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Sobolev spaces and Poincaré inequalities on the Vicsek fractal

Fabrice Baudoin, Li Chen

2022Annales Fennici Mathematici10 citationsDOIOpen Access PDF

Abstract

In this paper we prove that several natural approaches to Sobolev spaces coincide on the Vicsek fractal. More precisely, we show that the metric approach of Korevaar-Schoen, the approach by limit of discrete \(p\)-energies and the approach by limit of Sobolev spaces on cable systems all yield the same functional space with equivalent norms for \(p>1\). As a consequence we prove that the Sobolev spaces form a real interpolation scale. We also obtain \(L^p\)-Poincaré inequalities for all values of \(p \ge 1\).

Topics & Concepts

Sobolev spaceMathematicsSobolev inequalityLimit (mathematics)Interpolation spacePure mathematicsFractalMetric spaceSpace (punctuation)Interpolation (computer graphics)Mathematical analysisFunctional analysisPhysicsComputer scienceClassical mechanicsMotion (physics)GeneBiochemistryOperating systemChemistryMathematical Dynamics and FractalsMathematical Approximation and IntegrationGeometric Analysis and Curvature Flows