English

An Improved Compact Embedding Theorem for Degenerate Sobolev Spaces

Analysis of PDEs 2019-08-16 v1 Functional Analysis

Abstract

This short note investigates the compact embedding of degenerate matrix weighted Sobolev spaces into weighted Lebesgue spaces. The Sobolev spaces explored are defined as the abstract completion of Lipschitz functions in a bounded domain Ω\Omega with respect to the norm: fQH1,p(v,μ;Ω)=fLvp(Ω)+fLQp(μ;Ω)\|f\|_{QH^{1,p}(v,\mu;\Omega)} = \|f\|_{L^p_v(\Omega)} + \|\nabla f\|_{\mathcal{L}^p_Q(\mu;\Omega)} where the weight vv is comparable to a power of the pointwise operator norm of the matrix valued function Q=Q(x)Q=Q(x) in Ω\Omega. Following our main theorem, we give an explicit application where degeneracy is controlled through an ellipticity condition of the form w(x)ξp(ξQ(x)ξ)p/2τ(x)ξpw(x)|\xi|^p \leq \left(\xi\cdot Q(x)\xi\right)^{p/2}\leq \tau(x)|\xi|^p for a pair of pp-admissible weights wτw\leq \tau in Ω\Omega. We also give explicit examples demonstrating the sharpness of our hypotheses.

Keywords

Cite

@article{arxiv.1908.05642,
  title  = {An Improved Compact Embedding Theorem for Degenerate Sobolev Spaces},
  author = {Dario D. Monticelli and Scott Rodney},
  journal= {arXiv preprint arXiv:1908.05642},
  year   = {2019}
}

Comments

12 pages, 2 figures

R2 v1 2026-06-23T10:48:27.525Z