English

On semigroup maximal operators associated with divergence-form operators with complex coefficients

Functional Analysis 2022-11-23 v2

Abstract

Let LA=div(A)L_{A}=-{\rm div}(A\nabla) be an elliptic divergence form operator with bounded complex coefficients subject to mixed boundary conditions on an arbitrary open set ΩRd\Omega\subseteq\mathbb{R}^{d}. We prove that the maximal operator MAf=supt>0exp(tLA)f{\mathscr M}^{A} f=\sup_{t>0}|\exp(-tL_{A})f| is bounded in Lp(Ω)L^{p}(\Omega), whenever AA is pp-elliptic in the sense of [10]. The relevance of this result is that, in general, the semigroup generated by LA-L_{A} is neither contractive in LL^{\infty} nor positive, therefore neither the Hopf--Dunford--Schwartz maximal ergodic theorem [15, Chap.~VIII] nor Akcoglu's maximal ergodic theorem [1] can be used. We also show that if d3d\geq 3 and the domain of the sesquilinear form associated with LAL_{A} embeds into L2(Ω)L^{2^{*}}(\Omega) with 2=2d/(d2)2^{*}=2d/(d-2), then the range of LpL^{p}-boundedness of MA{\mathscr M}^{A} improves into the interval (rd/((r1)d+2),rd/(d2))(rd/((r-1)d+2),rd/(d-2)), where r2r\geq 2 is such that AA is rr-elliptic. With our method we are also able to study the boundedness of the two-parameter maximal operator sups,t>0TsA1TtA2f\sup_{s,t>0}|T^{A_{1}}_{s}T^{A_{2}}_{t}f|.

Keywords

Cite

@article{arxiv.2207.11045,
  title  = {On semigroup maximal operators associated with divergence-form operators with complex coefficients},
  author = {Andrea Carbonaro and Oliver Dragičević},
  journal= {arXiv preprint arXiv:2207.11045},
  year   = {2022}
}

Comments

We have slightly modified the presentation of our results and corrected some inaccuracies

R2 v1 2026-06-25T01:08:43.397Z