Local form-subordination condition and Riesz basisness of root systems

Abstract: We exploit the so called form-local subordination in the analysis of non-symmetric perturbations of unbounded self-adjoint operators with isolated simple positive eigenvalues. If the proper condition relating the size of gaps between the unperturbed eigenvalues and the strength of perturbation, measured by the form-local subordination, is satisfied, the root system of the perturbed operator contains a Riesz basis and usual asymptotic formulas for perturbed eigenvalues and eigenvectors hold. The power of the ab… Show more

“…Our assumption (3.3) on the allowed size of Re V is optimal, at least for polynomial-like potentials (with ν ± = −1 in assumption (3.2)). Indeed, by completely different methods, it has been established in [14,15] that e.g. for potentials V satisfying Re V (x) = |x| β with β ≥ 1 and…”

“…the eigensystem of H V contains a Riesz basis (and there are possibly only finitely many degenerate eigenvalues) and hence the only non-trivial pseudomodes exist for λ close to the eigenvalues of H V (with known asymptotics, see [14]). In turn, the current results suggest that the condition (1.3) is optimal with respect to the Riesz basis property of H V (which can be indeed concluded if more information about the position of eigenvalues of H V is available) and confirms that the borderline case (potentials with ǫ = 0 in (1.3)) is the most challenging one, see [1,Open Problem 15.1].…”

Pseudomodes for Schrödinger operators with complex potentials

“…Our assumption (3.3) on the allowed size of Re V is optimal, at least for polynomial-like potentials (with ν ± = −1 in assumption (3.2)). Indeed, by completely different methods, it has been established in [14,15] that e.g. for potentials V satisfying Re V (x) = |x| β with β ≥ 1 and…”

“…the eigensystem of H V contains a Riesz basis (and there are possibly only finitely many degenerate eigenvalues) and hence the only non-trivial pseudomodes exist for λ close to the eigenvalues of H V (with known asymptotics, see [14]). In turn, the current results suggest that the condition (1.3) is optimal with respect to the Riesz basis property of H V (which can be indeed concluded if more information about the position of eigenvalues of H V is available) and confirms that the borderline case (potentials with ǫ = 0 in (1.3)) is the most challenging one, see [1,Open Problem 15.1].…”

Pseudomodes for Schrödinger operators with complex potentials

Concentration of Eigenfunctions of Schrödinger Operators

The spectral determinant for second-order elliptic operators on the real line