A Higher-Dimensional Generalization of the Gross Zeta Function

After a brief review in the first section of the definitions and basic properties of the Riemann and Goss zeta functions, we begin in Section 2 the analysis of the generalized Goss zeta function by examining its stabilization properties. An idea in this section gives rise to the new concept of a sta

Presented in a continuous extension of a measure used by Sol Golomb to define a probability on the sample space of natural numbers. The extension is a probability measure which holds several characteristic in common with Golomb's measure but on the set \((1, \infty)\). I have proven a theorem which

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

In this paper we present a relation among the multiple zeta values which generalizes simultaneously the ``sum formula'' and the ``duality'' theorem. As an application, we give a formula for the special values at positive integral points of a certain zeta function of Arakawa and Kaneko in terms of mu

three-dimensional Cartesian geometric moment (for short 3-D moment) of order p ϩ q ϩ r of a 3-D object is defined The three-dimensional Cartesian geometric moments (for short 3-D moments) are important features for 3-D object recogas [2] nition and shape description. To calculate the moments of obj

We investigate the topological properties of the poset of proper cosets xH in a finite group G. Of particular interest is the reduced Euler characteristic, which is closely related to the value at -1 of the probabilistic zeta function of G. Our main result gives divisibility properties of this reduc