English

Fractional Differential Couples by Sharp Inequalities and Duality Equations

Analysis of PDEs 2019-05-15 v2

Abstract

This paper presents a highly non-trivial two-fold study of the fractional differential couples - derivatives (+0<s<1=(Δ)s2\nabla^{0<s<1}_+=(-\Delta)^\frac{s}{2}) and gradients (0<s<1=(Δ)s12\nabla^{0<s<1}_-=\nabla (-\Delta)^\frac{s-1}{2}) of basic importance in the theory of fractional advection-dispersion equations: one is to discover the sharp Hardy-Rellich (sp<p<nsp<p<n) | Adams-Moser (sp=nsp=n) | Morrey-Sobolev (sp>nsp>n) inequalities for ±0<s<1\nabla^{0<s<1}_\pm; the other is to handle the distributional solutions uu of the duality equations [±0<s<1]u=μ[\nabla^{0<s<1}_\pm]^\ast u=\mu (a nonnegative Radon measure) and [±0<s<1]u=f[\nabla^{0<s<1}_\pm]^\ast u=f (a Morrey function).

Keywords

Cite

@article{arxiv.1904.04008,
  title  = {Fractional Differential Couples by Sharp Inequalities and Duality Equations},
  author = {Liguang Li and Jie Xiao},
  journal= {arXiv preprint arXiv:1904.04008},
  year   = {2019}
}

Comments

29 pages

R2 v1 2026-06-23T08:32:47.316Z