Second-Order Differential Equations and Sums of Squares of Cauchy Kernels with Finitely Many Zeros

Abstract

We study finite-order meromorphic functions representable as absolutely convergent sums of squares of Cauchy kernels and having only finitely many zeros. By earlier work of Baranov and the author, such functions admit a representation f=P/g2, where P is a polynomial and g is entire, satisfying the differential equation Pg''-P'g'+Qg=0, where Q is a polynomial. We show that the zeros of g asymptotically accumulate along the Stokes rays. If deg\ Q>deg\ P, they approach these rays in the Euclidean metric, whereas in the borderline case deg\ Q=deg\ P one obtains in general only localization in logarithmic neighborhoods of the Stokes rays, and this is sharp. We then characterize the existence of a decomposition P/g2=Σ cn (z-tn)-2 in terms of the sectorial behavior of g and, equivalently, in terms of the Laine condition for the corresponding Schwarzian equation. Finally, for fixed P and fixed order, we identify the resulting families, modulo the natural equivalence relation, with finite-dimensional affine algebraic varieties.