English

Spectral asymptotics for Robin problems with a discontinuous coefficient

Analysis of PDEs 2011-08-11 v3 Spectral Theory

Abstract

The spectral behavior of the difference between the resolvents of two realizations A~1\tilde A_1 and A~2\tilde A_2 of a second-order strongly elliptic symmetric differential operator AA, defined by different Robin conditions νu=b1γ0u\nu u=b_1\gamma_0u and νu=b2γ0u\nu u=b_2\gamma_0u, can in the case where all coefficients are CC^\infty be determined by use of a general result by the author in 1984 on singular Green operators. We here treat the problem for nonsmooth bib_i. Using a Krein resolvent formula, we show that if b1b_1 and b2b_2 are in LL_\infty, the s-numbers sjs_j of (A~1λ)1(A~2λ)1(\tilde A_1 -\lambda)^{-1}-(\tilde A_2 -\lambda)^{-1} satisfy sjj3/(n1)Cs_j j^{3/(n-1)}\le C for all jj; this improves a recent result for A=ΔA=-\Delta by Behrndt et al., that jsjp<\sum_js_j ^p<\infty for p>(n1)/3p>(n-1)/3. A sharper estimate is obtained when b1b_1 and b2b_2 are in CϵC^\epsilon for some ϵ>0\epsilon >0, with jumps at a smooth hypersurface, namely that sjj3/(n1)cs_j j^{3/(n-1)}\to c for jj\to \infty, with a constant cc defined from the principal symbol of AA and b2b1b_2-b_1. As an auxiliary result we show that the usual principal spectral asymptotic estimate for pseudodifferential operators of negative order on a closed manifold extends to products of pseudodifferential operators interspersed with piecewise continuous functions.

Keywords

Cite

@article{arxiv.1009.0997,
  title  = {Spectral asymptotics for Robin problems with a discontinuous coefficient},
  author = {Gerd Grubb},
  journal= {arXiv preprint arXiv:1009.0997},
  year   = {2011}
}

Comments

20 pages, notation simplified. To appear in J. Spectral Theory

R2 v1 2026-06-21T16:09:52.344Z