Uniconvergence theorems for Sturm--Liouville operators with potentials from Sobolev space W2-1[0,π]

Abstract

We consider a Sturm--Liouville Ly=-y''+q(x)y in space L2[0,π] with potential from Sobolev space W2-1[0,π]. Moreover, we assume, that q=u', where u∈ L2[0,π]. We consider Direchlet boundary conditions y(0)=y(π)=0, although we can treat a boundary conditions of Sturm type. It is known, that operators of such class have a discrete spectr with only accumulation point +∞ and the system \yk\1∞ of eigen and associated functions is a Riesz basis in L2[0,π]. Moreover, this basis is a Hilbert--Schmidt perturbation of the basis \sin(kx)\1∞. In this paper we prove the uniconvergence theorem: for any element f∈ L2[0,π] the sequence Pnf-Snf0 as n∞ in C[0,π] (here Pn and Sn are the Riesz projectors to \yk\1n and \(kt)\1n respectively).