Some properties of the Sturm-Liouville operator in Lp(R)
Abstract
We consider the boundary problem -y''(x)+q(x)y(x)=f(x), lim|x|∞y(i)(x)=0, i=0,1, where f(x)∈ Lp(R), p∈[1,∞], 1 q(x)∈ L1(R). For this boundary problem we obtain: 1) necessary and sufficient conditions for unique solvability and a priori properties of the solution; 2) a criterion for the resolvent to be compact in Lp(R), and some a priori properties of the spectrum.
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