Search results for "Dirichlet form"

showing 4 items of 14 documents

Geometry and analysis of Dirichlet forms

2012

Let $ \mathscr E $ be a regular, strongly local Dirichlet form on $L^2(X, m)$ and $d$ the associated intrinsic distance. Assume that the topology induced by $d$ coincides with the original topology on $ X$, and that $X$ is compact, satisfies a doubling property and supports a weak $(1, 2)$-Poincar\'e inequality. We first discuss the (non-)coincidence of the intrinsic length structure and the gradient structure. Under the further assumption that the Ricci curvature of $X$ is bounded from below in the sense of Lott-Sturm-Villani, the following are shown to be equivalent: (i) the heat flow of $\mathscr E$ gives the unique gradient flow of $\mathscr U_\infty$, (ii) $\mathscr E$ satisfies the Ne…

Mathematics(all)General MathematicsPoincaré inequalityMetric measure space01 natural sciencesMeasure (mathematics)Length structuresymbols.namesakeMathematics - Metric GeometrySierpinski gasketGradient flowClassical Analysis and ODEs (math.CA)FOS: Mathematics0101 mathematicsRicci curvatureHeat kernelMathematicsDirichlet formProbability (math.PR)010102 general mathematicsMathematical analysista111Differential structureMetric Geometry (math.MG)Functional Analysis (math.FA)Sierpinski triangleMathematics - Functional Analysis010101 applied mathematicsRicci curvatureMathematics - Classical Analysis and ODEsPoincaré inequalityBounded functionsymbolsBalanced flowDirichlet formIntrinsic distanceMathematics - ProbabilityAdvances in Mathematics
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L∞-variational problem associated to dirichlet forms

2012

Pure mathematicsDirichlet formGeneral MathematicsMathematical analysisDirichlet L-functionDirichlet's energyClass number formulaDirichlet distributionsymbols.namesakeGeneralized Dirichlet distributionDirichlet's principlesymbolsDirichlet seriesMathematics
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Feynman-Kac formulae

2015

In this chapter, we establish the connection between the deterministic EIT forward problem and the class of reflecting diffusion processes. We proceed along the lines of the recent paper [137] by Piiroinen and the author: We derive Feynman-Kac formulae in terms of these processes for the solutions to the forward problems corresponding to the continuum model and the complete electrode model, respectively. These results extend the classical Feynman-Kac formulae for elliptic boundary value problems in smooth domains and with smooth coefficients which were obtained in the 1980s and 1990s using the Feller semigroup approach and Ito stochastic calculus. In contrast to this well-studied situation,…

Pure mathematicssymbols.namesakeClass (set theory)Continuum (measurement)Dirichlet formSemigroupsymbolsStochastic calculusFeynman diagramBoundary value problemMathematicsConnection (mathematics)
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Poincare Inequalities and Spectral Gap, Concentration Phenomenon for G-Measures

2002

We produce a new approach based upon inequalities of Poincare’s type for giving constructive estimates of the mixing rate for a family of mixing stationary processes continuously depending on their past called g-measures. We establish also exponential inequalities of Hoeffding’s type leading to a concentration phenomenon for a large class of observables; this last property permits in particular to give the typical behaviour of the n-orbits of a g-measure.

symbols.namesakeDirichlet formMathematical analysissymbolsSpectral gapProduct topologyGibbs measureType (model theory)ConstructiveMixing (physics)MathematicsExponential function
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