Optimal trace norms for Helmholtz problems

Abstract

The natural H1(Ω) energy norm for Helmholtz problems is weighted with the wavenumber modulus σ and induces weighted norms on the trace spaces H1/2(Γ) by minimal extension to Ω⊂ Rn. This paper provides an explicit characterisation through weighted Sobolev-Slobodeckij norms and scaling estimates, highlighting the dependence on the geometry of the extension set Ω⊂ Rn and the weight σ. The analysis identifies conditions under which these trace norms are intrinsic to the isolated boundary component Γ⊂∂Ω and establishes σ-explicit trace estimates in weighted spaces. In these norms, the Helmholtz potential and boundary integral operators satisfy improved coercivity and continuity estimates without additional low-frequency factors that deteriorate as σ 0; for n≥ 3, the same analysis also improves the corresponding bounds in the classical unweighted trace norms.