Abstract
LetĤ=−(ℏ2/2)Δ+V(x) be a Schrödinger operator on Rn, with smooth potentialV(x)→+∞ as |x|→+∞. The spectrum ofĤis discrete, and one can study the asymptotic of the smoothed spectral densityϒ(E,ℏ)=∑kϕEk(ℏ)−Eℏ,as ℏ→0. Here, {Ek(ℏ)}k∈Nis the spectrum ofĤand ϕ∈C∞0(R). We shall investigate the case whereEis a critical value of the symbolHofĤand, extending the work of Brummelhuis, Paul and Uribe in [3], we will prove the existence of a full asymptotic expansion forϒin terms ofℏand lnℏ and compute the leading coefficient. We will consider new Weyl-type estimates for the counting function:NEc,ρ(ℏ)=#{k∈N/|Ek(ℏ)−E|⩽ρℏ}.
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