Fractional Calculus and the Sums of Certain Families of Infinite Series

Let Do0 be the fundamental discriminant of an imaginary quadratic field, and hðDÞ its class number. In this paper, we show that for any prime p > 3 and e ¼ À1; 0; or 1, ] ÀX oDo0 j hðDÞc0 ðmod pÞ and D p ¼ e 4 p ffiffiffiffi X p log X :

## Abstract The fractional chromatic number of a graph __G__ is the infimum of the total weight that can be assigned to the independent sets of __G__ in such a way that, for each vertex __v__ of __G__, the sum of the weights of the independent sets containing __v__ is at least 1. In this note we g

We consider families A of summability methods which have similar features ␣ Ž . in their construction as the family of Cesaro methods C, ␣ . Abel-type power series methods will be added to those families and inclusion and Tauberian theorems will be proved. The Tauberian and inclusion theorems proved

## Abstract Laman's characterization of minimally rigid 2‐dimensional generic frameworks gives a matroid structure on the edge set of the underlying graph, as was first pointed out and exploited by L. Lovász and Y. Yemini. Global rigidity has only recently been characterized by a combination of two