Search results for "potentiaaliteoria"

showing 6 items of 16 documents

Trace Operators on Regular Trees

2020

Abstract We consider different notions of boundary traces for functions in Sobolev spaces defined on regular trees and show that the almost everywhere existence of these traces is independent of the chosen definition of a trace.

QA299.6-433Regular treeApplied Mathematics010102 general mathematicsnewtonian space01 natural sciencesAlgebraTrace (semiology)010104 statistics & probabilityregular treetrace operator31e0546e35potentiaaliteoriaGeometry and Topology0101 mathematicsfunktionaalianalyysiAnalysisTrace operatorMathematicsNewtonian space
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Admissibility versus Ap-Conditions on Regular Trees

2020

We show that the combination of doubling and (1, p)-Poincaré inequality is equivalent to a version of the Ap-condition on rooted K-ary trees. peerReviewed

QA299.6-433ap-conditionpoincaré inequalityAp-condition31c45funktioteoria30l99regular treePoincaré inequalitydoubling measure46e35potentiaaliteoriafunktionaalianalyysiAnalysis
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The linearized Calderón problem for polyharmonic operators

2023

In this article we consider a linearized Calderón problem for polyharmonic operators of order 2m (m ≥ 2) in the spirit of Calderón’s original work [7]. We give a uniqueness result for determining coefficients of order ≤ 2m − 1 up to gauge, based on inverting momentum ray transforms. peerReviewed

osittaisdifferentiaaliyhtälötCalderón problemApplied MathematicsFOS: Mathematicstensor tomographymomentum ray transformpotentiaaliteoria35R30 31B20perturbed polyharmonic operatorinversio-ongelmatAnalysisanisotropic perturbationAnalysis of PDEs (math.AP)
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The Hajłasz Capacity Density Condition is Self-improving

2022

We prove a self-improvement property of a capacity density condition for a nonlocal Hajlasz gradient in complete geodesic spaces with a doubling measure. The proof relates the capacity density condition with boundary Poincare inequalities, adapts Keith-Zhong techniques for establishing local Hardy inequalities and applies Koskela-Zhong arguments for proving self-improvement properties of local Hardy inequalities. This leads to a characterization of the Hajlasz capacity density condition in terms of a strict upper bound on the upper Assouad codimension of the underlying set, which shows the self-improvement property of the Hajlasz capacity density condition. Open Access funding provided than…

osittaisdifferentiaaliyhtälötHajlasz gradientHajłasz gradientpotentiaaliteoriaanalysis on metric spacescapacity density conditionGeometry and Topologyharmoninen analyysiepäyhtälötmetriset avaruudetThe Journal of Geometric Analysis
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Notes on the p-Laplace equation

2017

2. p.

osittaisdifferentiaaliyhtälötpotentiaaliteoriaepäyhtälöt
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Uniform rectifiability and ε-approximability of harmonic functions in Lp

2020

Suppose that E⊂Rn+1 is a uniformly rectifiable set of codimension 1. We show that every harmonic function is ε-approximable in Lp(Ω) for every p∈(1,∞), where Ω:=Rn+1∖E. Together with results of many authors this shows that pointwise, L∞ and Lp type ε-approximability properties of harmonic functions are all equivalent and they characterize uniform rectifiability for codimension 1 Ahlfors–David regular sets. Our results and techniques are generalizations of recent works of T. Hytönen and A. Rosén and the first author, J. M. Martell and S. Mayboroda. peerReviewed

ε-approximabilitypotentiaaliteoriaharmonic functions.mittateoriaCarleson measuresharmoninen analyysiuniform rectifiability
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