Canonical systems whose Weyl coefficients have regularly varying asymptotics

Abstract

For a two-dimensional canonical system y'(t)=zJH(t)y(t) on an interval (0,L) with 0<L∞ whose Hamiltonian H is a.e.\ positive semidefinite, denote by qH its Weyl coefficient. De~Branges' inverse spectral theorem states that the assignment H qH is a bijection between trace-normalised Hamiltonians and Nevanlinna functions. We prove that qH has an asymptotics towards i∞ whose leading term is some (complex) multiple of a regularly varying function if and only if the primitive M of H is regularly or rapidly varying at 0 and its off-diagonal entries do not oscillate too much. The leading term in the asymptotics of qH towards i∞ is related to the behaviour of M towards 0 by explicit formulae. The speed of growth in absolute value depends only on the diagonal entries of M, while the argument of the leading coefficient corresponds to the relative size of the off-diagonal entries. Translated to the spectral measure μH and the Hamiltonian H, this means that the diagonal of H determines the growth of the symmetrised distribution function of μH, and the relative size and sign distribution of its off-diagonal is a measure for the asymmetry of μH. The results are applied to Sturm--Liouville equations, Krein strings and generalised indefinite strings to prove similar characterisations for the asymptotics of the corresponding Weyl coefficients.