Inverse problems for Sturm--Liouville operators with potentials from Sobolev spaces. Uniform stability

Abstract

The paper deals with two inverse problems for Sturm--Liouville operator Ly=-y" +q(x)y on the finite interval [0,π]. The first one is the problem of recovering of a potential by two spectra. We associate with this problem the map F:\, Wθ2 lBθ,\ F(σ) =\sk\1∞, where Wθ2 = Wθ2[0,π] are Sobolev spaces with θ≥slant 0, σ=∫ q is a primitive of the potential q and lBθ are special Hilbert spaces which we construct to place in the regularized spectral data s = \sk\1∞. The properties of the map F are studied in details. The main result is the theorem on uniform stability. It gives uniform estimates from above and below of the norm of the difference \|σ -σ1\|θ by the norm of the difference of the regularized spectral data \| s - s1\|θ where the last norm is taken in lBθ. A similar result is obtained for the second inverse problem when the potential is recovered by the spectral function of the operator L generated by Dirichlet boundary conditions. The results are new for classical case q∈ L2 which corresponds to the value θ =1.