E ⊗ ˜ l Y . Secondly, we derive a Riesz decomposition for uniform …

Uniform amartPure mathematicsDinculeanu operatorApproximation propertyEberlein–Šmulian theoremBanach spaceRadon–Nikodým propertyFinite-rank operatorBanach manifoldBanach lattice Banach space Bochner norm Cone absolutely summing operator Convergent martingale Convergent submartingale Dinculeanu operator Radon–Nikodým propertySettore MAT/05 - Analisi MatematicaLp spaceC0-semigroupBanach lattice Banach space Bochner norm Cone absolutely summing operator Convergent martingale Convergent submartingale Dinculeanu operator Radon–Nikodým property Uniform amartMathematicsDiscrete mathematicsMathematics::Functional AnalysisBanach spaceApplied MathematicsConvergent martingaleConvergent submartingaleBanach latticeBochner normCone absolutely summing operatorBounded functionAnalysis
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A possible quantic motivation of the structure of quantum group: continuation

2012

Motivated by Quantum Mechanics considerations, we expose some cross product constructions on a groupoid structure. Furthermore, critical remarks are made on some basic formal aspects of the Hopf algebra structure.

[MATH.MATH-QA] Mathematics [math]/Quantum Algebra [math.QA][PHYS.QPHY]Physics [physics]/Quantum Physics [quant-ph]groupoid semigroupoid cross product quantum group[MATH.MATH-RA]Mathematics [math]/Rings and Algebras [math.RA][MATH.MATH-RA] Mathematics [math]/Rings and Algebras [math.RA][MATH.MATH-QA]Mathematics [math]/Quantum Algebra [math.QA][PHYS.QPHY] Physics [physics]/Quantum Physics [quant-ph]ComputingMilieux_MISCELLANEOUS
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Geometric Optimal Control of Simple Quantum Systems

2011

International audience

[PHYS.PHYS.PHYS-AO-PH]Physics [physics]/Physics [physics]/Atmospheric and Oceanic Physics [physics.ao-ph]PhysicsN-LEVEL SYSTEMSQuantum dynamicsCONTROLLABILITYALGORITHMSTopology01 natural sciences[PHYS.PHYS.PHYS-AO-PH] Physics [physics]/Physics [physics]/Atmospheric and Oceanic Physics [physics.ao-ph]010305 fluids & plasmasDYNAMICAL SEMIGROUPSQuantum probabilityOpen quantum systemClassical mechanics[ PHYS.PHYS.PHYS-AO-PH ] Physics [physics]/Physics [physics]/Atmospheric and Oceanic Physics [physics.ao-ph]STATESQuantum error correctionQuantum process0103 physical sciencesQuantum phase estimation algorithmQuantum operationQuantum algorithm010306 general physicsComputingMilieux_MISCELLANEOUS
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Semigenerated Carnot algebras and applications to sub-Riemannian perimeter

2021

This paper contributes to the study of sets of finite intrinsic perimeter in Carnot groups. Our intent is to characterize in which groups the only sets with constant intrinsic normal are the vertical half-spaces. Our viewpoint is algebraic: such a phenomenon happens if and only if the semigroup generated by each horizontal half-space is a vertical half-space. We call semigenerated those Carnot groups with this property. For Carnot groups of nilpotency step 3 we provide a complete characterization of semigeneration in terms of whether such groups do not have any Engel-type quotients. Engel-type groups, which are introduced here, are the minimal (in terms of quotients) counterexamples. In add…

differentiaaligeometriaconstant intrinsic normalfinite sub-Riemannian perimetersemigroup generatedCarnot algebratrimmed algebraMathematics::Metric Geometryryhmäteoriamittateoriahorizontal half-spacetipe diamondEngel-type algebrasLie wedge
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Some Contributions to the Algebraic Theory of Automata

2015

En el present treball estudiarem els autòmats des d'una perspectiva tant algebraica com coalgebraica. Volem aprofitar la natura dual d'aquests objectes per a presentar un marc unificador que explique i estenga alguns resultats recents de la teoria d'autòmats. Per tant, la secció 2 conté nocions i definicions preliminars per a mantenir el treball tan contingut com siga possible. Així, presentarem les nocions d'àlgebra i coàlgebra per a un endofunctor. També introduirem alguns conceptes sobre monoides i llenguatges. En aquest capítol també exposarem les nocions d'autòmats deterministes i no deterministes, homomorfismes i bisimulacions d'autòmats i productes i coproductes d'aquestes estructure…

monoidautomatacongruencesdualityformationsformal languagessemigroups
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The Abelian Kernel of an Inverse Semigroup

2020

The problem of computing the abelian kernel of a finite semigroup was first solved by Delgado describing an algorithm that decides whether a given element of a finite semigroup S belongs to the abelian kernel. Steinberg extended the result for any variety of abelian groups with decidable membership. In this paper, we used a completely different approach to complete these results by giving an exact description of the abelian kernel of an inverse semigroup. An abelian group that gives this abelian kernel was also constructed.

profinite topologiesPure mathematicsabelian kernelsSemigroupGeneral Mathematicslcsh:Mathematics010102 general mathematicsfinite semigroup010103 numerical & computational mathematicslcsh:QA1-93901 natural sciencesDecidabilityextension problemKernel (algebra)Inverse semigroupComputer Science (miscellaneous)0101 mathematicsAbelian groupVariety (universal algebra)Element (category theory)partial automorphismsEngineering (miscellaneous)MathematicsMathematics
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