On the Riesz Basis Property of the Eigen- and Associated Functions of Periodic and Antiperiodic Sturm-Liouville Problems

Abstract

The paper deals with the Sturm-Liouville operator Ly=-y+q(x)y, x∈0,1], generated in the space L2=L2[0,1] by periodic or antiperiodic boundary conditions. Several theorems on Riesz basis property of the root functions of the operator L are proved. One of the main results is the following. Let q belong to Sobolev space W1p[0,1] with some integer p≥0 and satisfy the conditions q(k)(0)=q(k)(1)=0 for 0≤ k≤ s-1, where s≤ p. Let the functions Q and S be defined by the equalities Q(x)=∫0xq(t) dt, S(x)=Q2(x) and let qn%, Qn,Sn be the Fourier coefficients of q,Q,S with respect to the trigonometric system \e2π inx\-∞∞. Assume that the sequence q2n-S2n+2Q0Q2n decreases not faster than the powers n-s-2. Then the system of eigen and associated functions of the operator L generated by periodic boundary conditions forms a Riesz basis in the space L2[0,1] (provided that the eigenfunctions are normalized) if and only if the condition q2n-S2n+Q0Q2n q-2n-S-2n+2Q0Q-2n, n>1, holds.