Note on a Matrix-Concave Function

## Abstract Let __D__ denote the open unit disc and __f__ : __D__ → \documentclass{article} \usepackage{amssymb} \pagestyle{empty} \begin{document} $ \overline {\mathbb C} $ \end{document} be meromorphic and injective in __D__. We assume that __f__ is holomorphic at zero and has the expansion Espe

Let r be a power of a prime number p, F r be the finite field of r elements, and F r [T] be the polynomial ring over F r . As an analogue to the Riemann zeta function over Z, Goss constructed the zeta function `Fr [T] (s) over F r [T]. In order to study this zeta function, Thakur calculated the divi

The number of spanning trees in a finite graph is first expressed as the derivative (at 1) of a determinant and then in terms of a zeta function. This generalizes a result of Hashimoto to non-regular graphs. ## 1998 Academic Press Let G be a finite graph. The complexity of G, denoted }, is the num