Criterion of Bari basis property for 2 × 2 Dirac-type operators with strictly regular boundary conditions

Abstract

The paper is concerned with the Bari basis property of a boundary value problem associated in L2([0,1]; C2) with the following 2 × 2 Dirac-type equation for y = col(y1, y2): LU(Q) y =-i B-1 y' + Q(x) y = λ y , B = pmatrix b1 & 0 \\ 0 & b2 pmatrix, b1 < 0 < b2, with a potential matrix Q ∈ L2([0,1]; C2 × 2) and subject to the strictly regular boundary conditions Uy :=\U1, U2\y=0. If b2 = -b1 =1 this equation is equivalent to one dimensional Dirac equation. We show that the system of root vectors \fn\n ∈ Z of the operator LU(Q) forms a Bari basis in L2([0,1]; C2) if and only if the unperturbed operator LU(0) is self-adjoint. We also give explicit conditions for this in terms of coefficients in the boundary conditions. The Bari basis criterion is a consequence of our more general result: Let Q ∈ Lp([0,1]; C2 × 2), p ∈ [1,2], boundary conditions be strictly regular, and let \gn\n ∈ Z be the sequence biorthogonal to the system of root vectors \fn\n ∈ Z of the operator LU(Q). Then \\|fn - gn\|2\n ∈ Z ∈ (p(Z))* LU(0) = LU(0)*. These abstract results are applied to non-canonical initial-boundary value problem for a damped string equation.