Stability of spectral characteristics and Bari basis property of boundary value problems for 2 × 2 Dirac type systems

Abstract

The paper is concerned with the stability property under perturbation Q Q of different spectral characteristics of a BVP associated in L2([0,1]; C2) with the following 2×2 Dirac type equation LU(Q)y=-iB-1y'+Q(x)y=λ y, B= diag(b1,b2), b1<0<b2, y= col(y1,y2),(1) with a potential matrix Q∈ Lp=Lp([0,1]; C2×2) and subject to regular boundary conditions Uy=\U1,U2\y=0. Our approach to spectral stability relies on the existence of triangular transformation operators KQ for system (1) with Q∈ L1 established in our previous works. We prove the Lipshitz property of the mapping Q KQ from the balls in Lp to the special Banach spaces X∞,p2,X1,p2, naturally arising here, and obtain similar property for Fourier transforms of KQ. These properties are of independent interest and play a crucial role in the proofs of all stability results discussed in the paper. For instance, as an immediate consequence we get the Lipshitz property of the mapping QQ, where Q is the fundamental matrix of the system (1). Assuming boundary conditions (BC) to be strictly regular, we show that the mapping Qσ(LU(Q))-σ(LU(0)) sends Lp,p∈[1,2], either into lp' or into lp(\(1+|n|)p-2\); we also establish its Lipshitz property on compacts. We show similar result for the mapping Q FQ-F0 into lp'( Z; C([0,1]; C2)), where FQ is a sequence of normalized eigenfunctions of LU(Q). Certain modifications of these results are proved for balls in Lp,p∈[1,2]. If Q∈ L2 we establish a criterion for the system of root vectors of LU(Q) to form a Bari basis in L2([0,1]; C2). Under a simple additional assumption this system forms a Bari basis if and only if BC are self-adjoint.