Hankel vector moment sequences and the non-tangential regularity at infinity of two variable Pick functions

Abstract: A Pick function of $d$ variables is a holomorphic map from $\Pi^d$ to $\Pi$, where $\Pi$ is the upper halfplane. Some Pick functions of one variable have an asymptotic expansion at infinity, a power series $\sum_{n=1}^\infty \rho_n z^{-n}$ with real numbers $\rho_n$ that gives an asymptotic expansion on non-tangential approach regions to infinity. H. Hamburger in 1921 characterized which sequences ${\rho_n} $ can occur. We give an extension of Hamburger's results to Pick functions of two variables.