arXiv:math/0506225 Abstract

arXiv:math/0506225 [math.AP]Abstract References Reviews Resources

Critical regularity for elliptic equations from Littlewood-Paley theory

Published 2005-06-12Version 1

Using simple facts from harmonic analysis, namely Bernstein inequality and Plansherel isometry, we prove that the pseudodifferential equation $\Delta^\alpha u+Vu=0$ improves the Sobolev regularity of solutions provided the potential $V$ is integrable with the critical power $n/2\alpha>1$.

Categories: math.AP, math.DG

Subjects: 35J60, 58J05, 58J40

Keywords: elliptic equations, littlewood-paley theory, critical regularity, sobolev regularity, bernstein inequality

Related articles: Most relevant | Search more

arXiv:math/0506247 [math.AP] (Published 2005-06-13)

Critical regularity for elliptic equations from Littlewood-Paley theory II

Denis A. Labutin

arXiv:1605.02363 [math.AP] (Published 2016-05-08)

Quantitative uniqueness for elliptic equations at the boundary of $C^{1, Dini}$ domains

Agnid Banerjee, Nicola Garofalo

arXiv:1904.08856 [math.AP] (Published 2019-04-18)

Geometric regularity for elliptic equations in double-divergence form

Raimundo Leitão, Edgard A. Pimentel, Makson S. Santos

arXiv Analytics

arXiv:math/0506225 [math.AP]Abstract References Reviews Resources

Critical regularity for elliptic equations from Littlewood-Paley theory

Links

Toolbox

arXiv:math/0506225 [math.AP]AbstractReferencesReviewsResources

Critical regularity for elliptic equations from Littlewood-Paley theory

Links

Toolbox

arXiv:math/0506225 [math.AP]Abstract References Reviews Resources